gmp-ecm →
7.0.1+ds-2 →
armhf → 2016-06-21 05:35:45
sbuild (Debian sbuild) 0.66.0 (04 Oct 2015) on bm-wb-03
+==============================================================================+
| gmp-ecm 7.0.1+ds-2 (armhf) 21 Jun 2016 05:04 |
+==============================================================================+
Package: gmp-ecm
Version: 7.0.1+ds-2
Source Version: 7.0.1+ds-2
Distribution: stretch-staging
Machine Architecture: armhf
Host Architecture: armhf
Build Architecture: armhf
I: NOTICE: Log filtering will replace 'build/gmp-ecm-FaGH1V/gmp-ecm-7.0.1+ds' with '<<PKGBUILDDIR>>'
I: NOTICE: Log filtering will replace 'build/gmp-ecm-FaGH1V' with '<<BUILDDIR>>'
I: NOTICE: Log filtering will replace 'var/lib/schroot/mount/stretch-staging-armhf-sbuild-ad075802-cf05-4b98-8152-f04dabed18a0' with '<<CHROOT>>'
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| Update chroot |
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Get:1 http://172.17.0.1/private stretch-staging InRelease [11.3 kB]
Get:2 http://172.17.0.1/private stretch-staging/main Sources [9074 kB]
Get:3 http://172.17.0.1/private stretch-staging/main armhf Packages [11.1 MB]
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| Fetch source files |
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Check APT
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Download source files with APT
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NOTICE: 'gmp-ecm' packaging is maintained in the 'Git' version control system at:
https://anonscm.debian.org/git/debian-science/packages/gmp-ecm.git
Please use:
git clone https://anonscm.debian.org/git/debian-science/packages/gmp-ecm.git
to retrieve the latest (possibly unreleased) updates to the package.
Need to get 704 kB of source archives.
Get:1 http://172.17.0.1/private stretch-staging/main gmp-ecm 7.0.1+ds-2 (dsc) [2291 B]
Get:2 http://172.17.0.1/private stretch-staging/main gmp-ecm 7.0.1+ds-2 (tar) [691 kB]
Get:3 http://172.17.0.1/private stretch-staging/main gmp-ecm 7.0.1+ds-2 (diff) [10.8 kB]
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Check architectures
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Check dependencies
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Merged Build-Depends: build-essential, fakeroot
Filtered Build-Depends: build-essential, fakeroot
dpkg-deb: building package 'sbuild-build-depends-core-dummy' in '/<<BUILDDIR>>/resolver-ebulHJ/apt_archive/sbuild-build-depends-core-dummy.deb'.
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| Install core build dependencies (apt-based resolver) |
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Installing build dependencies
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The following NEW packages will be installed:
sbuild-build-depends-core-dummy
0 upgraded, 1 newly installed, 0 to remove and 23 not upgraded.
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Merged Build-Depends: debhelper (>= 9), autotools-dev, gnulib, m4, dh-autoreconf, libtool, libgmp-dev (>= 2:6.0)
Filtered Build-Depends: debhelper (>= 9), autotools-dev, gnulib, m4, dh-autoreconf, libtool, libgmp-dev (>= 2:6.0)
dpkg-deb: building package 'sbuild-build-depends-gmp-ecm-dummy' in '/<<BUILDDIR>>/resolver-b7eP9z/apt_archive/sbuild-build-depends-gmp-ecm-dummy.deb'.
OK
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Get:3 file:/<<BUILDDIR>>/resolver-b7eP9z/apt_archive ./ Release.gpg [299 B]
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+------------------------------------------------------------------------------+
| Install gmp-ecm build dependencies (apt-based resolver) |
+------------------------------------------------------------------------------+
Installing build dependencies
Reading package lists...
Building dependency tree...
Reading state information...
The following additional packages will be installed:
autoconf automake autopoint autotools-dev bison bsdmainutils debhelper
dh-autoreconf dh-strip-nondeterminism file gettext gettext-base gnulib gperf
groff-base intltool-debian libarchive-zip-perl libbison-dev libbsd0
libcroco3 libffi6 libfile-stripnondeterminism-perl libglib2.0-0 libgmp-dev
libgmpxx4ldbl libicu55 libmagic1 libpipeline1 libsigsegv2
libtext-unidecode-perl libtimedate-perl libtool libunistring0
libxml-libxml-perl libxml-namespacesupport-perl libxml-sax-base-perl
libxml-sax-perl libxml2 m4 man-db po-debconf tex-common texinfo ucf
Suggested packages:
autoconf-archive gnu-standards autoconf-doc bison-doc wamerican | wordlist
whois vacation dh-make gettext-doc libasprintf-dev libgettextpo-dev clisp
groff gmp-doc libgmp10-doc libmpfr-dev libtool-doc gfortran
| fortran95-compiler gcj-jdk less www-browser libmail-box-perl texlive-base
texlive-latex-base texlive-generic-recommended texinfo-doc-nonfree
texlive-fonts-recommended
Recommended packages:
curl | wget | lynx-cur libglib2.0-data shared-mime-info xdg-user-dirs
libltdl-dev libxml-sax-expat-perl xml-core libmail-sendmail-perl
The following NEW packages will be installed:
autoconf automake autopoint autotools-dev bison bsdmainutils debhelper
dh-autoreconf dh-strip-nondeterminism file gettext gettext-base gnulib gperf
groff-base intltool-debian libarchive-zip-perl libbison-dev libbsd0
libcroco3 libffi6 libfile-stripnondeterminism-perl libglib2.0-0 libgmp-dev
libgmpxx4ldbl libicu55 libmagic1 libpipeline1 libsigsegv2
libtext-unidecode-perl libtimedate-perl libtool libunistring0
libxml-libxml-perl libxml-namespacesupport-perl libxml-sax-base-perl
libxml-sax-perl libxml2 m4 man-db po-debconf
sbuild-build-depends-gmp-ecm-dummy tex-common texinfo ucf
0 upgraded, 45 newly installed, 0 to remove and 23 not upgraded.
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Get:2 http://172.17.0.1/private stretch-staging/main armhf groff-base armhf 1.22.3-7 [1083 kB]
Get:3 http://172.17.0.1/private stretch-staging/main armhf libbsd0 armhf 0.8.3-1 [89.0 kB]
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Get:6 http://172.17.0.1/private stretch-staging/main armhf man-db armhf 2.7.5-1 [975 kB]
Get:7 http://172.17.0.1/private stretch-staging/main armhf libmagic1 armhf 1:5.25-2 [250 kB]
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Get:12 http://172.17.0.1/private stretch-staging/main armhf ucf all 3.0036 [70.2 kB]
Get:13 http://172.17.0.1/private stretch-staging/main armhf autoconf all 2.69-10 [338 kB]
Get:14 http://172.17.0.1/private stretch-staging/main armhf autotools-dev all 20160430.1 [72.6 kB]
Get:15 http://172.17.0.1/private stretch-staging/main armhf automake all 1:1.15-4 [735 kB]
Get:16 http://172.17.0.1/private stretch-staging/main armhf autopoint all 0.19.8.1-1 [433 kB]
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Get:22 http://172.17.0.1/private stretch-staging/main armhf intltool-debian all 0.35.0+20060710.4 [26.3 kB]
Get:23 http://172.17.0.1/private stretch-staging/main armhf po-debconf all 1.0.19 [249 kB]
Get:24 http://172.17.0.1/private stretch-staging/main armhf libarchive-zip-perl all 1.57-1 [95.1 kB]
Get:25 http://172.17.0.1/private stretch-staging/main armhf libfile-stripnondeterminism-perl all 0.019-1 [12.2 kB]
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Get:27 http://172.17.0.1/private stretch-staging/main armhf dh-strip-nondeterminism all 0.019-1 [7352 B]
Get:28 http://172.17.0.1/private stretch-staging/main armhf libtool all 2.4.6-0.1 [200 kB]
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Get:32 http://172.17.0.1/private stretch-staging/main armhf libtext-unidecode-perl all 1.27-1 [103 kB]
Get:33 http://172.17.0.1/private stretch-staging/main armhf libxml-namespacesupport-perl all 1.11-1 [14.8 kB]
Get:34 http://172.17.0.1/private stretch-staging/main armhf libxml-sax-base-perl all 1.07-1 [23.1 kB]
Get:35 http://172.17.0.1/private stretch-staging/main armhf libxml-sax-perl all 0.99+dfsg-2 [68.3 kB]
Get:36 http://172.17.0.1/private stretch-staging/main armhf libxml-libxml-perl armhf 2.0123+dfsg-1+b1 [317 kB]
Get:37 http://172.17.0.1/private stretch-staging/main armhf tex-common all 6.05 [564 kB]
Get:38 http://172.17.0.1/private stretch-staging/main armhf texinfo armhf 6.1.0.dfsg.1-8 [1261 kB]
Get:39 http://172.17.0.1/private stretch-staging/main armhf gnulib all 20140202+stable-2 [4566 kB]
Get:40 http://172.17.0.1/private stretch-staging/main armhf libgmpxx4ldbl armhf 2:6.1.0+dfsg-2 [21.4 kB]
Get:41 http://172.17.0.1/private stretch-staging/main armhf libgmp-dev armhf 2:6.1.0+dfsg-2 [560 kB]
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Setting up libsigsegv2:armhf (2.10-5) ...
Setting up m4 (1.4.17-5) ...
Setting up ucf (3.0036) ...
Setting up autoconf (2.69-10) ...
Setting up autotools-dev (20160430.1) ...
Setting up automake (1:1.15-4) ...
update-alternatives: using /usr/bin/automake-1.15 to provide /usr/bin/automake (automake) in auto mode
Setting up autopoint (0.19.8.1-1) ...
Setting up libbison-dev:armhf (2:3.0.4.dfsg-1) ...
Setting up bison (2:3.0.4.dfsg-1) ...
update-alternatives: using /usr/bin/bison.yacc to provide /usr/bin/yacc (yacc) in auto mode
Setting up libffi6:armhf (3.2.1-4) ...
Setting up libglib2.0-0:armhf (2.48.1-1) ...
No schema files found: doing nothing.
Setting up libcroco3:armhf (0.6.11-1) ...
Setting up libunistring0:armhf (0.9.6+really0.9.3-0.1) ...
Setting up gettext (0.19.8.1-1) ...
Setting up intltool-debian (0.35.0+20060710.4) ...
Setting up po-debconf (1.0.19) ...
Setting up libarchive-zip-perl (1.57-1) ...
Setting up libfile-stripnondeterminism-perl (0.019-1) ...
Setting up libtimedate-perl (2.3000-2) ...
Setting up libtool (2.4.6-0.1) ...
Setting up gperf (3.0.4-2) ...
Setting up libtext-unidecode-perl (1.27-1) ...
Setting up libxml-namespacesupport-perl (1.11-1) ...
Setting up libxml-sax-base-perl (1.07-1) ...
Setting up libxml-sax-perl (0.99+dfsg-2) ...
update-perl-sax-parsers: Registering Perl SAX parser XML::SAX::PurePerl with priority 10...
update-perl-sax-parsers: Updating overall Perl SAX parser modules info file...
Creating config file /etc/perl/XML/SAX/ParserDetails.ini with new version
Setting up libxml-libxml-perl (2.0123+dfsg-1+b1) ...
update-perl-sax-parsers: Registering Perl SAX parser XML::LibXML::SAX::Parser with priority 50...
update-perl-sax-parsers: Registering Perl SAX parser XML::LibXML::SAX with priority 50...
update-perl-sax-parsers: Updating overall Perl SAX parser modules info file...
Replacing config file /etc/perl/XML/SAX/ParserDetails.ini with new version
Setting up tex-common (6.05) ...
update-language: texlive-base not installed and configured, doing nothing!
Setting up texinfo (6.1.0.dfsg.1-8) ...
Setting up gnulib (20140202+stable-2) ...
Setting up libgmpxx4ldbl:armhf (2:6.1.0+dfsg-2) ...
Setting up libgmp-dev:armhf (2:6.1.0+dfsg-2) ...
Setting up dh-autoreconf (12) ...
Setting up debhelper (9.20160403) ...
Setting up sbuild-build-depends-gmp-ecm-dummy (0.invalid.0) ...
Setting up dh-strip-nondeterminism (0.019-1) ...
Processing triggers for libc-bin (2.22-9) ...
W: No sandbox user '_apt' on the system, can not drop privileges
+------------------------------------------------------------------------------+
| Build environment |
+------------------------------------------------------------------------------+
Kernel: Linux 3.19.0-trunk-armmp armhf (armv7l)
Toolchain package versions: binutils_2.26-10 dpkg-dev_1.18.7 g++-5_5.3.1-21 gcc-5_5.3.1-21 libc6-dev_2.22-9 libstdc++-5-dev_5.3.1-21 libstdc++6_6.1.1-1+rpi1 linux-libc-dev_3.18.5-1~exp1+rpi19+stretch
Package versions: adduser_3.114 apt_1.2.12 autoconf_2.69-10 automake_1:1.15-4 autopoint_0.19.8.1-1 autotools-dev_20160430.1 base-files_9.6+rpi1 base-passwd_3.5.39 bash_4.3-14 binutils_2.26-10 bison_2:3.0.4.dfsg-1 bsdmainutils_9.0.10 bsdutils_1:2.28-5 build-essential_11.7 bzip2_1.0.6-8 console-setup_1.146 console-setup-linux_1.146 coreutils_8.25-2 cpio_2.11+dfsg-5 cpp_4:5.3.1-3 cpp-5_5.3.1-21 dash_0.5.8-2.2 debconf_1.5.59 debfoster_2.7-2 debhelper_9.20160403 debianutils_4.7 dh-autoreconf_12 dh-strip-nondeterminism_0.019-1 diffutils_1:3.3-3 dmsetup_2:1.02.124-1 dpkg_1.18.7 dpkg-dev_1.18.7 e2fslibs_1.43-3 e2fsprogs_1.43-3 fakeroot_1.20.2-2 file_1:5.25-2 findutils_4.6.0+git+20160126-2 fuse2fs_1.43-3 g++_4:5.3.1-3 g++-5_5.3.1-21 gcc_4:5.3.1-3 gcc-4.6-base_4.6.4-5+rpi1 gcc-4.7-base_4.7.3-11+rpi1 gcc-4.8-base_4.8.5-4 gcc-4.9-base_4.9.3-14 gcc-5_5.3.1-21 gcc-5-base_5.3.1-21 gcc-6-base_6.1.1-1+rpi1 gettext_0.19.8.1-1 gettext-base_0.19.8.1-1 gnulib_20140202+stable-2 gnupg_1.4.20-6 gperf_3.0.4-2 gpgv_1.4.20-6 grep_2.25-3 groff-base_1.22.3-7 gzip_1.6-5 hostname_3.17 ifupdown_0.8.13 init_1.34 init-system-helpers_1.34 initscripts_2.88dsf-59.4 insserv_1.14.0-5.3 intltool-debian_0.35.0+20060710.4 iproute2_4.3.0-1 kbd_2.0.3-2 keyboard-configuration_1.146 klibc-utils_2.0.4-9+rpi1 kmod_22-1.1 libacl1_2.2.52-3 libapparmor1_2.10-4 libapt-pkg5.0_1.2.12 libarchive-zip-perl_1.57-1 libasan2_5.3.1-21 libatm1_1:2.5.1-1.5 libatomic1_6.1.1-1+rpi1 libattr1_1:2.4.47-2 libaudit-common_1:2.5.2-1+rpi1 libaudit1_1:2.5.2-1+rpi1 libbison-dev_2:3.0.4.dfsg-1 libblkid1_2.28-5 libbsd0_0.8.3-1 libbz2-1.0_1.0.6-8 libc-bin_2.22-9 libc-dev-bin_2.22-9 libc6_2.22-9 libc6-dev_2.22-9 libcap2_1:2.25-1 libcap2-bin_1:2.25-1 libcc1-0_6.1.1-1+rpi1 libcomerr2_1.43-3 libcroco3_0.6.11-1 libcryptsetup4_2:1.7.0-2 libdb5.3_5.3.28-11 libdbus-1-3_1.10.8-1 libdebconfclient0_0.213 libdevmapper1.02.1_2:1.02.124-1 libdpkg-perl_1.18.7 libdrm2_2.4.68-1 libfakeroot_1.20.2-2 libfdisk1_2.28-5 libffi6_3.2.1-4 libfile-stripnondeterminism-perl_0.019-1 libfuse2_2.9.6-1 libgc1c2_1:7.4.2-8 libgcc-5-dev_5.3.1-21 libgcc1_1:6.1.1-1+rpi1 libgcrypt20_1.7.0-2 libgdbm3_1.8.3-13.1 libglib2.0-0_2.48.1-1 libgmp-dev_2:6.1.0+dfsg-2 libgmp10_2:6.1.0+dfsg-2 libgmpxx4ldbl_2:6.1.0+dfsg-2 libgomp1_6.1.1-1+rpi1 libgpg-error0_1.22-2 libicu55_55.1-7 libisl15_0.17.1-1 libklibc_2.0.4-9+rpi1 libkmod2_22-1.1 liblocale-gettext-perl_1.07-2 liblz4-1_0.0~r131-2 liblzma5_5.1.1alpha+20120614-2.1 libmagic1_1:5.25-2 libmount1_2.28-5 libmpc3_1.0.3-1 libmpfr4_3.1.4-2 libncurses5_6.0+20160319-1 libncursesw5_6.0+20160319-1 libpam-modules_1.1.8-3.3 libpam-modules-bin_1.1.8-3.3 libpam-runtime_1.1.8-3.3 libpam0g_1.1.8-3.3 libpcre3_2:8.38-3.1 libperl5.22_5.22.2-1 libpipeline1_1.4.1-2 libplymouth4_0.9.2-3 libpng12-0_1.2.54-6 libprocps5_2:3.3.11-3 libreadline6_6.3-8+b3 libseccomp2_2.3.1-2 libselinux1_2.5-3 libsemanage-common_2.5-1 libsemanage1_2.5-1 libsepol1_2.5-1 libsigsegv2_2.10-5 libsmartcols1_2.28-5 libss2_1.43-3 libstdc++-5-dev_5.3.1-21 libstdc++6_6.1.1-1+rpi1 libsystemd0_230-2 libtext-unidecode-perl_1.27-1 libtimedate-perl_2.3000-2 libtinfo5_6.0+20160319-1 libtool_2.4.6-0.1 libubsan0_6.1.1-1+rpi1 libudev1_230-2 libunistring0_0.9.6+really0.9.3-0.1 libusb-0.1-4_2:0.1.12-30 libustr-1.0-1_1.0.4-5 libuuid1_2.28-5 libxml-libxml-perl_2.0123+dfsg-1+b1 libxml-namespacesupport-perl_1.11-1 libxml-sax-base-perl_1.07-1 libxml-sax-perl_0.99+dfsg-2 libxml2_2.9.3+dfsg1-1.2 linux-libc-dev_3.18.5-1~exp1+rpi19+stretch login_1:4.2-3.1 lsb-base_9.20160110+rpi1 m4_1.4.17-5 make_4.1-9 makedev_2.3.1-93 man-db_2.7.5-1 manpages_4.06-1 mawk_1.3.3-17 mount_2.28-5 multiarch-support_2.22-9 ncurses-base_6.0+20160319-1 ncurses-bin_6.0+20160319-1 netbase_5.3 passwd_1:4.2-3.1 patch_2.7.5-1 perl_5.22.2-1 perl-base_5.22.2-1 perl-modules-5.22_5.22.2-1 po-debconf_1.0.19 procps_2:3.3.11-3 psmisc_22.21-2.1 raspbian-archive-keyring_20120528.2 readline-common_6.3-8 sbuild-build-depends-core-dummy_0.invalid.0 sbuild-build-depends-gmp-ecm-dummy_0.invalid.0 sed_4.2.2-7.1 sensible-utils_0.0.9 startpar_0.59-3 systemd_230-2 systemd-sysv_230-2 sysv-rc_2.88dsf-59.4 sysvinit-utils_2.88dsf-59.4 tar_1.29-1+rpi1 tex-common_6.05 texinfo_6.1.0.dfsg.1-8 tzdata_2016d-2 ucf_3.0036 udev_230-2 util-linux_2.28-5 xkb-data_2.17-1 xz-utils_5.1.1alpha+20120614-2.1 zlib1g_1:1.2.8.dfsg-2+b1
+------------------------------------------------------------------------------+
| Build |
+------------------------------------------------------------------------------+
Unpack source
-------------
gpgv: keyblock resource `/sbuild-nonexistent/.gnupg/trustedkeys.gpg': file open error
gpgv: Signature made Wed Jun 15 14:48:38 2016 UTC using RSA key ID 4E9F5DD9
gpgv: Can't check signature: public key not found
dpkg-source: warning: failed to verify signature on ./gmp-ecm_7.0.1+ds-2.dsc
dpkg-source: info: extracting gmp-ecm in gmp-ecm-7.0.1+ds
dpkg-source: info: unpacking gmp-ecm_7.0.1+ds.orig.tar.gz
dpkg-source: info: unpacking gmp-ecm_7.0.1+ds-2.debian.tar.xz
dpkg-source: info: applying upstream-autotoolization-shlibs.patch
dpkg-source: info: applying debianization-examples.patch
Check disc space
----------------
Sufficient free space for build
User Environment
----------------
DEB_BUILD_OPTIONS=parallel=4
HOME=/sbuild-nonexistent
LOGNAME=buildd
PATH=/usr/local/sbin:/usr/local/bin:/usr/sbin:/usr/bin:/sbin:/bin:/usr/games
SCHROOT_ALIAS_NAME=stretch-staging-armhf-sbuild
SCHROOT_CHROOT_NAME=stretch-staging-armhf-sbuild
SCHROOT_COMMAND=env
SCHROOT_GID=109
SCHROOT_GROUP=buildd
SCHROOT_SESSION_ID=stretch-staging-armhf-sbuild-ad075802-cf05-4b98-8152-f04dabed18a0
SCHROOT_UID=104
SCHROOT_USER=buildd
SHELL=/bin/sh
USER=buildd
dpkg-buildpackage
-----------------
dpkg-buildpackage: info: source package gmp-ecm
dpkg-buildpackage: info: source version 7.0.1+ds-2
dpkg-buildpackage: info: source distribution unstable
dpkg-source --before-build gmp-ecm-7.0.1+ds
dpkg-buildpackage: info: host architecture armhf
fakeroot debian/rules clean
dh clean --with autoreconf --builddirectory=_build --parallel
dh_testdir -O--builddirectory=_build -O--parallel
dh_auto_clean -O--builddirectory=_build -O--parallel
dh_autoreconf_clean -O--builddirectory=_build -O--parallel
dh_clean -O--builddirectory=_build -O--parallel
debian/rules build-arch
dh build-arch --with autoreconf --builddirectory=_build --parallel
dh_testdir -a -O--builddirectory=_build -O--parallel
dh_update_autotools_config -a -O--builddirectory=_build -O--parallel
dh_autoreconf -a -O--builddirectory=_build -O--parallel
aclocal: warning: couldn't open directory 'm4': No such file or directory
libtoolize: putting auxiliary files in '.'.
libtoolize: copying file './ltmain.sh'
libtoolize: putting macros in AC_CONFIG_MACRO_DIRS, 'm4'.
libtoolize: copying file 'm4/libtool.m4'
libtoolize: copying file 'm4/ltoptions.m4'
libtoolize: copying file 'm4/ltsugar.m4'
libtoolize: copying file 'm4/ltversion.m4'
libtoolize: copying file 'm4/lt~obsolete.m4'
configure.ac:161: installing './compile'
configure.ac:9: installing './config.guess'
configure.ac:9: installing './config.sub'
configure.ac:8: installing './install-sh'
configure.ac:8: installing './missing'
Makefile.am: installing './INSTALL'
Makefile.am: installing './depcomp'
debian/rules override_dh_auto_configure
make[1]: Entering directory '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds'
dh_auto_configure -- --enable-shared --enable-maintainer-mode
../configure --build=arm-linux-gnueabihf --prefix=/usr --includedir=\${prefix}/include --mandir=\${prefix}/share/man --infodir=\${prefix}/share/info --sysconfdir=/etc --localstatedir=/var --disable-silent-rules --libdir=\${prefix}/lib/arm-linux-gnueabihf --libexecdir=\${prefix}/lib/arm-linux-gnueabihf --disable-maintainer-mode --disable-dependency-tracking --enable-shared --enable-maintainer-mode
configure: WARNING: unrecognized options: --disable-maintainer-mode, --enable-maintainer-mode
checking for a BSD-compatible install... /usr/bin/install -c
checking whether build environment is sane... yes
checking for a thread-safe mkdir -p... /bin/mkdir -p
checking for gawk... no
checking for mawk... mawk
checking whether make sets $(MAKE)... yes
checking whether make supports nested variables... yes
checking build system type... arm-unknown-linux-gnueabihf
checking host system type... arm-unknown-linux-gnueabihf
checking for grep that handles long lines and -e... /bin/grep
checking for egrep... /bin/grep -E
checking for a sed that does not truncate output... /bin/sed
checking for gcc... gcc
checking whether the C compiler works... yes
checking for C compiler default output file name... a.out
checking for suffix of executables...
checking whether we are cross compiling... no
checking for suffix of object files... o
checking whether we are using the GNU C compiler... yes
checking whether gcc accepts -g... yes
checking for gcc option to accept ISO C89... none needed
checking whether gcc understands -c and -o together... yes
checking for style of include used by make... GNU
checking dependency style of gcc... none
checking dependency style of gcc... none
checking how to print strings... printf
checking for a sed that does not truncate output... (cached) /bin/sed
checking for fgrep... /bin/grep -F
checking for ld used by gcc... /usr/bin/ld
checking if the linker (/usr/bin/ld) is GNU ld... yes
checking for BSD- or MS-compatible name lister (nm)... /usr/bin/nm -B
checking the name lister (/usr/bin/nm -B) interface... BSD nm
checking whether ln -s works... yes
checking the maximum length of command line arguments... 1572864
checking how to convert arm-unknown-linux-gnueabihf file names to arm-unknown-linux-gnueabihf format... func_convert_file_noop
checking how to convert arm-unknown-linux-gnueabihf file names to toolchain format... func_convert_file_noop
checking for /usr/bin/ld option to reload object files... -r
checking for objdump... objdump
checking how to recognize dependent libraries... pass_all
checking for dlltool... no
checking how to associate runtime and link libraries... printf %s\n
checking for ar... ar
checking for archiver @FILE support... @
checking for strip... strip
checking for ranlib... ranlib
checking command to parse /usr/bin/nm -B output from gcc object... ok
checking for sysroot... no
checking for a working dd... /bin/dd
checking how to truncate binary pipes... /bin/dd bs=4096 count=1
checking for mt... mt
checking if mt is a manifest tool... no
checking how to run the C preprocessor... gcc -E
checking for ANSI C header files... yes
checking for sys/types.h... yes
checking for sys/stat.h... yes
checking for stdlib.h... yes
checking for string.h... yes
checking for memory.h... yes
checking for strings.h... yes
checking for inttypes.h... yes
checking for stdint.h... yes
checking for unistd.h... yes
checking for dlfcn.h... yes
checking for objdir... .libs
checking if gcc supports -fno-rtti -fno-exceptions... no
checking for gcc option to produce PIC... -fPIC -DPIC
checking if gcc PIC flag -fPIC -DPIC works... yes
checking if gcc static flag -static works... yes
checking if gcc supports -c -o file.o... yes
checking if gcc supports -c -o file.o... (cached) yes
checking whether the gcc linker (/usr/bin/ld) supports shared libraries... yes
checking whether -lc should be explicitly linked in... no
checking dynamic linker characteristics... GNU/Linux ld.so
checking how to hardcode library paths into programs... immediate
checking whether stripping libraries is possible... yes
checking if libtool supports shared libraries... yes
checking whether to build shared libraries... yes
checking whether to build static libraries... yes
checking for int64_t... yes
checking for uint64_t... yes
checking for unsigned long long int... yes
checking for long long int... yes
checking for an ANSI C-conforming const... yes
checking for inline... inline
checking whether time.h and sys/time.h may both be included... yes
checking for size_t... yes
checking if assembly code is ELF... yes
checking for working alloca.h... yes
checking for alloca... yes
checking for ANSI C header files... (cached) yes
checking math.h usability... yes
checking math.h presence... yes
checking for math.h... yes
checking limits.h usability... yes
checking limits.h presence... yes
checking for limits.h... yes
checking malloc.h usability... yes
checking malloc.h presence... yes
checking for malloc.h... yes
checking for strings.h... (cached) yes
checking sys/time.h usability... yes
checking sys/time.h presence... yes
checking for sys/time.h... yes
checking for unistd.h... (cached) yes
checking io.h usability... no
checking io.h presence... no
checking for io.h... no
checking signal.h usability... yes
checking signal.h presence... yes
checking for signal.h... yes
checking fcntl.h usability... yes
checking fcntl.h presence... yes
checking for fcntl.h... yes
checking for windows.h... no
checking for psapi.h... no
checking ctype.h usability... yes
checking ctype.h presence... yes
checking for ctype.h... yes
checking for sys/types.h... (cached) yes
checking sys/resource.h usability... yes
checking sys/resource.h presence... yes
checking for sys/resource.h... yes
checking aio.h usability... yes
checking aio.h presence... yes
checking for aio.h... yes
checking for working strtod... yes
checking for pow in -lm... yes
checking for floor in -lm... yes
checking for sqrt in -lm... yes
checking for fmod in -lm... yes
checking for cos in -lm... yes
checking for aio_read in -lrt... yes
checking for GetProcessMemoryInfo in -lpsapi... no
checking for isascii... yes
checking for memset... yes
checking for strchr... yes
checking for strlen... yes
checking for strncasecmp... yes
checking for strstr... yes
checking for access... yes
checking for unlink... yes
checking for isspace... yes
checking for isdigit... yes
checking for isxdigit... yes
checking for time... yes
checking for ctime... yes
checking for gethostname... yes
checking for gettimeofday... yes
checking for getrusage... yes
checking for memmove... yes
checking for signal... yes
checking for fcntl... yes
checking for fileno... yes
checking for setvbuf... yes
checking for fallocate... yes
checking for aio_read... yes
checking for aio_init... yes
checking for _fseeki64... no
checking for _ftelli64... no
checking for malloc_usable_size... yes
checking gmp.h usability... yes
checking gmp.h presence... yes
checking for gmp.h... yes
checking for recent GMP... yes
checking if GMP is MPIR... no
checking whether we can link against GMP... yes
checking if gmp.h version and libgmp version are the same... (6.1.0/6.1.0) yes
checking for __gmpn_add_nc... yes
checking for __gmpn_mod_34lsub1... yes
checking for __gmpn_redc_1... yes
checking for __gmpn_redc_2... yes
checking for __gmpn_mullo_n... yes
checking for __gmpn_redc_n... yes
checking for __gmpn_preinv_mod_1... yes
checking for __gmpn_mod_1s_4p_cps... yes
checking for __gmpn_mod_1s_4p... yes
checking for __gmpn_mul_fft... yes
checking for __gmpn_fft_next_size... yes
checking for __gmpn_fft_best_k... yes
checking for __gmpn_mulmod_bnm1... yes
checking for __gmpn_mulmod_bnm1_next_size... yes
checking whether compiler knows __attribute__((hot))... yes
checking for xsltproc... no
checking for valgrind... no
creating config.m4
checking that generated files are newer than configure... done
configure: creating ./config.status
config.status: creating Makefile
config.status: creating athlon/Makefile
config.status: creating pentium4/Makefile
config.status: creating x86_64/Makefile
config.status: creating powerpc64/Makefile
config.status: creating aprtcle/Makefile
config.status: creating build.vc12/Makefile
config.status: creating build.vc12/assembler/Makefile
config.status: creating build.vc12/ecm/Makefile
config.status: creating build.vc12/ecm_gpu/Makefile
config.status: creating build.vc12/libecm/Makefile
config.status: creating build.vc12/libecm_gpu/Makefile
config.status: creating build.vc12/tune/Makefile
config.status: creating build.vc12/bench_mulredc/Makefile
config.status: creating config.h
config.status: creating ecm.h
config.status: executing depfiles commands
config.status: executing libtool commands
configure: WARNING: unrecognized options: --disable-maintainer-mode, --enable-maintainer-mode
configure: Configuration:
configure: Build for host type arm-unknown-linux-gnueabihf
configure: CC=gcc, CFLAGS=-g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security
configure: Linking GMP with -lgmp
configure: Not using asm redc code
configure: Not using SSE2 instructions in NTT code
configure: Using APRCL to prove factors prime/composite
configure: Assertions disabled
configure: Shell command execution disabled
configure: OpenMP disabled
configure: Memory debugging disabled
make[1]: Leaving directory '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds'
dh_auto_build -a -O--builddirectory=_build -O--parallel
make -j4
make[1]: Entering directory '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds/_build'
make all-recursive
make[2]: Entering directory '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds/_build'
make[3]: Entering directory '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds/_build'
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-ecm.lo `test -f 'ecm.c' || echo '../'`ecm.c
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-ecm2.lo `test -f 'ecm2.c' || echo '../'`ecm2.c
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-pm1.lo `test -f 'pm1.c' || echo '../'`pm1.c
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-pp1.lo `test -f 'pp1.c' || echo '../'`pp1.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../pm1.c -fPIC -DPIC -o .libs/libecm_la-pm1.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../ecm2.c -fPIC -DPIC -o .libs/libecm_la-ecm2.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../pp1.c -fPIC -DPIC -o .libs/libecm_la-pp1.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../ecm.c -fPIC -DPIC -o .libs/libecm_la-ecm.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../pp1.c -fPIE -o libecm_la-pp1.o >/dev/null 2>&1
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../pm1.c -fPIE -o libecm_la-pm1.o >/dev/null 2>&1
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-getprime_r.lo `test -f 'getprime_r.c' || echo '../'`getprime_r.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../ecm2.c -fPIE -o libecm_la-ecm2.o >/dev/null 2>&1
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../getprime_r.c -fPIC -DPIC -o .libs/libecm_la-getprime_r.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../getprime_r.c -fPIE -o libecm_la-getprime_r.o >/dev/null 2>&1
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-listz.lo `test -f 'listz.c' || echo '../'`listz.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../listz.c -fPIC -DPIC -o .libs/libecm_la-listz.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../ecm.c -fPIE -o libecm_la-ecm.o >/dev/null 2>&1
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-lucas.lo `test -f 'lucas.c' || echo '../'`lucas.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../lucas.c -fPIC -DPIC -o .libs/libecm_la-lucas.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../lucas.c -fPIE -o libecm_la-lucas.o >/dev/null 2>&1
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../listz.c -fPIE -o libecm_la-listz.o >/dev/null 2>&1
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-stage2.lo `test -f 'stage2.c' || echo '../'`stage2.c
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-mpmod.lo `test -f 'mpmod.c' || echo '../'`mpmod.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../stage2.c -fPIC -DPIC -o .libs/libecm_la-stage2.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../mpmod.c -fPIC -DPIC -o .libs/libecm_la-mpmod.o
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-mul_lo.lo `test -f 'mul_lo.c' || echo '../'`mul_lo.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../mul_lo.c -fPIC -DPIC -o .libs/libecm_la-mul_lo.o
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-polyeval.lo `test -f 'polyeval.c' || echo '../'`polyeval.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../mul_lo.c -fPIE -o libecm_la-mul_lo.o >/dev/null 2>&1
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../stage2.c -fPIE -o libecm_la-stage2.o >/dev/null 2>&1
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../polyeval.c -fPIC -DPIC -o .libs/libecm_la-polyeval.o
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-median.lo `test -f 'median.c' || echo '../'`median.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../median.c -fPIC -DPIC -o .libs/libecm_la-median.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../polyeval.c -fPIE -o libecm_la-polyeval.o >/dev/null 2>&1
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-schoen_strass.lo `test -f 'schoen_strass.c' || echo '../'`schoen_strass.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../mpmod.c -fPIE -o libecm_la-mpmod.o >/dev/null 2>&1
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../median.c -fPIE -o libecm_la-median.o >/dev/null 2>&1
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../schoen_strass.c -fPIC -DPIC -o .libs/libecm_la-schoen_strass.o
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-ks-multiply.lo `test -f 'ks-multiply.c' || echo '../'`ks-multiply.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../ks-multiply.c -fPIC -DPIC -o .libs/libecm_la-ks-multiply.o
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-rho.lo `test -f 'rho.c' || echo '../'`rho.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../rho.c -fPIC -DPIC -o .libs/libecm_la-rho.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../ks-multiply.c -fPIE -o libecm_la-ks-multiply.o >/dev/null 2>&1
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../rho.c -fPIE -o libecm_la-rho.o >/dev/null 2>&1
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-bestd.lo `test -f 'bestd.c' || echo '../'`bestd.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../bestd.c -fPIC -DPIC -o .libs/libecm_la-bestd.o
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-auxlib.lo `test -f 'auxlib.c' || echo '../'`auxlib.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../auxlib.c -fPIC -DPIC -o .libs/libecm_la-auxlib.o
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-random.lo `test -f 'random.c' || echo '../'`random.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../schoen_strass.c -fPIE -o libecm_la-schoen_strass.o >/dev/null 2>&1
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../auxlib.c -fPIE -o libecm_la-auxlib.o >/dev/null 2>&1
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../random.c -fPIC -DPIC -o .libs/libecm_la-random.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../bestd.c -fPIE -o libecm_la-bestd.o >/dev/null 2>&1
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../random.c -fPIE -o libecm_la-random.o >/dev/null 2>&1
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-factor.lo `test -f 'factor.c' || echo '../'`factor.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../factor.c -fPIC -DPIC -o .libs/libecm_la-factor.o
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-sp.lo `test -f 'sp.c' || echo '../'`sp.c
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-spv.lo `test -f 'spv.c' || echo '../'`spv.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../sp.c -fPIC -DPIC -o .libs/libecm_la-sp.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../spv.c -fPIC -DPIC -o .libs/libecm_la-spv.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../factor.c -fPIE -o libecm_la-factor.o >/dev/null 2>&1
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../sp.c -fPIE -o libecm_la-sp.o >/dev/null 2>&1
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../spv.c -fPIE -o libecm_la-spv.o >/dev/null 2>&1
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-spm.lo `test -f 'spm.c' || echo '../'`spm.c
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-mpzspm.lo `test -f 'mpzspm.c' || echo '../'`mpzspm.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../spm.c -fPIC -DPIC -o .libs/libecm_la-spm.o
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-mpzspv.lo `test -f 'mpzspv.c' || echo '../'`mpzspv.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../mpzspm.c -fPIC -DPIC -o .libs/libecm_la-mpzspm.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../mpzspv.c -fPIC -DPIC -o .libs/libecm_la-mpzspv.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../mpzspm.c -fPIE -o libecm_la-mpzspm.o >/dev/null 2>&1
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../spm.c -fPIE -o libecm_la-spm.o >/dev/null 2>&1
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-ntt_gfp.lo `test -f 'ntt_gfp.c' || echo '../'`ntt_gfp.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../ntt_gfp.c -fPIC -DPIC -o .libs/libecm_la-ntt_gfp.o
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-ecm_ntt.lo `test -f 'ecm_ntt.c' || echo '../'`ecm_ntt.c
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-pm1fs2.lo `test -f 'pm1fs2.c' || echo '../'`pm1fs2.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../ecm_ntt.c -fPIC -DPIC -o .libs/libecm_la-ecm_ntt.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../pm1fs2.c -fPIC -DPIC -o .libs/libecm_la-pm1fs2.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../mpzspv.c -fPIE -o libecm_la-mpzspv.o >/dev/null 2>&1
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../ntt_gfp.c -fPIE -o libecm_la-ntt_gfp.o >/dev/null 2>&1
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../ecm_ntt.c -fPIE -o libecm_la-ecm_ntt.o >/dev/null 2>&1
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-sets_long.lo `test -f 'sets_long.c' || echo '../'`sets_long.c
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-auxarith.lo `test -f 'auxarith.c' || echo '../'`auxarith.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../sets_long.c -fPIC -DPIC -o .libs/libecm_la-sets_long.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../auxarith.c -fPIC -DPIC -o .libs/libecm_la-auxarith.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../auxarith.c -fPIE -o libecm_la-auxarith.o >/dev/null 2>&1
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-batch.lo `test -f 'batch.c' || echo '../'`batch.c
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-parametrizations.lo `test -f 'parametrizations.c' || echo '../'`parametrizations.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../batch.c -fPIC -DPIC -o .libs/libecm_la-batch.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../parametrizations.c -fPIC -DPIC -o .libs/libecm_la-parametrizations.o
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../batch.c -fPIE -o libecm_la-batch.o >/dev/null 2>&1
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../parametrizations.c -fPIE -o libecm_la-parametrizations.o >/dev/null 2>&1
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../sets_long.c -fPIE -o libecm_la-sets_long.o >/dev/null 2>&1
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o libecm_la-cudawrapper.lo `test -f 'cudawrapper.c' || echo '../'`cudawrapper.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../cudawrapper.c -fPIC -DPIC -o .libs/libecm_la-cudawrapper.o
gcc -DHAVE_CONFIG_H -I. -I.. -DOUTSIDE_LIBECM -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o ecm-auxi.o `test -f 'auxi.c' || echo '../'`auxi.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../cudawrapper.c -fPIE -o libecm_la-cudawrapper.o >/dev/null 2>&1
gcc -DHAVE_CONFIG_H -I. -I.. -DOUTSIDE_LIBECM -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o ecm-b1_ainc.o `test -f 'b1_ainc.c' || echo '../'`b1_ainc.c
gcc -DHAVE_CONFIG_H -I. -I.. -DOUTSIDE_LIBECM -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o ecm-candi.o `test -f 'candi.c' || echo '../'`candi.c
gcc -DHAVE_CONFIG_H -I. -I.. -DOUTSIDE_LIBECM -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o ecm-eval.o `test -f 'eval.c' || echo '../'`eval.c
gcc -DHAVE_CONFIG_H -I. -I.. -DOUTSIDE_LIBECM -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o ecm-main.o `test -f 'main.c' || echo '../'`main.c
gcc -DHAVE_CONFIG_H -I. -I.. -DOUTSIDE_LIBECM -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o ecm-resume.o `test -f 'resume.c' || echo '../'`resume.c
gcc -DHAVE_CONFIG_H -I. -I.. -DOUTSIDE_LIBECM -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o ecm-getprime_r.o `test -f 'getprime_r.c' || echo '../'`getprime_r.c
gcc -DHAVE_CONFIG_H -I. -I.. -DOUTSIDE_LIBECM -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o aprtcle/ecm-mpz_aprcl.o `test -f 'aprtcle/mpz_aprcl.c' || echo '../'`aprtcle/mpz_aprcl.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../pm1fs2.c -fPIE -o libecm_la-pm1fs2.o >/dev/null 2>&1
gcc -DHAVE_CONFIG_H -I. -I.. -DOUTSIDE_LIBECM -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o ecm-memusage.o `test -f 'memusage.c' || echo '../'`memusage.c
gcc -DHAVE_CONFIG_H -I. -I.. -DTUNE -Wdate-time -D_FORTIFY_SOURCE=2 -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o tune-mpmod.o `test -f 'mpmod.c' || echo '../'`mpmod.c
gcc -DHAVE_CONFIG_H -I. -I.. -DTUNE -Wdate-time -D_FORTIFY_SOURCE=2 -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o tune-tune.o `test -f 'tune.c' || echo '../'`tune.c
gcc -DHAVE_CONFIG_H -I. -I.. -DTUNE -Wdate-time -D_FORTIFY_SOURCE=2 -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o tune-mul_lo.o `test -f 'mul_lo.c' || echo '../'`mul_lo.c
gcc -DHAVE_CONFIG_H -I. -I.. -DTUNE -Wdate-time -D_FORTIFY_SOURCE=2 -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o tune-listz.o `test -f 'listz.c' || echo '../'`listz.c
gcc -DHAVE_CONFIG_H -I. -I.. -DTUNE -Wdate-time -D_FORTIFY_SOURCE=2 -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o tune-auxlib.o `test -f 'auxlib.c' || echo '../'`auxlib.c
gcc -DHAVE_CONFIG_H -I. -I.. -DTUNE -Wdate-time -D_FORTIFY_SOURCE=2 -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o tune-ks-multiply.o `test -f 'ks-multiply.c' || echo '../'`ks-multiply.c
gcc -DHAVE_CONFIG_H -I. -I.. -DTUNE -Wdate-time -D_FORTIFY_SOURCE=2 -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o tune-schoen_strass.o `test -f 'schoen_strass.c' || echo '../'`schoen_strass.c
gcc -DHAVE_CONFIG_H -I. -I.. -DTUNE -Wdate-time -D_FORTIFY_SOURCE=2 -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o tune-polyeval.o `test -f 'polyeval.c' || echo '../'`polyeval.c
gcc -DHAVE_CONFIG_H -I. -I.. -DTUNE -Wdate-time -D_FORTIFY_SOURCE=2 -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o tune-median.o `test -f 'median.c' || echo '../'`median.c
gcc -DHAVE_CONFIG_H -I. -I.. -DTUNE -Wdate-time -D_FORTIFY_SOURCE=2 -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o tune-ecm_ntt.o `test -f 'ecm_ntt.c' || echo '../'`ecm_ntt.c
gcc -DHAVE_CONFIG_H -I. -I.. -DTUNE -Wdate-time -D_FORTIFY_SOURCE=2 -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o tune-ntt_gfp.o `test -f 'ntt_gfp.c' || echo '../'`ntt_gfp.c
gcc -DHAVE_CONFIG_H -I. -I.. -DTUNE -Wdate-time -D_FORTIFY_SOURCE=2 -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o tune-mpzspv.o `test -f 'mpzspv.c' || echo '../'`mpzspv.c
gcc -DHAVE_CONFIG_H -I. -I.. -DTUNE -Wdate-time -D_FORTIFY_SOURCE=2 -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o tune-mpzspm.o `test -f 'mpzspm.c' || echo '../'`mpzspm.c
gcc -DHAVE_CONFIG_H -I. -I.. -DTUNE -Wdate-time -D_FORTIFY_SOURCE=2 -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o tune-sp.o `test -f 'sp.c' || echo '../'`sp.c
gcc -DHAVE_CONFIG_H -I. -I.. -DTUNE -Wdate-time -D_FORTIFY_SOURCE=2 -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o tune-spv.o `test -f 'spv.c' || echo '../'`spv.c
gcc -DHAVE_CONFIG_H -I. -I.. -DTUNE -Wdate-time -D_FORTIFY_SOURCE=2 -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o tune-spm.o `test -f 'spm.c' || echo '../'`spm.c
gcc -DHAVE_CONFIG_H -I. -I.. -DTUNE -Wdate-time -D_FORTIFY_SOURCE=2 -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o tune-auxarith.o `test -f 'auxarith.c' || echo '../'`auxarith.c
gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -lpthread -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o ecmfactor-ecmfactor.o `test -f 'ecmfactor.c' || echo '../'`ecmfactor.c
gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o bench_mulredc-bench_mulredc.o `test -f 'bench_mulredc.c' || echo '../'`bench_mulredc.c
gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -Wall -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o aprtcle/aprcl-mpz_aprcl.o `test -f 'aprtcle/mpz_aprcl.c' || echo '../'`aprtcle/mpz_aprcl.c
gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -Wall -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o aprtcle/aprcl-aprcl.o `test -f 'aprtcle/aprcl.c' || echo '../'`aprtcle/aprcl.c
/bin/bash ./libtool --tag=CC --mode=compile gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -c -o aprtcle/libecm_la-mpz_aprcl.lo `test -f 'aprtcle/mpz_aprcl.c' || echo '../'`aprtcle/mpz_aprcl.c
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../aprtcle/mpz_aprcl.c -fPIC -DPIC -o aprtcle/.libs/libecm_la-mpz_aprcl.o
/bin/bash ./libtool --tag=CC --mode=link gcc -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -fPIE -pie -Wl,-z,relro -Wl,-z,now -o tune tune-mpmod.o tune-tune.o tune-mul_lo.o tune-listz.o tune-auxlib.o tune-ks-multiply.o tune-schoen_strass.o tune-polyeval.o tune-median.o tune-ecm_ntt.o tune-ntt_gfp.o tune-mpzspv.o tune-mpzspm.o tune-sp.o tune-spv.o tune-spm.o tune-auxarith.o -lgmp -lrt -lm -lm -lm -lm -lm
/bin/bash ./libtool --tag=CC --mode=link gcc -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -fPIE -pie -Wl,-z,relro -Wl,-z,now -o bench_mulredc bench_mulredc-bench_mulredc.o -lgmp -lrt -lm -lm -lm -lm -lm
libtool: link: gcc -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -fPIE -pie -Wl,-z -Wl,relro -Wl,-z -Wl,now -o tune tune-mpmod.o tune-tune.o tune-mul_lo.o tune-listz.o tune-auxlib.o tune-ks-multiply.o tune-schoen_strass.o tune-polyeval.o tune-median.o tune-ecm_ntt.o tune-ntt_gfp.o tune-mpzspv.o tune-mpzspm.o tune-sp.o tune-spv.o tune-spm.o tune-auxarith.o -lgmp -lrt -lm
libtool: link: gcc -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -fPIE -pie -Wl,-z -Wl,relro -Wl,-z -Wl,now -o bench_mulredc bench_mulredc-bench_mulredc.o -lgmp -lrt -lm
libtool: compile: gcc -DHAVE_CONFIG_H -I. -I.. -Wdate-time -D_FORTIFY_SOURCE=2 -g -g -O3 -fstack-protector-strong -Wformat -Werror=format-security -c ../aprtcle/mpz_aprcl.c -fPIE -o aprtcle/libecm_la-mpz_aprcl.o >/dev/null 2>&1
/bin/bash ./libtool --tag=CC --mode=link gcc -Wall -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -fPIE -pie -Wl,-z,relro -Wl,-z,now -o aprcl aprtcle/aprcl-mpz_aprcl.o aprtcle/aprcl-aprcl.o -lgmp -lrt -lm -lm -lm -lm -lm
libtool: link: gcc -Wall -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -fPIE -pie -Wl,-z -Wl,relro -Wl,-z -Wl,now -o aprcl aprtcle/aprcl-mpz_aprcl.o aprtcle/aprcl-aprcl.o -lgmp -lrt -lm
/bin/bash ./libtool --tag=CC --mode=link gcc -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -version-info 1:0:0 -g -Wl,-znoexecstack -fPIE -pie -Wl,-z,relro -Wl,-z,now -o libecm.la -rpath /usr/lib/arm-linux-gnueabihf libecm_la-ecm.lo libecm_la-ecm2.lo libecm_la-pm1.lo libecm_la-pp1.lo libecm_la-getprime_r.lo libecm_la-listz.lo libecm_la-lucas.lo libecm_la-stage2.lo libecm_la-mpmod.lo libecm_la-mul_lo.lo libecm_la-polyeval.lo libecm_la-median.lo libecm_la-schoen_strass.lo libecm_la-ks-multiply.lo libecm_la-rho.lo libecm_la-bestd.lo libecm_la-auxlib.lo libecm_la-random.lo libecm_la-factor.lo libecm_la-sp.lo libecm_la-spv.lo libecm_la-spm.lo libecm_la-mpzspm.lo libecm_la-mpzspv.lo libecm_la-ntt_gfp.lo libecm_la-ecm_ntt.lo libecm_la-pm1fs2.lo libecm_la-sets_long.lo libecm_la-auxarith.lo libecm_la-batch.lo libecm_la-parametrizations.lo libecm_la-cudawrapper.lo aprtcle/libecm_la-mpz_aprcl.lo -lgmp -lrt -lm -lm -lm -lm -lm
libtool: link: gcc -shared -fPIC -DPIC .libs/libecm_la-ecm.o .libs/libecm_la-ecm2.o .libs/libecm_la-pm1.o .libs/libecm_la-pp1.o .libs/libecm_la-getprime_r.o .libs/libecm_la-listz.o .libs/libecm_la-lucas.o .libs/libecm_la-stage2.o .libs/libecm_la-mpmod.o .libs/libecm_la-mul_lo.o .libs/libecm_la-polyeval.o .libs/libecm_la-median.o .libs/libecm_la-schoen_strass.o .libs/libecm_la-ks-multiply.o .libs/libecm_la-rho.o .libs/libecm_la-bestd.o .libs/libecm_la-auxlib.o .libs/libecm_la-random.o .libs/libecm_la-factor.o .libs/libecm_la-sp.o .libs/libecm_la-spv.o .libs/libecm_la-spm.o .libs/libecm_la-mpzspm.o .libs/libecm_la-mpzspv.o .libs/libecm_la-ntt_gfp.o .libs/libecm_la-ecm_ntt.o .libs/libecm_la-pm1fs2.o .libs/libecm_la-sets_long.o .libs/libecm_la-auxarith.o .libs/libecm_la-batch.o .libs/libecm_la-parametrizations.o .libs/libecm_la-cudawrapper.o aprtcle/.libs/libecm_la-mpz_aprcl.o -lgmp -lrt -lm -g -g -O3 -fstack-protector-strong -g -Wl,-znoexecstack -Wl,-z -Wl,relro -Wl,-z -Wl,now -Wl,-soname -Wl,libecm.so.1 -o .libs/libecm.so.1.0.0
libtool: link: (cd ".libs" && rm -f "libecm.so.1" && ln -s "libecm.so.1.0.0" "libecm.so.1")
libtool: link: (cd ".libs" && rm -f "libecm.so" && ln -s "libecm.so.1.0.0" "libecm.so")
libtool: link: ar cru .libs/libecm.a libecm_la-ecm.o libecm_la-ecm2.o libecm_la-pm1.o libecm_la-pp1.o libecm_la-getprime_r.o libecm_la-listz.o libecm_la-lucas.o libecm_la-stage2.o libecm_la-mpmod.o libecm_la-mul_lo.o libecm_la-polyeval.o libecm_la-median.o libecm_la-schoen_strass.o libecm_la-ks-multiply.o libecm_la-rho.o libecm_la-bestd.o libecm_la-auxlib.o libecm_la-random.o libecm_la-factor.o libecm_la-sp.o libecm_la-spv.o libecm_la-spm.o libecm_la-mpzspm.o libecm_la-mpzspv.o libecm_la-ntt_gfp.o libecm_la-ecm_ntt.o libecm_la-pm1fs2.o libecm_la-sets_long.o libecm_la-auxarith.o libecm_la-batch.o libecm_la-parametrizations.o libecm_la-cudawrapper.o aprtcle/libecm_la-mpz_aprcl.o
ar: `u' modifier ignored since `D' is the default (see `U')
libtool: link: ranlib .libs/libecm.a
libtool: link: ( cd ".libs" && rm -f "libecm.la" && ln -s "../libecm.la" "libecm.la" )
/bin/bash ./libtool --tag=CC --mode=link gcc -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -fPIE -pie -Wl,-z,relro -Wl,-z,now -o ecm ecm-auxi.o ecm-b1_ainc.o ecm-candi.o ecm-eval.o ecm-main.o ecm-resume.o ecm-getprime_r.o aprtcle/ecm-mpz_aprcl.o ecm-memusage.o libecm.la -lgmp -lrt -lm -lm -lm -lm -lm
/bin/bash ./libtool --tag=CC --mode=link gcc -lpthread -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -fPIE -pie -Wl,-z,relro -Wl,-z,now -o ecmfactor ecmfactor-ecmfactor.o libecm.la -lgmp -lrt -lm -lm -lm -lm -lm
libtool: link: gcc -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -fPIE -pie -Wl,-z -Wl,relro -Wl,-z -Wl,now -o .libs/ecmfactor ecmfactor-ecmfactor.o -lpthread ./.libs/libecm.so -lgmp -lrt -lm
libtool: link: gcc -g -g -O3 -fPIE -fstack-protector-strong -Wformat -Werror=format-security -fPIE -pie -Wl,-z -Wl,relro -Wl,-z -Wl,now -o .libs/ecm ecm-auxi.o ecm-b1_ainc.o ecm-candi.o ecm-eval.o ecm-main.o ecm-resume.o ecm-getprime_r.o aprtcle/ecm-mpz_aprcl.o ecm-memusage.o ./.libs/libecm.so -lgmp -lrt -lm
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dh_auto_test -a -O--builddirectory=_build -O--parallel
make -j4 check VERBOSE=1
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../test.pp1 ./ecm
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 328006342451 (12 digits)
Using B1=120, B2=13384, polynomial x^1, x0=5
Step 1 took 4ms
Step 2 took 4ms
********** Factor found in step 2: 328006342451
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 328006342451 (12 digits)
Using B1=120, B2=13384, polynomial x^1, x0=262405073961
Step 1 took 4ms
Step 2 took 4ms
********** Factor found in step 2: 328006342451
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 2050449218179969792522461197 (28 digits)
Using B1=20, B2=20-1115080, polynomial x^1, x0=6
Step 1 took 8ms
Step 2 took 32ms
********** Factor found in step 2: 30210179
Found prime factor of 8 digits: 30210179
Prime cofactor 67872792749091946543 has 20 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 6215074747201 (13 digits)
Using B1=630, B2=248502, polynomial x^1, x0=5
Step 1 took 8ms
Step 2 took 12ms
********** Factor found in step 2: 6215074747201
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 6215074747201 (13 digits)
Using B1=630, B2=248502, polynomial x^1, x0=5
Step 1 took 4ms
Step 2 took 16ms
********** Factor found in step 2: 6215074747201
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 6215074747201 (13 digits)
Using B1=630, B2=248502, polynomial x^1, x0=5
Step 1 took 8ms
Step 2 took 12ms
********** Factor found in step 2: 6215074747201
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 8857714771093 (13 digits)
Using B1=23251, B2=53722, polynomial x^1, x0=3
Step 1 took 44ms
Step 2 took 8ms
********** Factor found in step 2: 8857714771093
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 236344687097 (12 digits)
Using B1=619, B2=62500, polynomial x^1, x0=3
Step 1 took 8ms
Step 2 took 4ms
********** Factor found in step 2: 236344687097
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 87251820842149 (14 digits)
Using B1=3691, B2=286878, polynomial x^1, x0=5
Step 1 took 12ms
Step 2 took 16ms
********** Factor found in step 2: 87251820842149
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 719571227339189 (15 digits)
Using B1=41039, B2=71740, polynomial x^1, x0=4
Step 1 took 68ms
Step 2 took 4ms
********** Factor found in step 2: 719571227339189
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 5468575720021 (13 digits)
Using B1=1439, B2=284778, polynomial x^1, x0=6
Step 1 took 8ms
Step 2 took 16ms
********** Factor found in step 2: 5468575720021
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 49804972211 (11 digits)
Using B1=15443, B2=298428, polynomial x^1, x0=5
Step 1 took 36ms
Step 2 took 12ms
********** Factor found in step 2: 49804972211
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 329573417220613 (15 digits)
Using B1=5279, B2=146178, polynomial x^1, x0=3
Step 1 took 16ms
Step 2 took 8ms
********** Factor found in step 2: 329573417220613
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 4866979762781 (13 digits)
Using B1=7309, B2=148278, polynomial x^1, x0=4
Step 1 took 24ms
Step 2 took 8ms
********** Factor found in step 2: 4866979762781
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 187333846633 (12 digits)
Using B1=2063, B2=9898, polynomial x^1, x0=3
Step 1 took 4ms
Step 2 took 4ms
********** Factor found in step 2: 187333846633
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 332526664667473 (15 digits)
Using B1=65993, B2=128104, polynomial x^1, x0=3
Step 1 took 120ms
Step 2 took 4ms
********** Factor found in step 2: 332526664667473
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 265043186297 (12 digits)
Using B1=8761, B2=292128, polynomial x^1, x0=3
Step 1 took 20ms
Step 2 took 8ms
********** Factor found in step 2: 265043186297
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 207734163253 (12 digits)
Using B1=1877, B2=5350, polynomial x^1, x0=3
Step 1 took 8ms
Step 2 took 0ms
********** Factor found in step 2: 207734163253
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 225974065503889 (15 digits)
Using B1=7867, B2=8560, polynomial x^1, x0=5
Step 1 took 16ms
Step 2 took 4ms
********** Factor found in step 2: 225974065503889
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 660198074631409 (15 digits)
Using B1=22541, B2=162978, polynomial x^1, x0=5
Step 1 took 44ms
Step 2 took 8ms
********** Factor found in step 2: 660198074631409
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 563215815517 (12 digits)
Using B1=3469, B2=144078, polynomial x^1, x0=3
Step 1 took 12ms
Step 2 took 4ms
********** Factor found in step 2: 563215815517
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 563215815517 (12 digits)
Using B1=3469, B2=109848-109884, polynomial x^1, x0=3
Step 1 took 8ms
Step 2 took 0ms
********** Factor found in step 2: 563215815517
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 409100738617 (12 digits)
Using B1=19, B2=54, polynomial x^1, x0=3
Step 1 took 0ms
********** Factor found in step 1: 409100738617
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 2277189375098448170118558775447117254551111605543304035536750762506158547102293199086726265869065639109 (103 digits)
Using B1=2337233, B2=173055082, polynomial x^1, x0=3
Step 1 took 15432ms
Step 2 took 996ms
********** Factor found in step 2: 4190453151940208656715582382315221647
Found prime factor of 37 digits: 4190453151940208656715582382315221647
Prime cofactor 543423179434447039008165356160798838947285203071935410761431031147 has 66 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 2277189375098448170118558775447117254551111605543304035536750762506158547102293199086726265869065639109 (103 digits)
Using B1=1000000, B2=0, polynomial x^1, x0=3
Step 1 took 6624ms
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Resuming P+1 residue saved by buildd@bm-wb-03 with GMP-ECM 7.0.1 on Tue Jun 21 05:14:51 2016
Input number is 2277189375098448170118558775447117254551111605543304035536750762506158547102293199086726265869065639109 (103 digits)
Using B1=1000000-2337233, B2=173055082, polynomial x^1
Step 1 took 8904ms
Step 2 took 1008ms
********** Factor found in step 2: 4190453151940208656715582382315221647
Found prime factor of 37 digits: 4190453151940208656715582382315221647
Prime cofactor 543423179434447039008165356160798838947285203071935410761431031147 has 66 digits
chkpnt
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 2277189375098448170118558775447117254551111605543304035536750762506158547102293199086726265869065639109 (103 digits)
Using B1=1000000, B2=0, polynomial x^1, x0=3
Step 1 took 6776ms
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Resuming P+1 residue
Input number is 2277189375098448170118558775447117254551111605543304035536750762506158547102293199086726265869065639109 (103 digits)
Using B1=1000000-2337233, B2=173055082, polynomial x^1
Step 1 took 8920ms
Step 2 took 1004ms
********** Factor found in step 2: 4190453151940208656715582382315221647
Found prime factor of 37 digits: 4190453151940208656715582382315221647
Prime cofactor 543423179434447039008165356160798838947285203071935410761431031147 has 66 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 630503947831861669 (18 digits)
Using B1=7, B2=9007199254739930-9007199254741630, polynomial x^1, x0=5
Step 1 took 4ms
Step 2 took 0ms
********** Factor found in step 2: 630503947831861669
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 6054018161*10^400+417727253109 (410 digits)
Using B1=2000, B2=2352760, polynomial x^1, x0=4
Step 1 took 148ms
Step 2 took 1388ms
********** Factor found in step 2: 6054018161
Found prime factor of 10 digits: 6054018161
P = 2, Q = 3 (0.23%)
P = 2, Q = 5 (0.45%)
P = 2, Q = 7 (0.68%)
P = 2, Q = 11 (0.90%)
P = 2, Q = 13 (1.13%)
P = 2, Q = 31 (1.35%)
P = 2, Q = 61 (1.58%)
P = 2, Q = 17 (1.80%)
P = 2, Q = 19 (2.03%)
P = 2, Q = 29 (2.25%)
P = 2, Q = 37 (2.48%)
P = 2, Q = 41 (2.70%)
P = 2, Q = 43 (2.93%)
P = 2, Q = 71 (3.15%)
P = 2, Q = 73 (3.38%)
P = 2, Q = 113 (3.60%)
P = 2, Q = 127 (3.83%)
P = 2, Q = 181 (4.05%)
P = 2, Q = 211 (4.28%)
P = 2, Q = 241 (4.50%)
P = 2, Q = 281 (4.73%)
P = 2, Q = 337 (4.95%)
P = 2, Q = 421 (5.18%)
P = 2, Q = 631 (5.41%)
P = 2, Q = 1009 (5.63%)
P = 2, Q = 2521 (5.86%)
P = 2, Q = 23 (6.08%)
P = 2, Q = 67 (6.31%)
P = 2, Q = 89 (6.53%)
P = 2, Q = 199 (6.76%)
P = 2, Q = 331 (6.98%)
P = 2, Q = 397 (7.21%)
P = 2, Q = 463 (7.43%)
P = 2, Q = 617 (7.66%)
P = 2, Q = 661 (7.88%)
P = 2, Q = 881 (8.11%)
P = 2, Q = 991 (8.33%)
P = 2, Q = 1321 (8.56%)
P = 2, Q = 2311 (8.78%)
P = 2, Q = 3697 (9.01%)
P = 2, Q = 4621 (9.23%)
P = 2, Q = 9241 (9.46%)
P = 2, Q = 18481 (9.68%)
P = 2, Q = 55441 (9.91%)
P = 2, Q = 53 (10.14%)
P = 2, Q = 79 (10.36%)
P = 2, Q = 131 (10.59%)
P = 2, Q = 157 (10.81%)
P = 2, Q = 313 (11.04%)
P = 2, Q = 521 (11.26%)
P = 2, Q = 547 (11.49%)
P = 2, Q = 859 (11.71%)
P = 2, Q = 911 (11.94%)
P = 2, Q = 937 (12.16%)
P = 2, Q = 1093 (12.39%)
P = 2, Q = 1171 (12.61%)
P = 2, Q = 1873 (12.84%)
P = 2, Q = 2003 (13.06%)
P = 2, Q = 2341 (13.29%)
P = 2, Q = 2731 (13.51%)
P = 2, Q = 2861 (13.74%)
P = 2, Q = 3121 (13.96%)
P = 2, Q = 3433 (14.19%)
P = 2, Q = 6007 (14.41%)
P = 2, Q = 6553 (14.64%)
P = 2, Q = 8009 (14.86%)
P = 2, Q = 8191 (15.09%)
P = 2, Q = 8581 (15.32%)
P = 2, Q = 16381 (15.54%)
P = 2, Q = 20021 (15.77%)
P = 2, Q = 20593 (15.99%)
P = 2, Q = 21841 (16.22%)
P = 2, Q = 25741 (16.44%)
P = 3, Q = 7 (17.34%)
P = 3, Q = 13 (17.79%)
P = 3, Q = 31 (18.02%)
P = 3, Q = 61 (18.24%)
P = 3, Q = 19 (18.69%)
P = 3, Q = 37 (19.14%)
P = 3, Q = 43 (19.59%)
P = 3, Q = 73 (20.05%)
P = 3, Q = 127 (20.50%)
P = 3, Q = 181 (20.72%)
P = 3, Q = 211 (20.95%)
P = 3, Q = 241 (21.17%)
P = 3, Q = 337 (21.62%)
P = 3, Q = 421 (21.85%)
P = 3, Q = 631 (22.07%)
P = 3, Q = 1009 (22.30%)
P = 3, Q = 2521 (22.52%)
P = 3, Q = 67 (22.97%)
P = 3, Q = 199 (23.42%)
P = 3, Q = 331 (23.65%)
P = 3, Q = 397 (23.87%)
P = 3, Q = 463 (24.10%)
P = 3, Q = 661 (24.55%)
P = 3, Q = 991 (25.00%)
P = 3, Q = 1321 (25.23%)
P = 3, Q = 2311 (25.45%)
P = 3, Q = 3697 (25.68%)
P = 3, Q = 4621 (25.90%)
P = 3, Q = 9241 (26.13%)
P = 3, Q = 18481 (26.35%)
P = 3, Q = 55441 (26.58%)
P = 3, Q = 79 (27.03%)
P = 3, Q = 157 (27.48%)
P = 3, Q = 313 (27.70%)
P = 3, Q = 547 (28.15%)
P = 3, Q = 859 (28.38%)
P = 3, Q = 937 (28.83%)
P = 3, Q = 1093 (29.05%)
P = 3, Q = 1171 (29.28%)
P = 3, Q = 1873 (29.50%)
P = 3, Q = 2341 (29.95%)
P = 3, Q = 2731 (30.18%)
P = 3, Q = 3121 (30.63%)
P = 3, Q = 3433 (30.86%)
P = 3, Q = 6007 (31.08%)
P = 3, Q = 6553 (31.31%)
P = 3, Q = 8191 (31.76%)
P = 3, Q = 8581 (31.98%)
P = 3, Q = 16381 (32.21%)
P = 3, Q = 20593 (32.66%)
P = 3, Q = 21841 (32.88%)
P = 3, Q = 25741 (33.11%)
P = 5, Q = 11 (34.23%)
P = 5, Q = 31 (34.68%)
P = 5, Q = 61 (34.91%)
P = 5, Q = 41 (36.04%)
P = 5, Q = 71 (36.49%)
P = 5, Q = 181 (37.39%)
P = 5, Q = 211 (37.61%)
P = 5, Q = 241 (37.84%)
P = 5, Q = 281 (38.06%)
P = 5, Q = 421 (38.51%)
P = 5, Q = 631 (38.74%)
P = 5, Q = 2521 (39.19%)
P = 5, Q = 331 (40.32%)
P = 5, Q = 661 (41.22%)
P = 5, Q = 881 (41.44%)
P = 5, Q = 991 (41.67%)
P = 5, Q = 1321 (41.89%)
P = 5, Q = 2311 (42.12%)
P = 5, Q = 4621 (42.57%)
P = 5, Q = 9241 (42.79%)
P = 5, Q = 18481 (43.02%)
P = 5, Q = 55441 (43.24%)
P = 5, Q = 131 (43.92%)
P = 5, Q = 521 (44.59%)
P = 5, Q = 911 (45.27%)
P = 5, Q = 1171 (45.95%)
P = 5, Q = 2341 (46.62%)
P = 5, Q = 2731 (46.85%)
P = 5, Q = 2861 (47.07%)
P = 5, Q = 3121 (47.30%)
P = 5, Q = 8191 (48.42%)
P = 5, Q = 8581 (48.65%)
P = 5, Q = 16381 (48.87%)
P = 5, Q = 20021 (49.10%)
P = 5, Q = 21841 (49.55%)
P = 5, Q = 25741 (49.77%)
P = 7, Q = 29 (52.25%)
P = 7, Q = 43 (52.93%)
P = 7, Q = 71 (53.15%)
P = 7, Q = 113 (53.60%)
P = 7, Q = 127 (53.83%)
P = 7, Q = 211 (54.28%)
P = 7, Q = 281 (54.73%)
P = 7, Q = 337 (54.95%)
P = 7, Q = 421 (55.18%)
P = 7, Q = 631 (55.41%)
P = 7, Q = 1009 (55.63%)
P = 7, Q = 2521 (55.86%)
P = 7, Q = 463 (57.43%)
P = 7, Q = 617 (57.66%)
P = 7, Q = 2311 (58.78%)
P = 7, Q = 3697 (59.01%)
P = 7, Q = 4621 (59.23%)
P = 7, Q = 9241 (59.46%)
P = 7, Q = 18481 (59.68%)
P = 7, Q = 55441 (59.91%)
P = 7, Q = 547 (61.49%)
P = 7, Q = 911 (61.94%)
P = 7, Q = 1093 (62.39%)
P = 7, Q = 2003 (63.06%)
P = 7, Q = 2731 (63.51%)
P = 7, Q = 6007 (64.41%)
P = 7, Q = 6553 (64.64%)
P = 7, Q = 8009 (64.86%)
P = 7, Q = 8191 (65.09%)
P = 7, Q = 16381 (65.54%)
P = 7, Q = 20021 (65.77%)
P = 7, Q = 21841 (66.22%)
P = 11, Q = 23 (72.75%)
P = 11, Q = 67 (72.97%)
P = 11, Q = 89 (73.20%)
P = 11, Q = 199 (73.42%)
P = 11, Q = 331 (73.65%)
P = 11, Q = 397 (73.87%)
P = 11, Q = 463 (74.10%)
P = 11, Q = 617 (74.32%)
P = 11, Q = 661 (74.55%)
P = 11, Q = 881 (74.77%)
P = 11, Q = 991 (75.00%)
P = 11, Q = 1321 (75.23%)
P = 11, Q = 2311 (75.45%)
P = 11, Q = 3697 (75.68%)
P = 11, Q = 4621 (75.90%)
P = 11, Q = 9241 (76.13%)
P = 11, Q = 18481 (76.35%)
P = 11, Q = 55441 (76.58%)
P = 11, Q = 859 (78.38%)
P = 11, Q = 2003 (79.73%)
P = 11, Q = 2861 (80.41%)
P = 11, Q = 3433 (80.86%)
P = 11, Q = 6007 (81.08%)
P = 11, Q = 8009 (81.53%)
P = 11, Q = 8581 (81.98%)
P = 11, Q = 20021 (82.43%)
P = 11, Q = 20593 (82.66%)
P = 11, Q = 25741 (83.11%)
P = 13, Q = 53 (93.47%)
P = 13, Q = 79 (93.69%)
P = 13, Q = 131 (93.92%)
P = 13, Q = 157 (94.14%)
P = 13, Q = 313 (94.37%)
P = 13, Q = 521 (94.59%)
P = 13, Q = 547 (94.82%)
P = 13, Q = 859 (95.05%)
P = 13, Q = 911 (95.27%)
P = 13, Q = 937 (95.50%)
P = 13, Q = 1093 (95.72%)
P = 13, Q = 1171 (95.95%)
P = 13, Q = 1873 (96.17%)
P = 13, Q = 2003 (96.40%)
P = 13, Q = 2341 (96.62%)
P = 13, Q = 2731 (96.85%)
P = 13, Q = 2861 (97.07%)
P = 13, Q = 3121 (97.30%)
P = 13, Q = 3433 (97.52%)
P = 13, Q = 6007 (97.75%)
P = 13, Q = 6553 (97.97%)
P = 13, Q = 8009 (98.20%)
P = 13, Q = 8191 (98.42%)
P = 13, Q = 8581 (98.65%)
P = 13, Q = 16381 (98.87%)
P = 13, Q = 20021 (99.10%)
P = 13, Q = 20593 (99.32%)
P = 13, Q = 21841 (99.55%)
P = 13, Q = 25741 (99.77%)
Prime cofactor (6054018161*10^400+417727253109)/6054018161 has 401 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 154618728587 (12 digits)
Using B1=4294957296-4294967295, B2=1, polynomial x^1
Step 1 took 92528ms
********** Factor found in step 1: 154618728587
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 18446744073709551337 (20 digits)
Using B1=70823, B2=1320588, polynomial x^1, x0=2
Step 1 took 136ms
********** Factor found in step 1: 18446744073709551337
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 95209938255048826235189575712705128366296557149606415206280987204268594538412191641776798249266895999715600261737863698825644292938050707507901970225804581 (155 digits)
Using B1=5000, B2=255378, polynomial x^1, x0=3186710182
Step 1 took 80ms
Step 2 took 96ms
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 95209938255048826235189575712705128366296557149606415206280987204268594538412191641776798249266895999715600261737863698825644292938050707507901970225804581 (155 digits)
Using B1=5000, B2=287928, polynomial x^1, x0=350975042
Step 1 took 76ms
Step 2 took 100ms
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 1234 (4 digits)
********** Factor found in step 1: 2
Found prime factor of 1 digits: 2
Prime cofactor 617 has 3 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Tuned for arm/params.h
Running on bm-wb-03
Input number is 95209938255048826235189575712705128366296557149606415206280987204268594538412191641776798249266895999715600261737863698825644292938050707507901970225804581 (155 digits)
Using MODMULN [mulredc:0, sqrredc:0]
Using lmax = 512 with one pass NTT which takes about 0MB of memory
Using B1=5000, B2=287928, polynomial x^1, x0=2948304821
P = 2199023256077, l = 4294967536, s_1 = 3201150324, k = s_2 = 0, m_1 = 3
Step 1 took 76ms
Computing F from factored S_1 took 28ms
Computing h_x and h_y took 8ms
Computing DCT-I of h_x took 4ms
Computing DCT-I of h_y took 4ms
Multi-point evaluation 1 of 1:
Computing g_x and g_y took 36ms
Computing forward NTT of g_x took 0ms
Computing forward NTT of g_y took 8ms
Adding and computing inverse NTT of sum took 4ms
Computing gcd of coefficients and N took 8ms
Step 2 took 100ms
Peak memory usage: 3MB
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Tuned for arm/params.h
Running on bm-wb-03
Input number is 95209938255048826235189575712705128366296557149606415206280987204268594538412191641776798249266895999715600261737863698825644292938050707507901970225804581 (155 digits)
Using MODMULN [mulredc:0, sqrredc:0]
Using lmax = 481 without NTT which takes about 0MB of memory
Using B1=5000, B2=255378, polynomial x^1, x0=1821021869
P = 2065879269901, l = 4294967536, s_1 = 3202682228, k = s_2 = 0, m_1 = 3
Step 1 took 68ms
Computing F from factored S_1 took 32ms
Computing h_x and h_y took 8ms
Multi-point evaluation 1 of 1:
Computing g_x and g_y took 12ms
TMulGen of g_x and h_x took 24ms
TMulGen of g_y and h_y took 20ms
Computing product of F(g_i)^(1) took 4ms
Step 2 took 100ms
Peak memory usage: 3MB
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 95209938255048826235189575712705128366296557149606415206280987204268594538412191641776798249266895999715600261737863698825644292938050707507901970225804581 (155 digits)
Error: cannot choose suitable P value for your stage 2 parameters.
Try a shorter B2min,B2 interval.
Please report internal errors at <ecm-discuss@lists.gforge.inria.fr>.
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Tuned for arm/params.h
Running on bm-wb-03
Input number is 33852066257429811148979390609187539760850944806763555795340084882048986912482949506591909041130651770779842162499482875755533111808276172876211496409325473343590723224081353129229935527059488811457730702694849036693756201766866018562295004353153066430367 (254 digits)
Using MODMULN [mulredc:4, sqrredc:4]
Using B1=100000, B2=39772318, polynomial x^1, x0=163585882
P = 17592186053971, l = 8589936608, s_1 = 3200626068, k = s_2 = 0, m_1 = 3
Step 1 took 3404ms
Computing F from factored S_1 took 424ms
Computing h_x and h_y took 184ms
Computing DCT-I of h_x took 64ms
Computing DCT-I of h_y took 64ms
Multi-point evaluation 1 of 2:
Computing g_x and g_y took 676ms
Computing forward NTT of g_x took 76ms
Computing forward NTT of g_y took 76ms
Adding and computing inverse NTT of sum took 84ms
Computing gcd of coefficients and N took 80ms
Multi-point evaluation 2 of 2:
Computing g_x and g_y took 668ms
Computing forward NTT of g_x took 72ms
Computing forward NTT of g_y took 72ms
Adding and computing inverse NTT of sum took 92ms
Computing gcd of coefficients and N took 76ms
Step 2 took 2736ms
Peak memory usage: 8MB
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Tuned for arm/params.h
Running on bm-wb-03
Input number is 33852066257429811148979390609187539760850944806763555795340084882048986912482949506591909041130651770779842162499482875755533111808276172876211496409325473343590723224081353129229935527059488811457730702694849036693756201766866018562295004353153066430367 (254 digits)
Using MODMULN [mulredc:4, sqrredc:4]
Using B1=100000, B2=39772318, polynomial x^1, x0=2105302104
P = 17592186053971, l = 8589936608, s_1 = 3203079572, k = s_2 = 0, m_1 = 3
Step 1 took 3396ms
x=14171034084602327708563332710902841786124302715453358631369092937226900800552287382076652089741656465401599759800977926291140250045673570082752547925388486838386532502918649669252847988222815385407724592112156758871470754631051256278530567588046643550377
Computing F from factored S_1 took 420ms
Computing h_x and h_y took 180ms
Computing DCT-I of h_x took 64ms
Computing DCT-I of h_y took 60ms
Multi-point evaluation 1 of 2:
Computing g_x and g_y took 680ms
Computing forward NTT of g_x took 72ms
Computing forward NTT of g_y took 76ms
Adding and computing inverse NTT of sum took 84ms
Computing gcd of coefficients and N took 76ms
Product of R[i] = 20221734377822223590783932719716007629063422041792727337308939578193941732386456849527150923640623085667228923808773164005086867192062486596837539792426394503905281164477725567155629713010308497609876550390996640418032380301204203705340620370429694895293
Multi-point evaluation 2 of 2:
Computing g_x and g_y took 668ms
Computing forward NTT of g_x took 84ms
Computing forward NTT of g_y took 76ms
Adding and computing inverse NTT of sum took 84ms
Computing gcd of coefficients and N took 76ms
Product of R[i] = 31493516850975347135512760534197504099719207678910360520250419172044694025228872815296792292970522431963806705974321827242908652115603637230507824367586075121166354278680697233311741552711933572982645030144033296358080235124538759929966286536231207705044
Step 2 took 2748ms
Peak memory usage: 8MB
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Tuned for arm/params.h
Running on bm-wb-03
Input number is 33852066257429811148979390609187539760850944806763555795340084882048986912482949506591909041130651770779842162499482875755533111808276172876211496409325473343590723224081353129229935527059488811457730702694849036693756201766866018562295004353153066430367 (254 digits)
Using MODMULN [mulredc:4, sqrredc:4]
NTT can handle lmax <= 1048576
Using B1=100000, B2=39772318, polynomial x^1, x0=1385011985
P = 17592186053971, l = 8589936608, s_1 = 3198950788, k = s_2 = 0, m_1 = 3
Step 1 took 3404ms
x=33213076843291969502408800915926909993790881164492931237055042158253057943078305088105764606975494946543195737104951518887919675002089762588555649597297270739867517595695477528241726644236220226422780824498524524545892058091655943100672700442041373331332
S_1 = {-1911, 1911} + {-3822, 3822} + {-390, 390} + {-735, 735} + {-1470, 1470} + {-195, 0, 195} + {-5880, 0, 5880} + {-4095, -2730, -1365, 0, 1365, 2730, 4095}
S_2 = {-3185, 3185}
mpzspm_init: finding 58 primes took 24ms
mpzspm_init took 28ms
CRT modulus for evaluation = 2147389441 * 2147377153 * 2147352577 * 2147295233 * 2147217409 * 2147205121 * 2147196929 * 2147082241 * 2147074049 * 2146988033 * 2146963457 * 2146959361 * 2146938881 * 2146885633 * 2146775041 * 2146738177 * 2146713601 * 2146656257 * 2146643969 * 2146603009 * 2146508801 * 2146492417 * 2146459649 * 2146447361 * 2146430977 * 2146418689 * 2146406401 * 2146336769 * 2146312193 * 2146283521 * 2146127873 * 2146099201 * 2146091009 * 2146078721 * 2146041857 * 2145976321 * 2145964033 * 2145906689 * 2145841153 * 2145832961 * 2145816577 * 2145755137 * 2145742849 * 2145673217 * 2145595393 * 2145587201 * 2145525761 * 2145390593 * 2145361921 * 2145325057 * 2145312769 * 2145300481 * 2145218561 * 2145181697 * 2145079297 * 2145021953 * 2144960513 * 2144944129, has 58 primes, 1797.950841 bits
mpzspm_init: finding 58 primes took 8ms
mpzspm_init took 16ms
CRT modulus for building F = 2147389441 * 2147377153 * 2147361793 * 2147358721 * 2147355649 * 2147352577 * 2147346433 * 2147309569 * 2147297281 * 2147294209 * 2147281921 * 2147269633 * 2147235841 * 2147217409 * 2147214337 * 2147205121 * 2147202049 * 2147140609 * 2147100673 * 2147082241 * 2147079169 * 2147051521 * 2147039233 * 2146959361 * 2146937857 * 2146885633 * 2146864129 * 2146818049 * 2146814977 * 2146775041 * 2146756609 * 2146753537 * 2146744321 * 2146738177 * 2146722817 * 2146713601 * 2146698241 * 2146695169 * 2146679809 * 2146646017 * 2146603009 * 2146599937 * 2146593793 * 2146572289 * 2146547713 * 2146544641 * 2146513921 * 2146507777 * 2146492417 * 2146440193 * 2146437121 * 2146430977 * 2146418689 * 2146406401 * 2146378753 * 2146363393 * 2146283521 * 2146255873, has 58 primes, 1797.975881 bits
Computing F from factored S_1 (processing set of size 2 7 3 3 2 2 2 2) took 420ms
Computing h_x and h_y took 180ms
Computing DCT-I of h_x took 68ms
Computing DCT-I of h_y took 64ms
Multi-point evaluation 1 of 2:
Computing g_x and g_y took 680ms
Computing forward NTT of g_x took 76ms
Computing forward NTT of g_y took 76ms
Adding and computing inverse NTT of sum took 84ms
Computing gcd of coefficients and N took 76ms
Product of R[i] = 19634226078798781833290071498943104009595035190407256142934488566438381403502444806379591874354559495528696176278122054662043784182560954330711892604955622662157085654542792073175229925948935045917191049840459824372728874344580567210947261829253794470500
Multi-point evaluation 2 of 2:
Computing g_x and g_y took 676ms
Computing forward NTT of g_x took 76ms
Computing forward NTT of g_y took 72ms
Adding and computing inverse NTT of sum took 84ms
Computing gcd of coefficients and N took 76ms
Product of R[i] = 18306121080656461254108586259431320331387083344051032671950356742563105582276092243842156622671348280401989974173011328096131797274264790032698019246740039802303999570478927243495622029955700114831520866634688789200410733791981183940279564087047408235956
Step 2 took 2748ms
Peak memory usage: 8MB
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P+1]
Input number is 18446744073709551653 (20 digits)
Using B1=257687, B2=170973772, polynomial x^1, x0=237673911
Step 1 took 612ms
Step 2 took 396ms
********** Factor found in step 2: 18446744073709551653
Found input number N
All P+1 tests are ok.
echo ""
../test.pm1 ./ecm
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 441995541378330835457 (21 digits)
Using B1=157080, B2=6999969668-7245399652, polynomial x^1, x0=3
Step 1 took 128ms
Step 2 took 388ms
********** Factor found in step 2: 441995541378330835457
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 335203548019575991076297 (24 digits)
Using B1=23, B2=54, polynomial x^1, x0=2
Step 1 took 0ms
Step 2 took 0ms
********** Factor found in step 2: 335203548019575991076297
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 335203548019575991076297 (24 digits)
Using B1=31, B2=58766400424189339248-58766400424189339284, polynomial x^1, x0=3
Step 1 took 0ms
Step 2 took 0ms
********** Factor found in step 2: 335203548019575991076297
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 2050449353925555290706354283 (28 digits)
Using B1=20, B2=20-1115080, polynomial x^1, x0=2737887894
Step 1 took 0ms
Step 2 took 24ms
********** Factor found in step 2: 30210181
Found prime factor of 8 digits: 30210181
Prime cofactor 67872792749091946543 has 20 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 67872792749091946529 (20 digits)
Using B1=8467, B2=14388568, polynomial x^1, x0=3
Step 1 took 8ms
Step 2 took 40ms
********** Factor found in step 2: 67872792749091946529
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 5735039483399104015346944564789 (31 digits)
Using B1=1277209, B2=10943320, polynomial x^1, x0=4020313749
Step 1 took 1164ms
Step 2 took 88ms
********** Factor found in step 2: 5735039483399104015346944564789
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 620224739362954187513 (21 digits)
Using B1=668093, B2=65880936, polynomial x^1, x0=3
Step 1 took 464ms
Step 2 took 188ms
********** Factor found in step 2: 620224739362954187513
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 1405929742229533753 (19 digits)
Using B1=1123483, B2=80553058, polynomial x^1, x0=2743087162
Step 1 took 500ms
Step 2 took 184ms
********** Factor found in step 2: 1405929742229533753
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 16811052664235873 (17 digits)
Using B1=19110, B2=245439412, polynomial x^1, x0=3
Step 1 took 8ms
Step 2 took 256ms
********** Factor found in step 2: 16811052664235873
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 9110965748024759967611 (22 digits)
Using B1=1193119, B2=342819292, polynomial x^1, x0=3249791015
Step 1 took 780ms
Step 2 took 436ms
********** Factor found in step 2: 9110965748024759967611
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 563796628294674772855559264041716715663 (39 digits)
Using B1=4031563, B2=18828426, polynomial x^1, x0=4077747291
Step 1 took 4592ms
Step 2 took 72ms
********** Factor found in step 2: 563796628294674772855559264041716715663
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 563796628294674772855559264041716715663 (39 digits)
Using B1=67801, B2=14869926, polynomial x^1, x0=1306255041
Step 1 took 92ms
Step 2 took 72ms
********** Factor found in step 2: 563796628294674772855559264041716715663
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 563796628294674772855559264041716715663 (39 digits)
Using B1=1, B2=28310580, polynomial x^1, x0=3670440883
Step 1 took 0ms
Step 2 took 16200ms
********** Factor found in step 2: 563796628294674772855559264041716715663
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 188879386195169498836498369376071664143 (39 digits)
Using B1=3026227, B2=106793580, polynomial x^1, x0=3498605886
Step 1 took 2720ms
Step 2 took 132ms
********** Factor found in step 2: 188879386195169498836498369376071664143
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 474476178924594486566271953891 (30 digits)
Using B1=9594209, B2=667827522, polynomial x^1, x0=399393194
Step 1 took 8236ms
Step 2 took 568ms
********** Factor found in step 2: 474476178924594486566271953891
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 2124306045220073929294177 (25 digits)
Using B1=290021, B2=1317259032, polynomial x^1, x0=4136807388
Step 1 took 228ms
Step 2 took 956ms
********** Factor found in step 2: 2124306045220073929294177
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 25591172394760497166702530699464321 (35 digits)
Using B1=100000, B2=39772318, polynomial x^1, x0=3132041115
Step 1 took 96ms
Step 2 took 204ms
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Resuming P-1 residue saved by buildd@bm-wb-03 with GMP-ECM 7.0.1 on Tue Jun 21 05:21:20 2016
Input number is 25591172394760497166702530699464321 (35 digits)
Using B1=100000-120557, B2=2468470, polynomial x^1
Step 1 took 24ms
Step 2 took 44ms
********** Factor found in step 2: 25591172394760497166702530699464321
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 25591172394760497166702530699464321 (35 digits)
Using B1=100000, B2=39772318, polynomial x^1, x0=2785241504
Step 1 took 96ms
Step 2 took 208ms
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Resuming P-1 residue
Input number is 25591172394760497166702530699464321 (35 digits)
Using B1=100000-120557, B2=2468470, polynomial x^1
Step 1 took 24ms
Step 2 took 44ms
********** Factor found in step 2: 25591172394760497166702530699464321
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 25591172394760497166702530699464321 (35 digits)
Using B1=100000, B2=39772318, polynomial x^1, x0=376914585
Step 1 took 100ms
Step 2 took 204ms
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Resuming P-1 residue saved by buildd@bm-wb-03 with GMP-ECM 7.0.1 on Tue Jun 21 05:21:21 2016
Input number is 25591172394760497166702530699464321 (35 digits)
Using B1=100000-120557, B2=2468470, polynomial x^1
Step 1 took 20ms
Step 2 took 44ms
********** Factor found in step 2: 25591172394760497166702530699464321
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 504403158265489337 (18 digits)
Using B1=8, B2=9007199254740678-9007199254740906, polynomial x^1, x0=2285302408
Step 1 took 0ms
Step 2 took 0ms
********** Factor found in step 2: 504403158265489337
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 6857 (4 digits)
Using B1=840, B2=876, polynomial x^1, x0=2120996838
Step 1 took 0ms
Step 2 took 0ms
********** Factor found in step 2: 6857
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 10090030271*10^400+696212088699 (411 digits)
Using B1=2000, B2=2352760, polynomial x^1, x0=2282226630
Step 1 took 72ms
Step 2 took 780ms
********** Factor found in step 2: 10090030271
Found prime factor of 11 digits: 10090030271
P = 2, Q = 3 (0.23%)
P = 2, Q = 5 (0.45%)
P = 2, Q = 7 (0.68%)
P = 2, Q = 11 (0.90%)
P = 2, Q = 13 (1.13%)
P = 2, Q = 31 (1.35%)
P = 2, Q = 61 (1.58%)
P = 2, Q = 17 (1.80%)
P = 2, Q = 19 (2.03%)
P = 2, Q = 29 (2.25%)
P = 2, Q = 37 (2.48%)
P = 2, Q = 41 (2.70%)
P = 2, Q = 43 (2.93%)
P = 2, Q = 71 (3.15%)
P = 2, Q = 73 (3.38%)
P = 2, Q = 113 (3.60%)
P = 2, Q = 127 (3.83%)
P = 2, Q = 181 (4.05%)
P = 2, Q = 211 (4.28%)
P = 2, Q = 241 (4.50%)
P = 2, Q = 281 (4.73%)
P = 2, Q = 337 (4.95%)
P = 2, Q = 421 (5.18%)
P = 2, Q = 631 (5.41%)
P = 2, Q = 1009 (5.63%)
P = 2, Q = 2521 (5.86%)
P = 2, Q = 23 (6.08%)
P = 2, Q = 67 (6.31%)
P = 2, Q = 89 (6.53%)
P = 2, Q = 199 (6.76%)
P = 2, Q = 331 (6.98%)
P = 2, Q = 397 (7.21%)
P = 2, Q = 463 (7.43%)
P = 2, Q = 617 (7.66%)
P = 2, Q = 661 (7.88%)
P = 2, Q = 881 (8.11%)
P = 2, Q = 991 (8.33%)
P = 2, Q = 1321 (8.56%)
P = 2, Q = 2311 (8.78%)
P = 2, Q = 3697 (9.01%)
P = 2, Q = 4621 (9.23%)
P = 2, Q = 9241 (9.46%)
P = 2, Q = 18481 (9.68%)
P = 2, Q = 55441 (9.91%)
P = 2, Q = 53 (10.14%)
P = 2, Q = 79 (10.36%)
P = 2, Q = 131 (10.59%)
P = 2, Q = 157 (10.81%)
P = 2, Q = 313 (11.04%)
P = 2, Q = 521 (11.26%)
P = 2, Q = 547 (11.49%)
P = 2, Q = 859 (11.71%)
P = 2, Q = 911 (11.94%)
P = 2, Q = 937 (12.16%)
P = 2, Q = 1093 (12.39%)
P = 2, Q = 1171 (12.61%)
P = 2, Q = 1873 (12.84%)
P = 2, Q = 2003 (13.06%)
P = 2, Q = 2341 (13.29%)
P = 2, Q = 2731 (13.51%)
P = 2, Q = 2861 (13.74%)
P = 2, Q = 3121 (13.96%)
P = 2, Q = 3433 (14.19%)
P = 2, Q = 6007 (14.41%)
P = 2, Q = 6553 (14.64%)
P = 2, Q = 8009 (14.86%)
P = 2, Q = 8191 (15.09%)
P = 2, Q = 8581 (15.32%)
P = 2, Q = 16381 (15.54%)
P = 2, Q = 20021 (15.77%)
P = 2, Q = 20593 (15.99%)
P = 2, Q = 21841 (16.22%)
P = 2, Q = 25741 (16.44%)
P = 3, Q = 7 (17.34%)
P = 3, Q = 13 (17.79%)
P = 3, Q = 31 (18.02%)
P = 3, Q = 61 (18.24%)
P = 3, Q = 19 (18.69%)
P = 3, Q = 37 (19.14%)
P = 3, Q = 43 (19.59%)
P = 3, Q = 73 (20.05%)
P = 3, Q = 127 (20.50%)
P = 3, Q = 181 (20.72%)
P = 3, Q = 211 (20.95%)
P = 3, Q = 241 (21.17%)
P = 3, Q = 337 (21.62%)
P = 3, Q = 421 (21.85%)
P = 3, Q = 631 (22.07%)
P = 3, Q = 1009 (22.30%)
P = 3, Q = 2521 (22.52%)
P = 3, Q = 67 (22.97%)
P = 3, Q = 199 (23.42%)
P = 3, Q = 331 (23.65%)
P = 3, Q = 397 (23.87%)
P = 3, Q = 463 (24.10%)
P = 3, Q = 661 (24.55%)
P = 3, Q = 991 (25.00%)
P = 3, Q = 1321 (25.23%)
P = 3, Q = 2311 (25.45%)
P = 3, Q = 3697 (25.68%)
P = 3, Q = 4621 (25.90%)
P = 3, Q = 9241 (26.13%)
P = 3, Q = 18481 (26.35%)
P = 3, Q = 55441 (26.58%)
P = 3, Q = 79 (27.03%)
P = 3, Q = 157 (27.48%)
P = 3, Q = 313 (27.70%)
P = 3, Q = 547 (28.15%)
P = 3, Q = 859 (28.38%)
P = 3, Q = 937 (28.83%)
P = 3, Q = 1093 (29.05%)
P = 3, Q = 1171 (29.28%)
P = 3, Q = 1873 (29.50%)
P = 3, Q = 2341 (29.95%)
P = 3, Q = 2731 (30.18%)
P = 3, Q = 3121 (30.63%)
P = 3, Q = 3433 (30.86%)
P = 3, Q = 6007 (31.08%)
P = 3, Q = 6553 (31.31%)
P = 3, Q = 8191 (31.76%)
P = 3, Q = 8581 (31.98%)
P = 3, Q = 16381 (32.21%)
P = 3, Q = 20593 (32.66%)
P = 3, Q = 21841 (32.88%)
P = 3, Q = 25741 (33.11%)
P = 5, Q = 11 (34.23%)
P = 5, Q = 31 (34.68%)
P = 5, Q = 61 (34.91%)
P = 5, Q = 41 (36.04%)
P = 5, Q = 71 (36.49%)
P = 5, Q = 181 (37.39%)
P = 5, Q = 211 (37.61%)
P = 5, Q = 241 (37.84%)
P = 5, Q = 281 (38.06%)
P = 5, Q = 421 (38.51%)
P = 5, Q = 631 (38.74%)
P = 5, Q = 2521 (39.19%)
P = 5, Q = 331 (40.32%)
P = 5, Q = 661 (41.22%)
P = 5, Q = 881 (41.44%)
P = 5, Q = 991 (41.67%)
P = 5, Q = 1321 (41.89%)
P = 5, Q = 2311 (42.12%)
P = 5, Q = 4621 (42.57%)
P = 5, Q = 9241 (42.79%)
P = 5, Q = 18481 (43.02%)
P = 5, Q = 55441 (43.24%)
P = 5, Q = 131 (43.92%)
P = 5, Q = 521 (44.59%)
P = 5, Q = 911 (45.27%)
P = 5, Q = 1171 (45.95%)
P = 5, Q = 2341 (46.62%)
P = 5, Q = 2731 (46.85%)
P = 5, Q = 2861 (47.07%)
P = 5, Q = 3121 (47.30%)
P = 5, Q = 8191 (48.42%)
P = 5, Q = 8581 (48.65%)
P = 5, Q = 16381 (48.87%)
P = 5, Q = 20021 (49.10%)
P = 5, Q = 21841 (49.55%)
P = 5, Q = 25741 (49.77%)
P = 7, Q = 29 (52.25%)
P = 7, Q = 43 (52.93%)
P = 7, Q = 71 (53.15%)
P = 7, Q = 113 (53.60%)
P = 7, Q = 127 (53.83%)
P = 7, Q = 211 (54.28%)
P = 7, Q = 281 (54.73%)
P = 7, Q = 337 (54.95%)
P = 7, Q = 421 (55.18%)
P = 7, Q = 631 (55.41%)
P = 7, Q = 1009 (55.63%)
P = 7, Q = 2521 (55.86%)
P = 7, Q = 463 (57.43%)
P = 7, Q = 617 (57.66%)
P = 7, Q = 2311 (58.78%)
P = 7, Q = 3697 (59.01%)
P = 7, Q = 4621 (59.23%)
P = 7, Q = 9241 (59.46%)
P = 7, Q = 18481 (59.68%)
P = 7, Q = 55441 (59.91%)
P = 7, Q = 547 (61.49%)
P = 7, Q = 911 (61.94%)
P = 7, Q = 1093 (62.39%)
P = 7, Q = 2003 (63.06%)
P = 7, Q = 2731 (63.51%)
P = 7, Q = 6007 (64.41%)
P = 7, Q = 6553 (64.64%)
P = 7, Q = 8009 (64.86%)
P = 7, Q = 8191 (65.09%)
P = 7, Q = 16381 (65.54%)
P = 7, Q = 20021 (65.77%)
P = 7, Q = 21841 (66.22%)
P = 11, Q = 23 (72.75%)
P = 11, Q = 67 (72.97%)
P = 11, Q = 89 (73.20%)
P = 11, Q = 199 (73.42%)
P = 11, Q = 331 (73.65%)
P = 11, Q = 397 (73.87%)
P = 11, Q = 463 (74.10%)
P = 11, Q = 617 (74.32%)
P = 11, Q = 661 (74.55%)
P = 11, Q = 881 (74.77%)
P = 11, Q = 991 (75.00%)
P = 11, Q = 1321 (75.23%)
P = 11, Q = 2311 (75.45%)
P = 11, Q = 3697 (75.68%)
P = 11, Q = 4621 (75.90%)
P = 11, Q = 9241 (76.13%)
P = 11, Q = 18481 (76.35%)
P = 11, Q = 55441 (76.58%)
P = 11, Q = 859 (78.38%)
P = 11, Q = 2003 (79.73%)
P = 11, Q = 2861 (80.41%)
P = 11, Q = 3433 (80.86%)
P = 11, Q = 6007 (81.08%)
P = 11, Q = 8009 (81.53%)
P = 11, Q = 8581 (81.98%)
P = 11, Q = 20021 (82.43%)
P = 11, Q = 20593 (82.66%)
P = 11, Q = 25741 (83.11%)
P = 13, Q = 53 (93.47%)
P = 13, Q = 79 (93.69%)
P = 13, Q = 131 (93.92%)
P = 13, Q = 157 (94.14%)
P = 13, Q = 313 (94.37%)
P = 13, Q = 521 (94.59%)
P = 13, Q = 547 (94.82%)
P = 13, Q = 859 (95.05%)
P = 13, Q = 911 (95.27%)
P = 13, Q = 937 (95.50%)
P = 13, Q = 1093 (95.72%)
P = 13, Q = 1171 (95.95%)
P = 13, Q = 1873 (96.17%)
P = 13, Q = 2003 (96.40%)
P = 13, Q = 2341 (96.62%)
P = 13, Q = 2731 (96.85%)
P = 13, Q = 2861 (97.07%)
P = 13, Q = 3121 (97.30%)
P = 13, Q = 3433 (97.52%)
P = 13, Q = 6007 (97.75%)
P = 13, Q = 6553 (97.97%)
P = 13, Q = 8009 (98.20%)
P = 13, Q = 8191 (98.42%)
P = 13, Q = 8581 (98.65%)
P = 13, Q = 16381 (98.87%)
P = 13, Q = 20021 (99.10%)
P = 13, Q = 20593 (99.32%)
P = 13, Q = 21841 (99.55%)
P = 13, Q = 25741 (99.77%)
Prime cofactor (10090030271*10^400+696212088699)/10090030271 has 401 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 2^(64*2)-1 (39 digits)
Using B1=2, B2=0, polynomial x^1, x0=340282366920938463463374607431768211454
Step 1 took 0ms
********** Factor found in step 1: 340282366920938463463374607431768211455
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 234^997+997^234 (2363 digits)
Using B1=100, B2=492, polynomial x^1, x0=945347100
Step 1 took 72ms
Step 2 took 5708ms
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 2^(2^12)+1 (1234 digits)
Using B1=1000000, B2=1748900148, polynomial x^1, x0=937660995
Step 1 took 80560ms
********** Factor found in step 1: 36204694129087842739610650509313
Found composite factor of 32 digits: 36204694129087842739610650509313
Composite cofactor (2^(2^12)+1)/36204694129087842739610650509313 has 1202 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 12345678 (8 digits)
********** Factor found in step 1: 2
Found prime factor of 1 digits: 2
Composite cofactor 6172839 has 7 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 95209938255048826235189575712705128366296557149606415206280987204268594538412191641776798249266895999715600261737863698825644292938050707507901970225804581 (155 digits)
Error: cannot choose suitable P value for your stage 2 parameters.
Try a shorter B2min,B2 interval.
Please report internal errors at <ecm-discuss@lists.gforge.inria.fr>.
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Tuned for arm/params.h
Running on bm-wb-03
Input number is 95209938255048826235189575712705128366296557149606415206280987204268594538412191641776798249266895999715600261737863698825644292938050707507901970225804581 (155 digits)
Using mpz_mod
NTT can handle lmax <= 4096
Parameters for NTT: P=1155, l=1024
non-NTT can handle lmax <= 690
pm1fs2_memory_use: Estimated memory use with lmax = 1024 NTT is 227476 bytes
Using lmax = 1024 with NTT which takes about 0MB of memory
Using B1=5000, B2=9972-1260528, polynomial x^1, x0=308203548
P = 4398046512259, l = 480, s_1 = 3197365604, k = s_2 = 0, m_1 = 3
Can't compute success probabilities for B1 <> B2min
Exponent has 7211 bits
Using mpres_ui_pow, base 308203548
Step 1 took 32ms
x=63200212786495947333286998733231090365445777866141999986421799286062341405005597462371357639034068105597959085601034804001871254266938233914368563958649969
mpzspm_init: finding 36 primes took 8ms
mpzspm_init took 8ms
CRT modulus for evaluation = 2147473409 * 2147415041 * 2147396609 * 2147389441 * 2147387393 * 2147377153 * 2147365889 * 2147361793 * 2147358721 * 2147355649 * 2147352577 * 2147346433 * 2147338241 * 2147309569 * 2147297281 * 2147295233 * 2147294209 * 2147281921 * 2147269633 * 2147239937 * 2147235841 * 2147218433 * 2147217409 * 2147214337 * 2147212289 * 2147205121 * 2147202049 * 2147200001 * 2147196929 * 2147178497 * 2147169281 * 2147140609 * 2147100673 * 2147082241 * 2147079169 * 2147074049, has 36 primes, 1115.994774 bits
S_1 = {-385, 385} + {-231, 231} + {-462, 462} + {-330, 330} + {-315, 315} + {-165, 0, 165} + {-210, -105, 0, 105, 210}
S_2 = {0}
mpzspm_init: finding 36 primes took 0ms
mpzspm_init took 4ms
CRT modulus for building F = 2147483137 * 2147473921 * 2147470081 * 2147467009 * 2147465473 * 2147455489 * 2147450113 * 2147448577 * 2147442433 * 2147431681 * 2147421697 * 2147415553 * 2147411713 * 2147409409 * 2147405569 * 2147396353 * 2147390977 * 2147390209 * 2147389441 * 2147385601 * 2147377153 * 2147373313 * 2147362561 * 2147361793 * 2147358721 * 2147355649 * 2147354113 * 2147352577 * 2147346433 * 2147344897 * 2147339521 * 2147332609 * 2147331841 * 2147329537 * 2147316481 * 2147309569, has 36 primes, 1115.997810 bits
Computing F from factored S_1 (processing set of size 2 5 3 2 2 2 2) took 56ms
Computing h took 8ms
Computing DCT-I of h took 8ms
Multi-point evaluation 1 of 1:
Computing g_i
pm1_sequence_g: P = 1155, M_param = 783, l_param = 1024, m_1 = 3, k_2 = 0
took 32ms
Computing g*h took 20ms
Computing gcd of coefficients and N took 8ms
Product of R[i] = 35107548738411655624834033164423736153638158341534118041964186688934691257811116565499389998247042939583568338617585480954388557687403003250618586629632302
Step 2 took 144ms
Peak memory usage: 4MB
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Tuned for arm/params.h
Running on bm-wb-03
Input number is 95209938255048826235189575712705128366296557149606415206280987204268594538412191641776798249266895999715600261737863698825644292938050707507901970225804581 (155 digits)
Using mpz_mod
non-NTT can handle lmax <= 690
Parameters for non-NTT: P=1365, l=690
pm1fs2_memory_use: Estimated memory use with lmax = 690 is 1047300 bytes
Using lmax = 690 without NTT which takes about 0MB of memory
Using B1=5000, B2=7394-1095526, polynomial x^1, x0=796447288
P = 2963527435605, l = 288, s_1 = 3197144420, k = s_2 = 0, m_1 = 1
Can't compute success probabilities for B1 <> B2min
Exponent has 7211 bits
Using mpres_ui_pow, base 796447288
Step 1 took 32ms
x=50506629588954898686323730420706437671896013690418517097821233825042098461721036505484559610154147656149250116982979677640243650534455036524811962015491616
S_1 = {-273, 273} + {-546, 546} + {-390, 390} + {-105, 105} + {-210, 210} + {-195, 0, 195} + {-840, 0, 840}
S_2 = {-455, 455}
tmplen = 2760
Computing F from factored S_1 (processing set of size 2 3 3 2 2 2 2) took 36ms
Computing h took 0ms
Multi-point evaluation 1 of 2:
Computing g_i
pm1_sequence_g: P = 1365, M_param = 545, l_param = 690, m_1 = 1, k_2 = 4294966841
took 12ms
TMulGen of g and h took 48ms
Computing product of F(g_i) took 0ms
Product of R[i] = 27230929894940067912870253618389808675750472286120866775178003422879578861927829496987541643349266178626587572928012318714210739367052447888956211564376453
Multi-point evaluation 2 of 2:
Computing g_i
pm1_sequence_g: P = 1365, M_param = 545, l_param = 690, m_1 = 1, k_2 = 455
took 12ms
TMulGen of g and h took 44ms
Computing product of F(g_i) took 0ms
Product of R[i] = 86137030071164629707709989995621428809252844264803913187692364214445791561469530014622701493909033102082432669189370327654716482069948072283262356867908323
Step 2 took 156ms
Peak memory usage: 3MB
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Tuned for arm/params.h
Running on bm-wb-03
Input number is 95209938255048826235189575712705128366296557149606415206280987204268594538412191641776798249266895999715600261737863698825644292938050707507901970225804581 (155 digits)
Using mpz_mod
Using lmax = 4096 with NTT which takes about 0MB of memory
Using B1=100000, B2=39772318, polynomial x^1, x0=17534424
P = 17592186053971, l = 2016, s_1 = 3204173188, k = s_2 = 0, m_1 = 3
Probability of finding a factor of n digits:
20 25 30 35 40 45 50 55 60 65
0.14 0.02 0.0019 0.00013 6.9e-06 3e-07 1.1e-08 3.3e-10 7.9e-12 0
Step 1 took 664ms
Computing F from factored S_1 took 224ms
Computing h took 36ms
Computing DCT-I of h took 40ms
Multi-point evaluation 1 of 2:
Computing g_i took 120ms
Computing g*h took 92ms
Computing gcd of coefficients and N took 40ms
Multi-point evaluation 2 of 2:
Computing g_i took 124ms
Computing g*h took 92ms
Computing gcd of coefficients and N took 40ms
Step 2 took 832ms
Peak memory usage: 5MB
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Tuned for arm/params.h
Running on bm-wb-03
Input number is 33852066257429811148979390609187539760850944806763555795340084882048986912482949506591909041130651770779842162499482875755533111808276172876211496409325473343590723224081353129229935527059488811457730702694849036693756201766866018562295004353153066430367 (254 digits)
Using mpz_mod
Using lmax = 1024 with NTT which takes about 0MB of memory
Using B1=19999, B2=2368720, polynomial x^1, x0=329750201
P = 4398046513099, l = 432, s_1 = 3196820884, k = s_2 = 0, m_1 = 3
Probability of finding a factor of n digits:
20 25 30 35 40 45 50 55 60 65
0.014 0.0008 3.2e-05 9.2e-07 2e-08 3.6e-10 2.9e-12 0 0 0
Step 1 took 304ms
Computing F from factored S_1 took 96ms
Computing h took 20ms
Computing DCT-I of h took 12ms
Multi-point evaluation 1 of 2:
Computing g_i took 68ms
Computing g*h took 32ms
Computing gcd of coefficients and N took 20ms
Multi-point evaluation 2 of 2:
Computing g_i took 72ms
Computing g*h took 32ms
Computing gcd of coefficients and N took 20ms
Step 2 took 388ms
Peak memory usage: 4MB
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Tuned for arm/params.h
Running on bm-wb-03
Input number is 33852066257429811148979390609187539760850944806763555795340084882048986912482949506591909041130651770779842162499482875755533111808276172876211496409325473343590723224081353129229935527059488811457730702694849036693756201766866018562295004353153066430367 (254 digits)
Using mpz_mod
Using lmax = 4096 with NTT which takes about 1MB of memory
Using B1=100000, B2=39772318, polynomial x^1, x0=3990254546
P = 17592186053971, l = 2016, s_1 = 3196579220, k = s_2 = 0, m_1 = 3
Probability of finding a factor of n digits:
20 25 30 35 40 45 50 55 60 65
0.055 0.0063 0.00051 3.1e-05 1.5e-06 5.9e-08 1.9e-09 5.7e-11 0 0
Step 1 took 1488ms
Computing F from factored S_1 took 412ms
Computing h took 80ms
Computing DCT-I of h took 64ms
Multi-point evaluation 1 of 2:
Computing g_i took 268ms
Computing g*h took 152ms
Computing gcd of coefficients and N took 76ms
Multi-point evaluation 2 of 2:
Computing g_i took 264ms
Computing g*h took 152ms
Computing gcd of coefficients and N took 76ms
Step 2 took 1580ms
Peak memory usage: 6MB
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Tuned for arm/params.h
Running on bm-wb-03
Input number is 33852066257429811148979390609187539760850944806763555795340084882048986912482949506591909041130651770779842162499482875755533111808276172876211496409325473343590723224081353129229935527059488811457730702694849036693756201766866018562295004353153066430367 (254 digits)
Using mpz_mod
Using lmax = 4096 with NTT which takes about 1MB of memory
Using B1=100000, B2=39772318, polynomial x^1, x0=134250855
P = 17592186053971, l = 2016, s_1 = 3198385556, k = s_2 = 0, m_1 = 3
Probability of finding a factor of n digits:
20 25 30 35 40 45 50 55 60 65
0.055 0.0063 0.00051 3.1e-05 1.5e-06 5.9e-08 1.9e-09 5.7e-11 0 0
Step 1 took 1532ms
x=19089289339567639996921607374488590588025651193289628418412692293921249412982174657102365796585080492885132730235225049841071715170180770443028507968814799562498817110997787133889780080355629197293683549576471829575832474541657063573177739759262673618205
Computing F from factored S_1 took 416ms
Computing h took 84ms
Computing DCT-I of h took 64ms
Multi-point evaluation 1 of 2:
Computing g_i took 268ms
Computing g*h took 148ms
Computing gcd of coefficients and N took 76ms
Product of R[i] = 17882657419649334448780874314741697710935869080879317968519069699993172036719700935239080105779039391010660813122368139417216971547349829373993735577390061772147858203143795269567031913154053759986176188677867908651657484577116983874245162288496710977216
Multi-point evaluation 2 of 2:
Computing g_i took 268ms
Computing g*h took 152ms
Computing gcd of coefficients and N took 76ms
Product of R[i] = 27816543851119584236767691261828196705432271396168927666318020674914584119152849976783912940935543355442704875944927755733605188689407181907057747320599395885555690258135933771706242316824764755458518619695259006935717597515553047059363434326191207802155
Step 2 took 1580ms
Peak memory usage: 6MB
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Tuned for arm/params.h
Running on bm-wb-03
Input number is 33852066257429811148979390609187539760850944806763555795340084882048986912482949506591909041130651770779842162499482875755533111808276172876211496409325473343590723224081353129229935527059488811457730702694849036693756201766866018562295004353153066430367 (254 digits)
Using mpz_mod
NTT can handle lmax <= 1048576
Parameters for NTT: P=9555, l=4096
Parameters for non-NTT: P=12705, l=2561
pm1fs2_memory_use: Estimated memory use with lmax = 4096 NTT is 1425640 bytes
Using lmax = 4096 with NTT which takes about 1MB of memory
Using B1=100000, B2=39772318, polynomial x^1, x0=2242033207
P = 17592186053971, l = 2016, s_1 = 3200744836, k = s_2 = 0, m_1 = 3
Probability of finding a factor of n digits:
20 25 30 35 40 45 50 55 60 65
0.055 0.0063 0.00051 3.1e-05 1.5e-06 5.9e-08 1.9e-09 5.7e-11 0 0
Exponent has 144344 bits
Using mpres_ui_pow, base 2242033207
Step 1 took 1528ms
x=17497870069801179130060459426789027617654177713655007695098368357683651361255594745176991621335537033137028912099214709195698922517790275339340908798318684520841865424706882681678258620988697770074785896762758799467825058461712385265670455232606116389337
mpzspm_init: finding 58 primes took 12ms
mpzspm_init took 20ms
CRT modulus for evaluation = 2147389441 * 2147377153 * 2147352577 * 2147295233 * 2147217409 * 2147205121 * 2147196929 * 2147082241 * 2147074049 * 2146988033 * 2146963457 * 2146959361 * 2146938881 * 2146885633 * 2146775041 * 2146738177 * 2146713601 * 2146656257 * 2146643969 * 2146603009 * 2146508801 * 2146492417 * 2146459649 * 2146447361 * 2146430977 * 2146418689 * 2146406401 * 2146336769 * 2146312193 * 2146283521 * 2146127873 * 2146099201 * 2146091009 * 2146078721 * 2146041857 * 2145976321 * 2145964033 * 2145906689 * 2145841153 * 2145832961 * 2145816577 * 2145755137 * 2145742849 * 2145673217 * 2145595393 * 2145587201 * 2145525761 * 2145390593 * 2145361921 * 2145325057 * 2145312769 * 2145300481 * 2145218561 * 2145181697 * 2145079297 * 2145021953 * 2144960513 * 2144944129, has 58 primes, 1797.950841 bits
S_1 = {-1911, 1911} + {-3822, 3822} + {-390, 390} + {-735, 735} + {-1470, 1470} + {-195, 0, 195} + {-5880, 0, 5880} + {-4095, -2730, -1365, 0, 1365, 2730, 4095}
S_2 = {-3185, 3185}
mpzspm_init: finding 58 primes took 8ms
mpzspm_init took 16ms
CRT modulus for building F = 2147389441 * 2147377153 * 2147361793 * 2147358721 * 2147355649 * 2147352577 * 2147346433 * 2147309569 * 2147297281 * 2147294209 * 2147281921 * 2147269633 * 2147235841 * 2147217409 * 2147214337 * 2147205121 * 2147202049 * 2147140609 * 2147100673 * 2147082241 * 2147079169 * 2147051521 * 2147039233 * 2146959361 * 2146937857 * 2146885633 * 2146864129 * 2146818049 * 2146814977 * 2146775041 * 2146756609 * 2146753537 * 2146744321 * 2146738177 * 2146722817 * 2146713601 * 2146698241 * 2146695169 * 2146679809 * 2146646017 * 2146603009 * 2146599937 * 2146593793 * 2146572289 * 2146547713 * 2146544641 * 2146513921 * 2146507777 * 2146492417 * 2146440193 * 2146437121 * 2146430977 * 2146418689 * 2146406401 * 2146378753 * 2146363393 * 2146283521 * 2146255873, has 58 primes, 1797.975881 bits
Computing F from factored S_1 (processing set of size 2 7 3 3 2 2 2 2) took 416ms
Computing h took 80ms
Computing DCT-I of h took 64ms
Multi-point evaluation 1 of 2:
Computing g_i
pm1_sequence_g: P = 9555, M_param = 3087, l_param = 4096, m_1 = 3, k_2 = 4294964111
took 268ms
Computing g*h took 152ms
Computing gcd of coefficients and N took 76ms
Product of R[i] = 8988225663691477171636498753273530445295020271950789509224382415786963893445909478557610896587718324600817554455593185686141309963055128870837651335227978789940943896876941667391004782947741489823088067292606141056954090365926494022501230491833752738911
Multi-point evaluation 2 of 2:
Computing g_i
pm1_sequence_g: P = 9555, M_param = 3087, l_param = 4096, m_1 = 3, k_2 = 3185
took 268ms
Computing g*h took 152ms
Computing gcd of coefficients and N took 76ms
Product of R[i] = 26392689032374984326912280772710263138182775898713114397581599501986797691309152639771321515251724434999779314379257396051941998419102021579302638043977591116540873730751042681026998986179914129610789167361392319586598361320556406639419785485527147796231
Step 2 took 1576ms
Peak memory usage: 6MB
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Tuned for arm/params.h
Running on bm-wb-03
Input number is 33852066257429811148979390609187539760850944806763555795340084882048986912482949506591909041130651770779842162499482875755533111808276172876211496409325473343590723224081353129229935527059488811457730702694849036693756201766866018562295004353153066430367 (254 digits)
Using mpz_mod
Parameters for non-NTT: P=12705, l=2561
pm1fs2_memory_use: Estimated memory use with lmax = 2561 is 5807880 bytes
Using lmax = 2561 without NTT which takes about 5MB of memory
Using B1=100000, B2=31550128, polynomial x^1, x0=2580590118
P = 10999411257761, l = 1320, s_1 = 3202805108, k = s_2 = 0, m_1 = 2
Probability of finding a factor of n digits:
20 25 30 35 40 45 50 55 60 65
0.053 0.006 0.00048 2.9e-05 1.4e-06 5.5e-08 1.8e-09 5.3e-11 0 0
Exponent has 144344 bits
Using mpres_ui_pow, base 2580590118
Step 1 took 1488ms
x=11355630329242050570131014769276497165422451340427500707033496034872976360589572159027940761022353245388507261541914218604078934787868420960806867137185996511688619209406305949319953837732400868271183008511689567378922166159777046579654220973303501144980
S_1 = {-5082, 5082} + {-3630, 3630} + {-315, 315} + {-1815, 0, 1815} + {-210, -105, 0, 105, 210} + {-5775, -4620, -3465, -2310, -1155, 0, 1155, 2310, 3465, 4620, 5775}
S_2 = {-6776, -1694, 1694, 6776}
tmplen = 10243
Computing F from factored S_1 (processing set of size 2 11 5 3 2 2) took 412ms
Computing h took 28ms
Multi-point evaluation 1 of 4:
Computing g_i
pm1_sequence_g: P = 12705, M_param = 1900, l_param = 2561, m_1 = 2, k_2 = 4294960520
took 76ms
TMulGen of g and h took 336ms
Computing product of F(g_i) took 16ms
Product of R[i] = 31891203527054441652509721390410333486579433240321347829883375630428041333237997166262415695220743484560459790276937165948444578404974827186652402209550231867847565958456476765000203476402915584804506336527516524675109578491769699679693894784428569293383
Multi-point evaluation 2 of 4:
Computing g_i
pm1_sequence_g: P = 12705, M_param = 1900, l_param = 2561, m_1 = 2, k_2 = 4294965602
took 72ms
TMulGen of g and h took 332ms
Computing product of F(g_i) took 20ms
Product of R[i] = 8886339241675762648693528016916519532419235451603167121186723706704014619316509008079608318068967882175946818186193447491284577676647930077004890605565198487217886757241783026733478484004100772686341035968150238057441724235472157354432263904665893437494
Multi-point evaluation 3 of 4:
Computing g_i
pm1_sequence_g: P = 12705, M_param = 1900, l_param = 2561, m_1 = 2, k_2 = 1694
took 72ms
TMulGen of g and h took 324ms
Computing product of F(g_i) took 16ms
Product of R[i] = 30417658114304282966516465606020401899130765473818795657120488257433255827012828598968972018512336064817196552733491046188851372814093015714189327468133081234434472873347245504831794406851206503203486082524289816223321634876019942412564775435624395190803
Multi-point evaluation 4 of 4:
Computing g_i
pm1_sequence_g: P = 12705, M_param = 1900, l_param = 2561, m_1 = 2, k_2 = 6776
took 76ms
TMulGen of g and h took 332ms
Computing product of F(g_i) took 16ms
Product of R[i] = 19348103775803973936446414183082473657289365545217222009132642181851980811057582987748302388394650760665812617550972595697390675563537411251734646879021182595867501395901367835945918498922226414408968068494359869471342125918991740055807417543177199929105
Step 2 took 2152ms
Peak memory usage: 9MB
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 2^1009-1 (304 digits)
Using B1=1000, B2=17248, polynomial x^1, x0=4106724076
Step 1 took 12ms
Step 2 took 60ms
********** Factor found in step 2: 3454817
Found prime factor of 7 digits: 3454817
Composite cofactor (2^1009-1)/3454817 has 298 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is (2^1009-1)/3454817 (298 digits)
Using B1=5000, B2=9972-1389888, polynomial x^1, x0=2757352773
Step 1 took 48ms
Step 2 took 380ms
********** Factor found in step 2: 198582684439
Found prime factor of 12 digits: 198582684439
Composite cofactor ((2^1009-1)/3454817)/198582684439 has 286 digits
All P-1 tests are ok.
echo ""
../test.ecm ./ecm
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2050449353925555290706354283 (28 digits)
Using B1=30, B2=30-1000000, polynomial x^1, sigma=0:7
Step 1 took 0ms
Step 2 took 124ms
********** Factor found in step 2: 30210181
Found prime factor of 8 digits: 30210181
Prime cofactor 67872792749091946543 has 20 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2050449353925555290706354283 (28 digits)
Using B1=3, B2=3-1000000, polynomial x^1, sigma=0:7
Step 1 took 0ms
Step 2 took 124ms
Run 2 out of 2:
Using B1=5, B2=4-1000000, polynomial x^1, sigma=0:7
Step 1 took 0ms
Step 2 took 120ms
********** Factor found in step 2: 30210181
Found prime factor of 8 digits: 30210181
Prime cofactor 67872792749091946543 has 20 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2050449353925555290706354283 (28 digits)
[Tue Jun 21 05:26:25 2016]
Using B1=30, B2=30-1000000, polynomial x^1, sigma=0:7
Step 1 took 0ms
Step 2 took 120ms
********** Factor found in step 2: 30210181
Found prime factor of 8 digits: 30210181
Prime cofactor 67872792749091946543 has 20 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2050449353925555290706354283 (28 digits)
Using B1=30, B2=30-1000000, polynomial x^1, sigma=0:7
Step 1 took 17000ms (0 in this run, 17000 from previous runs)
Step 2 took 120ms
********** Factor found in step 2: 30210181
Found prime factor of 8 digits: 30210181
Prime cofactor 67872792749091946543 has 20 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2050449353925555290706354283 (28 digits)
Using B1=30, B2=30-1000000, polynomial x^1, sigma=0:7
Step 1 took 4ms
Step 2 took 120ms
********** Factor found in step 2: 30210181
Found prime factor of 8 digits: 30210181
Prime cofactor 67872792749091946543 has 20 digits
30210181 67872792749091946543
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Tuned for arm/params.h
Running on bm-wb-03
Input number is 2050449353925555290706354283 (28 digits)
Using MODMULN [mulredc:0, sqrredc:0]
Using B1=30, B2=1000000, polynomial x^1, sigma=0:7
dF=512, k=1, d=4620, d2=13, i0=-12
Expected number of curves to find a factor of n digits:
35 40 45 50 55 60 65 70 75 80
Inf Inf Inf Inf Inf Inf Inf Inf Inf Inf
Step 1 took 12ms
Using 9 small primes for NTT
Estimated memory usage: 698KB
Initializing tables of differences for F took 0ms
Computing roots of F took 8ms
Building F from its roots took 12ms
Computing 1/F took 16ms
Initializing table of differences for G took 0ms
Computing roots of G took 8ms
Building G from its roots took 12ms
Computing polyeval(F,G) took 56ms
Computing product of all F(g_i) took 0ms
Step 2 took 120ms
********** Factor found in step 2: 30210181
Found prime factor of 8 digits: 30210181
Prime cofactor 67872792749091946543 has 20 digits
Peak memory usage: 4MB
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Tuned for arm/params.h
Running on bm-wb-03
Input number is 2050449353925555290706354283 (28 digits)
Using MODMULN [mulredc:0, sqrredc:0]
Using B1=30, B2=1000000, polynomial x^1, sigma=0:7
dF=512, k=1, d=4620, d2=13, i0=-12
A=899451165556911502964137591
starting point: x0=1620034329194826483327760968
Expected number of curves to find a factor of n digits:
35 40 45 50 55 60 65 70 75 80
Inf Inf Inf Inf Inf Inf Inf Inf Inf Inf
Step 1 took 12ms
x=1386891280146754778442422209
After switch to Weierstrass form, P=(1272222566515101294838362085, 2024879151393334144966574862)
on curve Y^2 = X^3 + 444367623325134800486418243 * X + b
Using 9 small primes for NTT
Estimated memory usage: 698KB
Initializing tables of differences for F took 0ms
Computing roots of F took 8ms
Building F from its roots took 16ms
Computing 1/F took 16ms
Initializing table of differences for G took 0ms
Computing roots of G took 8ms
Building G from its roots took 16ms
Computing polyeval(F,G) took 56ms
Computing product of all F(g_i) took 0ms
Step 2 took 124ms
********** Factor found in step 2: 30210181
Found prime factor of 8 digits: 30210181
Prime cofactor 67872792749091946543 has 20 digits
Peak memory usage: 4MB
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Tuned for arm/params.h
Running on bm-wb-03
Input number is 2050449353925555290706354283 (28 digits)
Using MODMULN [mulredc:0, sqrredc:0]
Using B1=30, B2=1000000, polynomial x^1, sigma=0:7
dF=512, k=1, d=4620, d2=13, i0=-12
A=899451165556911502964137591
starting point: x0=1620034329194826483327760968
Expected number of curves to find a factor of n digits:
35 40 45 50 55 60 65 70 75 80
Inf Inf Inf Inf Inf Inf Inf Inf Inf Inf
Step 1 took 16ms
x=1386891280146754778442422209
After switch to Weierstrass form, P=(1272222566515101294838362085, 2024879151393334144966574862)
on curve Y^2 = X^3 + 444367623325134800486418243 * X + b
mpzspm_init: finding 9 primes took 0ms
mpzspm_init took 4ms
Using 9 small primes for NTT
Estimated memory usage: 698KB
ecm_rootsF: state: nr = 24, dsieve = 210, size_fd = 48, S = 1, dickson_a = 0
Initializing tables of differences for F took 0ms, 791 muls and 12 extgcds
Computing roots of F took 12ms, 3243 muls and 23 extgcds
Building F from its roots took 12ms
Computing 1/F took 20ms
ecm_rootsG_init: i0=-12, d1=4620, d2=13, dF=512, blocks=1, S=1, T_inv = 6, nr=12
Initializing table of differences for G took 0ms, 465 muls and 16 extgcds
Computing roots of G took 8ms, 2898 muls and 42 extgcds
Building G from its roots took 12ms
Computing polyeval(F,G) took 56ms
Computing product of all F(g_i) took 0ms
Step 2 took 124ms
********** Factor found in step 2: 30210181
Found prime factor of 8 digits: 30210181
Prime cofactor 67872792749091946543 has 20 digits
Peak memory usage: 4MB
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Tuned for arm/params.h
Running on bm-wb-03
Input number is 2050449353925555290706354283 (28 digits)
Using MODMULN [mulredc:0, sqrredc:0]
Using B1=30, B2=1000000, polynomial x^1, sigma=0:7
dF=512, k=1, d=4620, d2=13, i0=-12
A=899451165556911502964137591
starting point: x0=1620034329194826483327760968
Expected number of curves to find a factor of n digits:
35 40 45 50 55 60 65 70 75 80
Inf Inf Inf Inf Inf Inf Inf Inf Inf Inf
Step 1 took 16ms
x=1386891280146754778442422209
After switch to Weierstrass form, P=(1272222566515101294838362085, 2024879151393334144966574862)
on curve Y^2 = X^3 + 444367623325134800486418243 * X + b
mpzspm_init: finding 9 primes took 0ms
mpzspm_init took 0ms
Using 9 small primes for NTT
Estimated memory usage: 698KB
ecm_rootsF: state: nr = 24, dsieve = 210, size_fd = 48, S = 1, dickson_a = 0
init_progression_coeffs: i0 = 0, d = 210, e = 13, k = 1, m = 6, E = 1, a = 0, size_fd = 48
init_progression_coeffs: initing a progression for Dickson_{1,0}(13 + n * 2730)
init_progression_coeffs: NOT initing a progression for Dickson_{1,0}(91 + n * 2730), gcd (91, 210) == 7)
init_progression_coeffs: initing a progression for Dickson_{1,0}(169 + n * 2730)
init_progression_coeffs: initing a progression for Dickson_{1,0}(247 + n * 2730)
init_progression_coeffs: NOT initing a progression for Dickson_{1,0}(325 + n * 2730), gcd (325, 210) == 5)
init_progression_coeffs: initing a progression for Dickson_{1,0}(403 + n * 2730)
init_progression_coeffs: initing a progression for Dickson_{1,0}(481 + n * 2730)
init_progression_coeffs: initing a progression for Dickson_{1,0}(559 + n * 2730)
init_progression_coeffs: NOT initing a progression for Dickson_{1,0}(637 + n * 2730), gcd (637, 210) == 7)
init_progression_coeffs: NOT initing a progression for Dickson_{1,0}(715 + n * 2730), gcd (715, 210) == 5)
init_progression_coeffs: initing a progression for Dickson_{1,0}(793 + n * 2730)
init_progression_coeffs: initing a progression for Dickson_{1,0}(871 + n * 2730)
init_progression_coeffs: initing a progression for Dickson_{1,0}(949 + n * 2730)
init_progression_coeffs: initing a progression for Dickson_{1,0}(1027 + n * 2730)
init_progression_coeffs: NOT initing a progression for Dickson_{1,0}(1105 + n * 2730), gcd (1105, 210) == 5)
init_progression_coeffs: NOT initing a progression for Dickson_{1,0}(1183 + n * 2730), gcd (1183, 210) == 7)
init_progression_coeffs: initing a progression for Dickson_{1,0}(1261 + n * 2730)
init_progression_coeffs: initing a progression for Dickson_{1,0}(1339 + n * 2730)
init_progression_coeffs: initing a progression for Dickson_{1,0}(1417 + n * 2730)
init_progression_coeffs: NOT initing a progression for Dickson_{1,0}(1495 + n * 2730), gcd (1495, 210) == 5)
init_progression_coeffs: initing a progression for Dickson_{1,0}(1573 + n * 2730)
init_progression_coeffs: initing a progression for Dickson_{1,0}(1651 + n * 2730)
init_progression_coeffs: NOT initing a progression for Dickson_{1,0}(1729 + n * 2730), gcd (1729, 210) == 7)
init_progression_coeffs: initing a progression for Dickson_{1,0}(1807 + n * 2730)
init_progression_coeffs: NOT initing a progression for Dickson_{1,0}(1885 + n * 2730), gcd (1885, 210) == 5)
init_progression_coeffs: initing a progression for Dickson_{1,0}(1963 + n * 2730)
init_progression_coeffs: initing a progression for Dickson_{1,0}(2041 + n * 2730)
init_progression_coeffs: initing a progression for Dickson_{1,0}(2119 + n * 2730)
init_progression_coeffs: initing a progression for Dickson_{1,0}(2197 + n * 2730)
init_progression_coeffs: NOT initing a progression for Dickson_{1,0}(2275 + n * 2730), gcd (2275, 210) == 35)
init_progression_coeffs: initing a progression for Dickson_{1,0}(2353 + n * 2730)
init_progression_coeffs: initing a progression for Dickson_{1,0}(2431 + n * 2730)
init_progression_coeffs: initing a progression for Dickson_{1,0}(2509 + n * 2730)
init_progression_coeffs: initing a progression for Dickson_{1,0}(2587 + n * 2730)
init_progression_coeffs: NOT initing a progression for Dickson_{1,0}(2665 + n * 2730), gcd (2665, 210) == 5)
ecm_rootsF: coeffs[0] = 13
ecm_rootsF: coeffs[1] = 2730
ecm_rootsF: coeffs[2] = 169
ecm_rootsF: coeffs[3] = 1
ecm_rootsF: coeffs[4] = 247
ecm_rootsF: coeffs[5] = 1
ecm_rootsF: coeffs[6] = 403
ecm_rootsF: coeffs[7] = 1
ecm_rootsF: coeffs[8] = 481
ecm_rootsF: coeffs[9] = 1
ecm_rootsF: coeffs[10] = 559
ecm_rootsF: coeffs[11] = 1
ecm_rootsF: coeffs[12] = 793
ecm_rootsF: coeffs[13] = 1
ecm_rootsF: coeffs[14] = 871
ecm_rootsF: coeffs[15] = 1
ecm_rootsF: coeffs[16] = 949
ecm_rootsF: coeffs[17] = 1
ecm_rootsF: coeffs[18] = 1027
ecm_rootsF: coeffs[19] = 1
ecm_rootsF: coeffs[20] = 1261
ecm_rootsF: coeffs[21] = 1
ecm_rootsF: coeffs[22] = 1339
ecm_rootsF: coeffs[23] = 1
ecm_rootsF: coeffs[24] = 1417
ecm_rootsF: coeffs[25] = 1
ecm_rootsF: coeffs[26] = 1573
ecm_rootsF: coeffs[27] = 1
ecm_rootsF: coeffs[28] = 1651
ecm_rootsF: coeffs[29] = 1
ecm_rootsF: coeffs[30] = 1807
ecm_rootsF: coeffs[31] = 1
ecm_rootsF: coeffs[32] = 1963
ecm_rootsF: coeffs[33] = 1
ecm_rootsF: coeffs[34] = 2041
ecm_rootsF: coeffs[35] = 1
ecm_rootsF: coeffs[36] = 2119
ecm_rootsF: coeffs[37] = 1
ecm_rootsF: coeffs[38] = 2197
ecm_rootsF: coeffs[39] = 1
ecm_rootsF: coeffs[40] = 2353
ecm_rootsF: coeffs[41] = 1
ecm_rootsF: coeffs[42] = 2431
ecm_rootsF: coeffs[43] = 1
ecm_rootsF: coeffs[44] = 2509
ecm_rootsF: coeffs[45] = 1
ecm_rootsF: coeffs[46] = 2587
ecm_rootsF: coeffs[47] = 1
Initializing tables of differences for F took 0ms, 791 muls and 12 extgcds
Computing roots of F took 4ms, 3243 muls and 23 extgcds
f_0 = 1291158979092778170014806400
f_1 = 1844157961036764185527050922
f_2 = 334655769202808049491529769
f_3 = 310612841774900355166693896
f_4 = 785833930290836656623203598
f_5 = 1005510886690201839028969993
f_6 = 426738909098146165070474323
f_7 = 14163367230757369277118384
f_8 = 1858729224279765682688108256
f_9 = 845685566810431116151538206
f_10 = 17645110150817735049380586
f_11 = 581734686272546967543532429
f_12 = 924974727250831694869874481
f_13 = 1919829910312255071077977754
f_14 = 331434791559138964417945794
f_15 = 1341150172906389112796724636
f_16 = 1608146368045577502337249141
f_17 = 1787288754034542420366723545
f_18 = 577860381071827468948944051
f_19 = 1957602161665626761459300630
f_20 = 684878190584896678478146219
f_21 = 1786325781998934497492178450
f_22 = 1039975487363450569945434650
f_23 = 907656988084170904281550498
f_24 = 1020321626170720645724045766
f_25 = 815224882800885828686240740
f_26 = 1563876178260377464474582986
f_27 = 1262075028157487741648035951
f_28 = 780322602571599607132519557
f_29 = 293332565413908814822525772
f_30 = 1693216991482540475663385488
f_31 = 2045977194278898804717316116
f_32 = 1073022433025276929694723466
f_33 = 1529985169595907103414003562
f_34 = 1367913811614956010772901007
f_35 = 1266980823992534359681344056
f_36 = 476322134803073977595963751
f_37 = 1793577538875041410778738576
f_38 = 407470001720635414385756887
f_39 = 95022769995763011915447379
f_40 = 1482398738990555559900266256
f_41 = 1241804805475878612325318620
f_42 = 1833396171506350857642487160
f_43 = 1033149501443064045032153048
f_44 = 197917070411138261635580364
f_45 = 653963963193619475361445351
f_46 = 2019580606990074693151997971
f_47 = 1077744393227378785811672584
f_48 = 619979757885104173831079847
f_49 = 1125097494699998110450088077
f_50 = 115104974198870890502398325
f_51 = 127651256318300156643522623
f_52 = 1387778730090083728844656501
f_53 = 1760887038437031402887227089
f_54 = 32715409115746689035225556
f_55 = 1819790243129052776912262334
f_56 = 471581567484201096960868153
f_57 = 704882177465438062667501228
f_58 = 447532056152537496940396816
f_59 = 1922637526082278363177934423
f_60 = 1124687512941730564126173369
f_61 = 810605167814165891539201878
f_62 = 1327419743277458320803507119
f_63 = 804931487543981427912805899
f_64 = 1575468619793481251302138390
f_65 = 479767518421573147901507002
f_66 = 129211985520914197419053173
f_67 = 1338348383822281945853467093
f_68 = 1102518615370303579332897693
f_69 = 769485071985079318518357837
f_70 = 1715239761288860912591061353
f_71 = 1867450072888636179542499081
f_72 = 1702874270400777778865513016
f_73 = 1112333786286682103895972024
f_74 = 188203814628841329966718593
f_75 = 198455490769313044915262229
f_76 = 1613786999100036442468066377
f_77 = 1244971556705811120080796080
f_78 = 270458128829308374028870410
f_79 = 339436948972308905310416266
f_80 = 1388212399004597020425437251
f_81 = 1664215911988946102716958632
f_82 = 625495128986883244462785742
f_83 = 1447886133671470213377948755
f_84 = 1914440833071324753139703628
f_85 = 1200332158562676389307466043
f_86 = 305104975252440458420276889
f_87 = 1957652006465827721899787357
f_88 = 1477287713112477780903112529
f_89 = 545513770941217872491617636
f_90 = 1962934783936651029376046205
f_91 = 694476228657403679644178551
f_92 = 193400082487981395826526957
f_93 = 408581702002496133243326471
f_94 = 283703418896736599047949163
f_95 = 674275384143682162115121142
f_96 = 133707344910011262515474086
f_97 = 1059299176185094290096285309
f_98 = 1703346930643556630981464622
f_99 = 1490417316337858096248713480
f_100 = 1970791501370408018508436831
f_101 = 1916946739638039235266528690
f_102 = 1438407505683348973162433927
f_103 = 254188295918348348652764857
f_104 = 770033425208834865658688051
f_105 = 664862769962660226503362648
f_106 = 1241071145228575919858533323
f_107 = 1072736507980390965249934150
f_108 = 476478653848342647689453490
f_109 = 785393327420010394159133270
f_110 = 423850894826744575958263109
f_111 = 224906393865385618599437681
f_112 = 1079793274107880244387778235
f_113 = 1176767922484050267559114807
f_114 = 1141478026167903207575217438
f_115 = 1349774515230936699346386814
f_116 = 1692043441270875597491304012
f_117 = 1858670970748239872014979268
f_118 = 809599349610914755612184800
f_119 = 233463921015237306840216999
f_120 = 1086139216578647637371434935
f_121 = 256562721378776264467461284
f_122 = 1843420932920829175768401849
f_123 = 1263421701610850006119939550
f_124 = 98290892159009923221485103
f_125 = 2043062441898918648352548940
f_126 = 1699902600273513933296335746
f_127 = 568367956527790306904003273
f_128 = 1272347830114733913493279974
f_129 = 399761841866366572272243016
f_130 = 974998951197688491894418581
f_131 = 94581174015085518220699970
f_132 = 1799202775882031631116250132
f_133 = 1200617001771577433427603146
f_134 = 168086132940788762506348084
f_135 = 497364292044146082140783383
f_136 = 1563342174053518054017715630
f_137 = 1071229095210098760221275112
f_138 = 1584424736679849463604655119
f_139 = 1706095279535170651219464760
f_140 = 879117198476139839343775089
f_141 = 1224286288505419771029637596
f_142 = 692345182453054990046187053
f_143 = 1608407902365882545005233498
f_144 = 1659662346369572347234280203
f_145 = 399600606674659155610135823
f_146 = 1759957444660089819490749072
f_147 = 1761855523366134690704687088
f_148 = 1903482974155164579736971917
f_149 = 1487997710726971204683727782
f_150 = 1633228850876519297737998260
f_151 = 477787987424553620611592392
f_152 = 468856343645941692046808519
f_153 = 894531267819969362444250926
f_154 = 1161226379527256450013792687
f_155 = 592627549703701663960978156
f_156 = 568802565847413813432005880
f_157 = 1328208429431576063734216005
f_158 = 1281436289934135719646470937
f_159 = 1430545607467164941491250983
f_160 = 1457740230723368686171324699
f_161 = 199274074874150614185304836
f_162 = 1802594262243176781261155164
f_163 = 1130751807711321504361353903
f_164 = 238582058654555170166750240
f_165 = 2035381142224642662086112459
f_166 = 1483247650358853012808668070
f_167 = 401599944667015879637938307
f_168 = 1179467107181153599232492847
f_169 = 1803502303340766280732830384
f_170 = 907050557072118163963389985
f_171 = 1473935259130509372108907118
f_172 = 826211941229252731202704114
f_173 = 522058374603425461878111346
f_174 = 803361518471716889340705945
f_175 = 1535843519007974872135928973
f_176 = 637133366116398788215482347
f_177 = 1776201388216981576003823819
f_178 = 588460948878025321019057045
f_179 = 770176426811506411061405321
f_180 = 677533053550856861693538043
f_181 = 1046563918243671410519969771
f_182 = 1969684968630786849179001319
f_183 = 1237265713234658256110674246
f_184 = 1732521524020941280063208917
f_185 = 1304805665770925976199441891
f_186 = 84848506631166377347638214
f_187 = 637455419017950909593989441
f_188 = 1139228674317751396917321410
f_189 = 1558486493079430529981911977
f_190 = 1505436202429723166129315399
f_191 = 494723291606251193639591706
f_192 = 480566642001255787245104734
f_193 = 217243432091127172083011386
f_194 = 824758954212056338692248057
f_195 = 1639473094135797852685501895
f_196 = 511424489406376612319166862
f_197 = 773897033775253975641955738
f_198 = 443764627885533801552362865
f_199 = 969794594818769270800178895
f_200 = 1269331956286710541889196730
f_201 = 1749330228058135495398191246
f_202 = 541059891263777177477681550
f_203 = 1371956278159874370264343739
f_204 = 1908083673732650810326921759
f_205 = 1945538889069508133988165458
f_206 = 1827884527210946053825744347
f_207 = 918595144091989358801484817
f_208 = 292139204158616674067963879
f_209 = 738406087030328678323806963
f_210 = 1219077658861874965211014914
f_211 = 535286600014474690184917505
f_212 = 1227358176830889979709597343
f_213 = 601797257558812654144885102
f_214 = 1675575611045844711976440517
f_215 = 1656369586490859118672899822
f_216 = 1845102130481024882807662395
f_217 = 2028549749936595858285600858
f_218 = 815184750639524282728351388
f_219 = 2042581532149103090109006339
f_220 = 246809804338234584446761590
f_221 = 391712655396138607911167358
f_222 = 279378188852292230083830543
f_223 = 1084885119049403376280286688
f_224 = 542861681112229314378430730
f_225 = 407253257763647954235650566
f_226 = 451960782362562130859073749
f_227 = 15895015200816058876992027
f_228 = 1024690938897328910082800980
f_229 = 243490335257119424844300697
f_230 = 543887780873654767390376475
f_231 = 1111105943115775391275852510
f_232 = 1042942730334813065640373606
f_233 = 814140013739361104361943178
f_234 = 864047067567467436835560786
f_235 = 1248577850951575611503978841
f_236 = 809852235058803146218595415
f_237 = 1697171580768005801208493416
f_238 = 1725104804082165113384972216
f_239 = 2000850705619382462948943772
f_240 = 1571812172559953701805879534
f_241 = 1822495101013546812173309215
f_242 = 515093826968482555750356060
f_243 = 530055719750367816614967976
f_244 = 1810677990057061813581089104
f_245 = 607274520411736364666341101
f_246 = 1645715008217971331453580314
f_247 = 529959846761896153399605004
f_248 = 92302585132398158377404757
f_249 = 1485737619584497675757971496
f_250 = 109371825933798757307645559
f_251 = 698060309522716887627284410
f_252 = 741541848140417741997294986
f_253 = 762824506471490099974673203
f_254 = 1764925025508534384183651194
f_255 = 604518012379665837395229128
f_256 = 1233689113022171049896411170
f_257 = 1981862247833302710641868244
f_258 = 850450393722795627775866606
f_259 = 752133665714519634604630544
f_260 = 1919385816667965005527693341
f_261 = 742127058036746108182349714
f_262 = 325350134535650529906398343
f_263 = 1098393095362326019727770031
f_264 = 1151148163544622774970058376
f_265 = 1374941583280685645710807183
f_266 = 800689349259621282449499432
f_267 = 526101084683099591826559164
f_268 = 1051835597311783618994284242
f_269 = 1986060474637936689858014090
f_270 = 919350584987645150940522693
f_271 = 1070780074929631349330333669
f_272 = 1740250983976828865865528565
f_273 = 21574774980792299005120180
f_274 = 1071472513130177774279234106
f_275 = 432830985986829062880859643
f_276 = 1497466688372524543792790281
f_277 = 1665029521639092409723610617
f_278 = 1175701925074433084911671852
f_279 = 2021334490693828264640971159
f_280 = 1031096511151815728881384386
f_281 = 1211702653092349635144648106
f_282 = 1029493538461769356337267641
f_283 = 1234196216755351385962358961
f_284 = 1495380211389241603654467463
f_285 = 1687663224181352809260725733
f_286 = 331873565229097456883623624
f_287 = 530059511385699746764423239
f_288 = 952056352886368988421258850
f_289 = 447982670199036197637182392
f_290 = 1455883283860845236127631121
f_291 = 879815886083869500801880136
f_292 = 546344051401908490856173241
f_293 = 1354868453549106130901484486
f_294 = 1373232925101473151014863309
f_295 = 503300014521015182360470915
f_296 = 818151064010320389288145041
f_297 = 175336207861831645570060994
f_298 = 1472510993042774042716695071
f_299 = 1150035273555093147788243656
f_300 = 1103243945162905639132807273
f_301 = 1467872204672889538660248496
f_302 = 1276483386268131946791665882
f_303 = 712487612671094283308124718
f_304 = 606620296642849771537447781
f_305 = 2031044832707615067015625195
f_306 = 686290002033549353869830162
f_307 = 2004100270686958734239790045
f_308 = 1442351699370517454877329081
f_309 = 1944577501363842881647279230
f_310 = 576837236872948349671186961
f_311 = 1682429972424559860734633592
f_312 = 1734808936854081020098154170
f_313 = 923070459280504893272725717
f_314 = 227109574921054165103355116
f_315 = 1126444232338984426144481062
f_316 = 1876829879727258141043649987
f_317 = 1111134358669282026128266843
f_318 = 1089534619773878290553758348
f_319 = 29766947957672169041838154
f_320 = 287983464864890950660777410
f_321 = 1765373343685556933764357069
f_322 = 1496842897487000548683238070
f_323 = 253362596694624665649344970
f_324 = 1890245808923243829200329629
f_325 = 554755882661014665825907408
f_326 = 1370445261359016160811356953
f_327 = 106287681963274228736244926
f_328 = 1337211509485840607948162624
f_329 = 1370265753333139947519005708
f_330 = 1070075624774152802723160036
f_331 = 1083088190220478606583937753
f_332 = 550895700582670198324307698
f_333 = 227937689645459042231915489
f_334 = 197118137541184764662194394
f_335 = 135660432925171017292140433
f_336 = 1573906374234801476132668923
f_337 = 700341657318441436674008279
f_338 = 1216715171921301574395848740
f_339 = 508375289410330457577141266
f_340 = 1079022382553169837834102866
f_341 = 50540409748364638107119609
f_342 = 341560270425642408326489081
f_343 = 1608038095917709965730761323
f_344 = 195314423379732400094802366
f_345 = 189759782773966191096288786
f_346 = 1887328221476722045980570080
f_347 = 433868636759182406804332584
f_348 = 969314244227619262159654240
f_349 = 1997844788709497550415542902
f_350 = 1305952977387702427778652239
f_351 = 1937442573611730609258363482
f_352 = 1230958317660428936973993825
f_353 = 453482257333864119807309974
f_354 = 1130640269718103885238938
f_355 = 341755726403826035753903285
f_356 = 180668139273908106011751032
f_357 = 570620996955531022916660828
f_358 = 766852680651873115458395425
f_359 = 1000525295697963116105208593
f_360 = 240664468496875795252963927
f_361 = 1534379614727566934729183616
f_362 = 563610217057090592284709408
f_363 = 1462744081948695571707318564
f_364 = 644261210588391145538538386
f_365 = 433635725835429551034453942
f_366 = 1779199955376191472056337076
f_367 = 1550340669170509577128571832
f_368 = 398287784461231603554219345
f_369 = 927204399004717860976709405
f_370 = 466800772756223485125840744
f_371 = 1938443697650230064679058099
f_372 = 693880938165307188826970197
f_373 = 36729959724095823716885841
f_374 = 1954158298314415620236850107
f_375 = 1145419822987387336652408362
f_376 = 39168078629686141243332660
f_377 = 256771642454227321436206465
f_378 = 37763442487824705354777219
f_379 = 30495536839203278580953820
f_380 = 1180266535179037529766639267
f_381 = 1512307050366910541399905704
f_382 = 1000829476835387257910166882
f_383 = 1083270961397506296407788207
f_384 = 1127100283450007570975044725
f_385 = 1284569127193261270412951532
f_386 = 366877729785052761927790159
f_387 = 163868057726797349493525907
f_388 = 1443481696112565557788815473
f_389 = 693735431944127747505798127
f_390 = 1453047507598025742689181325
f_391 = 2028037241033043574388514157
f_392 = 743056079186716855220963899
f_393 = 618145588648719159271285980
f_394 = 1786586431853100700696074366
f_395 = 1810301452333477270311616573
f_396 = 1529596412375921095387183179
f_397 = 1971570124961519751431550764
f_398 = 1892880707663908782549531641
f_399 = 717354465101308879472800144
f_400 = 1313330138664148791320810192
f_401 = 1326015360213591265788184466
f_402 = 1277240684545942220177034778
f_403 = 1566169441273231622513028641
f_404 = 326007980652740523896148959
f_405 = 728582774848845123992148415
f_406 = 1030216968873322480649920475
f_407 = 1586884951855848233925065640
f_408 = 1349915100848146984128760553
f_409 = 2023589693426541589536565887
f_410 = 1161386272160534520863136228
f_411 = 569587975135071642915353857
f_412 = 1418506190203753162589283566
f_413 = 1798820717193380179299190805
f_414 = 1860856733740299694220613969
f_415 = 1296615447802167072821093024
f_416 = 850053780971197284007792041
f_417 = 1987397106203288323545941448
f_418 = 211380795825741790733755465
f_419 = 1853386124103574889935163701
f_420 = 183819027762348721941238997
f_421 = 1901353068087611503686168613
f_422 = 1316015784294737228536934996
f_423 = 413125619965188193645916793
f_424 = 871574259233799168493456202
f_425 = 194922553765413535955142442
f_426 = 2039806710934629639865174290
f_427 = 1085751771977437549781029615
f_428 = 190962208646339087326363076
f_429 = 1693203251915714758747418895
f_430 = 1124829758802095114258963862
f_431 = 1708644345643516392264154843
f_432 = 691849144864400153779279416
f_433 = 1774255372828313084860340204
f_434 = 2013910192728135015371981885
f_435 = 680778366434228470942930180
f_436 = 343446783892821357755606572
f_437 = 1361397749818464015539409641
f_438 = 1331175059171206814627819335
f_439 = 1103763008079108916206225064
f_440 = 373252906008930600298351227
f_441 = 513923410378888928391292910
f_442 = 1039868788423001927473042451
f_443 = 2046796345332528395690626704
f_444 = 1957855027923789648812046153
f_445 = 1191823727221501205812448895
f_446 = 1532631422365506795967266749
f_447 = 1013078930413995165452827108
f_448 = 1748371695177895229348430699
f_449 = 44373625526014399471694903
f_450 = 1120740465894852546773112949
f_451 = 1014794456294228835439466543
f_452 = 343018776871612407067681412
f_453 = 1344828706638632837913352822
f_454 = 1620228291949210740706482582
f_455 = 998805140189223696970558087
f_456 = 762207724534276777911086608
f_457 = 1336072625019352006797059329
f_458 = 100375843510826729809785248
f_459 = 1202957191220492100187360659
f_460 = 926042603704733175683748062
f_461 = 369786669822147045113921398
f_462 = 1645132388625868077762980852
f_463 = 1463955694900998169787718111
f_464 = 473830711708777225650277271
f_465 = 515235868130288254602839625
f_466 = 94189221835803703701578599
f_467 = 1891052785325629106201554897
f_468 = 360785042593272950162472810
f_469 = 1784358068034072472617679978
f_470 = 653275375201666025982511705
f_471 = 13488008627417668082646705
f_472 = 191243787881655832383313165
f_473 = 1833436249969754898849909637
f_474 = 591669854861900478214462823
f_475 = 1879383943826385696817393074
f_476 = 374331087823991426570916571
f_477 = 1719450307733808556431774833
f_478 = 2045277308289696212369167495
f_479 = 1122489604557598793883100862
f_480 = 1059517548259047617776923645
f_481 = 1601368939400969608300366945
f_482 = 1952454713010870513973345829
f_483 = 2025642162021084959449544427
f_484 = 67357055280601504471676819
f_485 = 1731521861309947186080511478
f_486 = 1017926328652319828972537390
f_487 = 1266592898647429072159682671
f_488 = 291110544305933459482488096
f_489 = 1336330293506702295833076565
f_490 = 1121462736768471186709811892
f_491 = 69078853343496255778041168
f_492 = 1912427371771046208413583212
f_493 = 1258987383413574025170943730
f_494 = 635133589951479340622397395
f_495 = 79134949854932606632590754
f_496 = 1934431395744540488971886960
f_497 = 1093210075416498220788447803
f_498 = 1189809821037687192081479372
f_499 = 113710689149393703506736955
f_500 = 1905585413616904222712784600
f_501 = 202741875540558653891116288
f_502 = 1582796895221242436243332534
f_503 = 77607763138184255769614272
f_504 = 568219917438256855836415044
f_505 = 124500174283313501157540206
f_506 = 1283837411646444691240526756
f_507 = 1216614043081579586305646540
f_508 = 1840046469878689267236871329
f_509 = 677163805586296245917760925
f_510 = 504755023729073054622527984
f_511 = 484188112319072884405435027
F[0] = 338482354629736503182539575
F[1] = 95161389926984786551867734
F[2] = 1630265770874438913426879174
F[3] = 1655353594323762202086963553
F[4] = 1745108328698521973384687275
F[5] = 1238859625232609495884787901
F[6] = 1000255296037366509578431906
F[7] = 618566479396532460908229021
F[8] = 1331881777798954396933610105
F[9] = 108026510173851449623806468
F[10] = 1988271420124151797463728169
F[11] = 1685454523482450629162233128
F[12] = 1571863136153023022948653348
F[13] = 165807804036968414426763809
F[14] = 1763005412243319403980643948
F[15] = 1992727192977258661627746452
F[16] = 1555963492118564784546700126
F[17] = 653129562510393146762113153
F[18] = 178021198684961880031138399
F[19] = 13248164056733919690996846
F[20] = 966831993579033641566902272
F[21] = 1904952493115584611057427771
F[22] = 306909144196671664987679163
F[23] = 173996373609682675589865526
F[24] = 149526008389729934474346312
F[25] = 1551447177078056092457796409
F[26] = 1129148851747794550705080427
F[27] = 626132051928137880104557250
F[28] = 1732165750137258355974132982
F[29] = 1029122320829128356693357957
F[30] = 907317591602637429530220394
F[31] = 304922703529943045763507291
F[32] = 1019351500553994066164119723
F[33] = 1299788396693966927683347803
F[34] = 1370652427027363899719076459
F[35] = 663685214069234932517389977
F[36] = 2035988038977212035082948367
F[37] = 1365727785743843860903552132
F[38] = 1181263997756922126602283697
F[39] = 395139385747730373249615755
F[40] = 165431905127405572358504845
F[41] = 1048199001003847893290962787
F[42] = 356041889817273245376885928
F[43] = 1908338523444015725087569833
F[44] = 1344765524040382009942372970
F[45] = 1182127797232268161756929751
F[46] = 497680111129146466506874061
F[47] = 308060269270172965147368473
F[48] = 70793254047524804935358835
F[49] = 831859421583106047853109007
F[50] = 204189085963900487352443445
F[51] = 971640306523748210520002978
F[52] = 1659361825265504052942276582
F[53] = 924832482974769741509922859
F[54] = 127057809272753926602513636
F[55] = 420094483797842715304010829
F[56] = 451373161461598886736119106
F[57] = 1098788644173933231576772435
F[58] = 1882929532698592141197608565
F[59] = 321811297578540102719869101
F[60] = 1308082331066802045685605651
F[61] = 1369866058331849690721633186
F[62] = 724685905894528019496442212
F[63] = 1165654279101172049526601603
F[64] = 396284591035672650351740536
F[65] = 1495361322254144190397048043
F[66] = 544500161757495618443615628
F[67] = 1460861092491607400159524278
F[68] = 1653603860351098314972160025
F[69] = 843161515827012939213842019
F[70] = 1762841197868012668568550733
F[71] = 1672752397895128955711117020
F[72] = 2010352649979635669161095520
F[73] = 625150181816433543475067401
F[74] = 961785947271088217934631823
F[75] = 192116063092432768038115399
F[76] = 151581078564535779207439723
F[77] = 1039879587597601993922598955
F[78] = 352080363742444803859141908
F[79] = 95223395526590943820031338
F[80] = 1263004229550626265132738176
F[81] = 1527589737551124910765631096
F[82] = 153266626579857020154917112
F[83] = 1168681430931162350738739067
F[84] = 1029249855808860237580315784
F[85] = 664917400120523515686398142
F[86] = 73129060743852657194616081
F[87] = 1057945821641061624419920237
F[88] = 1212602337263999955751742391
F[89] = 1857688076216388430264047937
F[90] = 422491742430111223706777868
F[91] = 1107944528533148005597547245
F[92] = 1874342118402730531479995722
F[93] = 57351155140502611414938199
F[94] = 1287462962011429008016672371
F[95] = 1572341111871803122455901164
F[96] = 480716342779072778431032350
F[97] = 1679908799574479739906736790
F[98] = 447069087289400924859906644
F[99] = 1990522044735384315401214002
F[100] = 2010225145186822648832969666
F[101] = 1661957944776030909530204521
F[102] = 1679500457292858698163680510
F[103] = 1836859424591507932097804534
F[104] = 731976721560265354687574809
F[105] = 244636552596208987835828643
F[106] = 121265926042088006358499758
F[107] = 1135479752846103232843793600
F[108] = 763123532794168369425194567
F[109] = 1981984525843440714952538896
F[110] = 589419330550745036817669710
F[111] = 653653947320492774889082
F[112] = 1650520609552621527062377782
F[113] = 1486852014162359315458462003
F[114] = 1988821599151070705310905137
F[115] = 1277460396311266369834230467
F[116] = 757682778137097086364360868
F[117] = 1112247968425299720371177038
F[118] = 173838945280046958587774049
F[119] = 1614596307720117810635470160
F[120] = 1753353161844702363086927436
F[121] = 1436010400627623399013691702
F[122] = 221296281361540618112131532
F[123] = 1673649662937568492028634288
F[124] = 313199174745958065440380983
F[125] = 1333844523053692412056562576
F[126] = 348740453136649074387064983
F[127] = 40540389562280368509728457
F[128] = 919897319906432812512586683
F[129] = 1248636549807023910846611091
F[130] = 1120276532404545812148387869
F[131] = 1770687536102644441099153908
F[132] = 113557614429949511373395632
F[133] = 1894128752517628182201231340
F[134] = 1082586192753839226885989081
F[135] = 1359361057370295538346763891
F[136] = 136436028307730660253165983
F[137] = 655056416480345890292581840
F[138] = 1130542334717869398085064893
F[139] = 1741617669935404816301399221
F[140] = 1672941212613255835314477855
F[141] = 1068469223763087864401556574
F[142] = 548611781133941570486700761
F[143] = 1049389271882763477863782666
F[144] = 629726832071661357890981765
F[145] = 410816618148143784326270075
F[146] = 594220658563444300009787847
F[147] = 269898492957631758644676897
F[148] = 1082321730001738609476947704
F[149] = 779723356808219451841629992
F[150] = 317639527467535130219765521
F[151] = 895311261881402369248952236
F[152] = 1744498495064420011289883996
F[153] = 1097733041801020863373776397
F[154] = 972476836843721948578415595
F[155] = 1521633396736792964172988687
F[156] = 876194498221895911384539386
F[157] = 1482013349013004000937100073
F[158] = 1040911321323578898121571003
F[159] = 1660150610729074511317788807
F[160] = 248468269284930588426824944
F[161] = 1049253562354051873931331858
F[162] = 1853015939662904204837714471
F[163] = 231355029178115905444165002
F[164] = 1885644818840358213200609978
F[165] = 128790690110826978223548489
F[166] = 410352765163850321189402074
F[167] = 1999662446696887310022862739
F[168] = 1186794337486530044127940315
F[169] = 1554722521870909782278720743
F[170] = 546268426039823054246456462
F[171] = 1517560396026841977072691036
F[172] = 2017866844102673021758984095
F[173] = 1596840523693156704294884747
F[174] = 1912463583527815862649355702
F[175] = 534313413639562321806768189
F[176] = 175224792386621809373730038
F[177] = 923276385089669762587086217
F[178] = 1646225466736152593188579449
F[179] = 1676198540566521658615425845
F[180] = 1035804433372201206852016431
F[181] = 1846919782100603201544848213
F[182] = 1414468352492083464355976796
F[183] = 1229237041442521607435057943
F[184] = 1712206926821088679690032943
F[185] = 957389388810364454403872547
F[186] = 1185996082373965881405744495
F[187] = 1202629309605294411168814250
F[188] = 1849614428405023392053167598
F[189] = 1513221883377981212481488998
F[190] = 1085757527172422321958482030
F[191] = 1664067116658847574910710135
F[192] = 160077254037920971408218345
F[193] = 330124928103055709133710508
F[194] = 1243183784275502256222616507
F[195] = 2037247982352157807885079687
F[196] = 1224443304954939976097959906
F[197] = 178998262633024878326779473
F[198] = 1797071189615904127057473414
F[199] = 333580634090651226971074150
F[200] = 166128808883168622423709803
F[201] = 1450459356351633028011079894
F[202] = 1901746397081211763107295025
F[203] = 1866398688374927672104778218
F[204] = 1121530023921415945125980207
F[205] = 109875415075963563482918256
F[206] = 1645028558075633611776244330
F[207] = 1262231908102455669653937206
F[208] = 1172304468693305521146233257
F[209] = 153524104522986132516275252
F[210] = 905981143625180109946891243
F[211] = 1334889817402740578464188373
F[212] = 1400262867021453443561991080
F[213] = 1929803692345857892999279031
F[214] = 78292013528922171044493887
F[215] = 1957430450268932980756136670
F[216] = 1502969539003900581404509803
F[217] = 2038286233232658076137075005
F[218] = 1203938574401554606354537237
F[219] = 803588263056924273671631772
F[220] = 1087901155805867139980606486
F[221] = 1683842784950374400772793733
F[222] = 1789667560888284450510322503
F[223] = 994799352475684813599318226
F[224] = 612992890410689427269726791
F[225] = 1203163556521966514502688870
F[226] = 252958409224598121915262688
F[227] = 418636591500032325386595926
F[228] = 1296841647079849993631584493
F[229] = 2018522836216814142385006168
F[230] = 1048734813008135452514108269
F[231] = 1976975459880373786852519752
F[232] = 1954472112917310306135873057
F[233] = 816122172181673936360571808
F[234] = 692550202041346709847828179
F[235] = 1380120444025142196416291458
F[236] = 2004673492001009260329315192
F[237] = 1377185516193077277110589907
F[238] = 966030117199002430294838881
F[239] = 786019925281196660270210379
F[240] = 1768957137533241313807885290
F[241] = 1136208423888415050901185463
F[242] = 1664329861497479263478901351
F[243] = 1223556456245929726463433136
F[244] = 1450837450099865510276477931
F[245] = 1663370423086230472796865474
F[246] = 173779282755476750596114490
F[247] = 906239271409615426939526456
F[248] = 1531526211534672839883444017
F[249] = 321593454798368345509592282
F[250] = 544573578969852919816570429
F[251] = 1672362830986275817623787495
F[252] = 1075260189926106719360460357
F[253] = 495779425644879099305221480
F[254] = 242768474292439385671235380
F[255] = 1643210856139071159554104717
F[256] = 611640517179236335472345233
F[257] = 1403688853260373358606199310
F[258] = 448016134419745930664194134
F[259] = 1153560360934046900351520491
F[260] = 918393792124034806030300801
F[261] = 417278732256319265753088565
F[262] = 1575271861907820927442878789
F[263] = 207783366717675309533868575
F[264] = 526520287395242450026659292
F[265] = 1663356961712955317681066822
F[266] = 2005485822081638472747417497
F[267] = 1043706479400388020550453985
F[268] = 153882337578024739196200927
F[269] = 557705347021399235863647655
F[270] = 1210204095896159190808846294
F[271] = 576943870026244931386348421
F[272] = 896526053878084104359168822
F[273] = 490577836228773302315588682
F[274] = 677575882613312163302198810
F[275] = 906895314143104826142479967
F[276] = 1430138969078876554111222590
F[277] = 1876801707556560698444987323
F[278] = 1937248341257529437371304525
F[279] = 1385919197673413524547625813
F[280] = 1616501541442239480414666211
F[281] = 546748761975161310826259078
F[282] = 672926279151497011928615439
F[283] = 211472791655669047224083602
F[284] = 1038268340195057008020024428
F[285] = 1817509615559241224195414086
F[286] = 1122403209574024645145781604
F[287] = 410116021399886737193376052
F[288] = 107284879871145072491141576
F[289] = 718083233466745450465442510
F[290] = 857540577147037051880067595
F[291] = 575285847586786754575902830
F[292] = 865110094846555664640696162
F[293] = 296997499646454478887893547
F[294] = 731804124429554437027262583
F[295] = 1860898889652416758516459109
F[296] = 279940950226016740309972702
F[297] = 845078006303098522005009246
F[298] = 1826902708850964465000458474
F[299] = 1345158534053689106290794519
F[300] = 1139395677191562828473556238
F[301] = 1696282470817338941372927535
F[302] = 496134397768904284995113833
F[303] = 1920646247294548087938799611
F[304] = 1075449299041141517985459124
F[305] = 1035793368260114241328304536
F[306] = 1121543466303391910131785424
F[307] = 496818552304256353604715147
F[308] = 18741562012245506289476050
F[309] = 1875800573913634136111586007
F[310] = 823604910627485899652636309
F[311] = 635711135655473023843118433
F[312] = 1894219504367349262435231924
F[313] = 1785221529825823412723736783
F[314] = 1841088739565258875684261397
F[315] = 112985804383502816336748852
F[316] = 1545575567062491844257063063
F[317] = 8359853658821387470773631
F[318] = 1719803525958327574004654361
F[319] = 139859023006351036864669489
F[320] = 1058398914487104157848812473
F[321] = 355214471984614204935607709
F[322] = 1443248977418730125750576927
F[323] = 477924581342345342833389085
F[324] = 1577433386374908889192616837
F[325] = 715476696105971678616010586
F[326] = 1131106888350338077499481984
F[327] = 270604872114358308386006066
F[328] = 393374367874461330967606953
F[329] = 1099517778580475363169966705
F[330] = 1879262522234420423499138832
F[331] = 1253901133321363064313149812
F[332] = 1877593069708707843782277175
F[333] = 1118930202583571840772091124
F[334] = 352310023411107172612525194
F[335] = 1119467069531201422560931212
F[336] = 1508953291925149528884451921
F[337] = 1873207170866069355802213512
F[338] = 1872007702570132323192488616
F[339] = 1736280534831509259360249116
F[340] = 866992533941759619710211913
F[341] = 1586616101681577800479464790
F[342] = 303153770481405584541049962
F[343] = 1899305996172477708093220906
F[344] = 59756852149899318412610729
F[345] = 679309747967765050753904553
F[346] = 988465578904260570539837464
F[347] = 1172158750135828559800896982
F[348] = 182366963618250798203452234
F[349] = 1800516476418633127239360029
F[350] = 1905402973830110107888276212
F[351] = 832743169765088077662196405
F[352] = 1124364791346773219989535339
F[353] = 618999721687675206745324726
F[354] = 709287823263664137652806375
F[355] = 16512926536626448144532346
F[356] = 31900010873745130856150290
F[357] = 1191392999871263933818481873
F[358] = 1608130439870032680776443655
F[359] = 503892163600962815333164163
F[360] = 504043799776049275039804676
F[361] = 939735240242792996468842784
F[362] = 1447661755404201637849861052
F[363] = 689035800796617546538478753
F[364] = 1361527725410074633517758235
F[365] = 1747820520603375911731709998
F[366] = 910380623933453335242026419
F[367] = 1265785463065673923963694617
F[368] = 360688039081929486037704485
F[369] = 1664607974088012019974162406
F[370] = 1366834695078497216722062333
F[371] = 898829063700828240758422090
F[372] = 1761692773095545250661419552
F[373] = 1169937230059700599123146557
F[374] = 1103175267087949413235808947
F[375] = 875108287160803176191149212
F[376] = 1878525509115782153892569822
F[377] = 1759967407736642670894837446
F[378] = 1928016558546835760291534402
F[379] = 921619469114050801489919562
F[380] = 100248592895015976599562385
F[381] = 662627450083614177229668761
F[382] = 211477179183275879924371800
F[383] = 1750693829827855522780722892
F[384] = 234137148796339112829453596
F[385] = 449996457732125803011888244
F[386] = 856343482888850309870745454
F[387] = 1738868510282166739394941855
F[388] = 1255735834408821330781701427
F[389] = 416777714291510544719681816
F[390] = 1609193499678055692159905963
F[391] = 444956606824855213441166342
F[392] = 1616354232232102735189844880
F[393] = 1902141840877356424719647930
F[394] = 1824302064505323568394853202
F[395] = 12512158681716578761054808
F[396] = 619510026739754459870680225
F[397] = 360389267647900645662164126
F[398] = 1536254941324507452206586201
F[399] = 1262843728964285018091866284
F[400] = 1423607665540429756774828058
F[401] = 552486197390649506784566966
F[402] = 1272006166166576145417399752
F[403] = 174719637378306074803660351
F[404] = 887839403932733282959765154
F[405] = 1868697635082904785508532895
F[406] = 1896801023837514590220966631
F[407] = 1458345185856550079681911426
F[408] = 399302219499044706910808219
F[409] = 244896118049188570338756428
F[410] = 761741251511408720195689882
F[411] = 916851866119525575135356018
F[412] = 1060380692945067088658569751
F[413] = 697457265920556865298289471
F[414] = 1011823173898076916491410298
F[415] = 1314337651235560420862669103
F[416] = 1227683676041692904150460160
F[417] = 178409537867997312531710211
F[418] = 1763857170009762333139311492
F[419] = 1570126281393450434091833473
F[420] = 764548944572835345737710269
F[421] = 1711931639363464637360183605
F[422] = 304310094095972343117297222
F[423] = 1785058223699708262647850093
F[424] = 1549785224299645543950853010
F[425] = 1103742856478284099522315778
F[426] = 814722608656322190384181186
F[427] = 14837002624688820109565870
F[428] = 343941332423387680530514188
F[429] = 1812087202746471641336106798
F[430] = 1113322578358495885330965694
F[431] = 1302241259287270602018313750
F[432] = 677390530546361276143176575
F[433] = 209102272141288095573671936
F[434] = 583763626950528408056289364
F[435] = 801245142893927453858559436
F[436] = 1108522282090833133218609098
F[437] = 721671067252197564038138903
F[438] = 1082803817511680120319734696
F[439] = 1385849198994289545475533433
F[440] = 115613708004724551971538814
F[441] = 896312887575741816226765431
F[442] = 1148087035100436449884479473
F[443] = 1021153043020767631998557174
F[444] = 813419682524675094626581088
F[445] = 884328337006620706573001825
F[446] = 806291788152098320863645537
F[447] = 623638834823940988007422761
F[448] = 425661084302515841927007836
F[449] = 335032956085437851475876266
F[450] = 1378253630721336010997790576
F[451] = 1381802227477807300346006692
F[452] = 1838398103148673119080322600
F[453] = 1551841287872663386008552505
F[454] = 1039888802340462111039611153
F[455] = 1465449207366890753564409412
F[456] = 1302250408622352699891715541
F[457] = 1414990393026233243859397647
F[458] = 16892901842913163730424898
F[459] = 1207761248649896646346584958
F[460] = 1876645656403068714844793033
F[461] = 913551192325390361471128993
F[462] = 1196605790326680702095238737
F[463] = 1191280021512593541800069417
F[464] = 1377230552439661568377087712
F[465] = 514883133209329724507665149
F[466] = 475908422112538122007669079
F[467] = 1527478497799762481348434539
F[468] = 1542160859243132471534760055
F[469] = 744396803760527391586567261
F[470] = 1700228659978635964023885606
F[471] = 1235424686058884454831299254
F[472] = 195570522244479347203308027
F[473] = 360926995256270390251898797
F[474] = 1101939724898824059191440578
F[475] = 1004159153883613453250951484
F[476] = 581073421723623526143167255
F[477] = 137156684293339679956647739
F[478] = 1489177833190099913365436857
F[479] = 713058692021119947841310841
F[480] = 36917929054899416337105234
F[481] = 1960712547301626631192112138
F[482] = 1041153047235148891460254772
F[483] = 893772090319114157217956095
F[484] = 89660901930547276109938315
F[485] = 1349753241408233779808859230
F[486] = 1086389312337292855187144031
F[487] = 1199039547047649050316373644
F[488] = 1326666788441143780198377107
F[489] = 653520979522713982287753760
F[490] = 702581000586337233226168768
F[491] = 704430986057270043891986754
F[492] = 795177765029144017894872803
F[493] = 346607811123322365461082213
F[494] = 1637863342904691012896622996
F[495] = 314974805057953121707736406
F[496] = 1662347050230523884958720404
F[497] = 1942267177351572218102898153
F[498] = 570388620072945052492231606
F[499] = 486219459846922899808635839
F[500] = 747279842730548026390221880
F[501] = 1450377268439228206218900473
F[502] = 822936830391012200856190840
F[503] = 131460158393044020116991561
F[504] = 490521384936226575909491306
F[505] = 364352796076735888286256992
F[506] = 312453967806688583592479144
F[507] = 1008951588887491690772680143
F[508] = 1457306165607026302784374102
F[509] = 1030454159800136582366627812
F[510] = 1288450285175645291970978963
F[511] = 1944135137888752319157930264
Building F from its roots took 20ms
Computing 1/F took 16ms
ecm_rootsG_init: bestnr = 6.106412
ecm_rootsG_init: i0=-12, d1=4620, d2=13, dF=512, blocks=1, S=1, T_inv = 6, nr=12
init_progression_coeffs: i0 = -12, d = 13, e = 4620, k = 1, m = 1, E = 1, a = 0, size_fd = 24
init_progression_coeffs: initing a progression for Dickson_{1,0}(-55440 + n * 60060)
init_progression_coeffs: initing a progression for Dickson_{1,0}(-50820 + n * 60060)
init_progression_coeffs: initing a progression for Dickson_{1,0}(-46200 + n * 60060)
init_progression_coeffs: initing a progression for Dickson_{1,0}(-41580 + n * 60060)
init_progression_coeffs: initing a progression for Dickson_{1,0}(-36960 + n * 60060)
init_progression_coeffs: initing a progression for Dickson_{1,0}(-32340 + n * 60060)
init_progression_coeffs: initing a progression for Dickson_{1,0}(-27720 + n * 60060)
init_progression_coeffs: initing a progression for Dickson_{1,0}(-23100 + n * 60060)
init_progression_coeffs: initing a progression for Dickson_{1,0}(-18480 + n * 60060)
init_progression_coeffs: initing a progression for Dickson_{1,0}(-13860 + n * 60060)
init_progression_coeffs: initing a progression for Dickson_{1,0}(-9240 + n * 60060)
init_progression_coeffs: initing a progression for Dickson_{1,0}(-4620 + n * 60060)
init_progression_coeffs: NOT initing a progression for Dickson_{1,0}(0 + n * 60060), gcd (0, 13) == 13)
ecm_rootsG_init: coeffs[0] == -55440
ecm_rootsG_init: coeffs[1] == 60060
ecm_rootsG_init: coeffs[2] == -50820
ecm_rootsG_init: coeffs[3] == 1
ecm_rootsG_init: coeffs[4] == -46200
ecm_rootsG_init: coeffs[5] == 1
ecm_rootsG_init: coeffs[6] == -41580
ecm_rootsG_init: coeffs[7] == 1
ecm_rootsG_init: coeffs[8] == -36960
ecm_rootsG_init: coeffs[9] == 1
ecm_rootsG_init: coeffs[10] == -32340
ecm_rootsG_init: coeffs[11] == 1
ecm_rootsG_init: coeffs[12] == -27720
ecm_rootsG_init: coeffs[13] == 1
ecm_rootsG_init: coeffs[14] == -23100
ecm_rootsG_init: coeffs[15] == 1
ecm_rootsG_init: coeffs[16] == -18480
ecm_rootsG_init: coeffs[17] == 1
ecm_rootsG_init: coeffs[18] == -13860
ecm_rootsG_init: coeffs[19] == 1
ecm_rootsG_init: coeffs[20] == -9240
ecm_rootsG_init: coeffs[21] == 1
ecm_rootsG_init: coeffs[22] == -4620
ecm_rootsG_init: coeffs[23] == 1
Initializing table of differences for G took 4ms, 465 muls and 16 extgcds
ecm_rootsG: dF = 512, state: nr = 12, next = 0, S = 1, dsieve = 1, rsieve = 0,
dickson_a = 0
ecm_rootsG: storing d1*0*X = 1460872497814131027522942228 in G[1]
ecm_rootsG: storing d1*1*X = 411122612785131077760336782 in G[2]
ecm_rootsG: storing d1*2*X = 1604124952323803071973490813 in G[3]
ecm_rootsG: storing d1*3*X = 1909699108020327689889181246 in G[4]
ecm_rootsG: storing d1*4*X = 748323743452439248320377610 in G[5]
ecm_rootsG: storing d1*5*X = 1979117394792816577748686168 in G[6]
ecm_rootsG: storing d1*6*X = 1752265579097339459935574056 in G[7]
ecm_rootsG: storing d1*7*X = 1761689290308441566706246024 in G[8]
ecm_rootsG: storing d1*8*X = 1156569869504867352167621421 in G[9]
ecm_rootsG: storing d1*9*X = 1743040650428364813737785523 in G[10]
ecm_rootsG: storing d1*10*X = 1598572927410725676010058149 in G[11]
ecm_rootsG: storing d1*11*X = 136303274823540553959865509 in G[12]
ecm_rootsG: storing d1*12*X = 136303274823540553959865509 in G[13]
ecm_rootsG: storing d1*13*X = 1598572927410725676010058149 in G[14]
ecm_rootsG: storing d1*14*X = 1743040650428364813737785523 in G[15]
ecm_rootsG: storing d1*15*X = 1156569869504867352167621421 in G[16]
ecm_rootsG: storing d1*16*X = 1761689290308441566706246024 in G[17]
ecm_rootsG: storing d1*17*X = 1752265579097339459935574056 in G[18]
ecm_rootsG: storing d1*18*X = 1979117394792816577748686168 in G[19]
ecm_rootsG: storing d1*19*X = 748323743452439248320377610 in G[20]
ecm_rootsG: storing d1*20*X = 1909699108020327689889181246 in G[21]
ecm_rootsG: storing d1*21*X = 1604124952323803071973490813 in G[22]
ecm_rootsG: storing d1*22*X = 411122612785131077760336782 in G[23]
ecm_rootsG: storing d1*23*X = 1460872497814131027522942228 in G[24]
ecm_rootsG: storing d1*24*X = 1629623956762772349158989213 in G[25]
ecm_rootsG: storing d1*25*X = 1411959662670183284148897530 in G[26]
ecm_rootsG: storing d1*26*X = 259545138983581463100464588 in G[27]
ecm_rootsG: storing d1*27*X = 1181753103914577136376663315 in G[28]
ecm_rootsG: storing d1*28*X = 1855134929377480637547590180 in G[29]
ecm_rootsG: storing d1*29*X = 739400419092651548593287775 in G[30]
ecm_rootsG: storing d1*30*X = 656965566508043281521747114 in G[31]
ecm_rootsG: storing d1*31*X = 606637447974203521553722374 in G[32]
ecm_rootsG: storing d1*32*X = 1608293900295364192182618622 in G[33]
ecm_rootsG: storing d1*33*X = 1704690504305770227537320613 in G[34]
ecm_rootsG: storing d1*34*X = 237558926340646890293721095 in G[35]
ecm_rootsG: storing d1*35*X = 1398787754481620343751806105 in G[36]
ecm_rootsG: storing d1*36*X = 1244134653311820863915061078 in G[37]
ecm_rootsG: storing d1*37*X = 476375099056973691898367312 in G[38]
ecm_rootsG: storing d1*38*X = 1831934883659898941548026559 in G[39]
ecm_rootsG: storing d1*39*X = 314869848355530505227359889 in G[40]
ecm_rootsG: storing d1*40*X = 868838802701766802695123205 in G[41]
ecm_rootsG: storing d1*41*X = 414825577993933351804798471 in G[42]
ecm_rootsG: storing d1*42*X = 113404719018838971462634525 in G[43]
ecm_rootsG: storing d1*43*X = 1734398373045977908911219732 in G[44]
ecm_rootsG: storing d1*44*X = 2009326779601798027854321756 in G[45]
ecm_rootsG: storing d1*45*X = 1266645493769479933522363200 in G[46]
ecm_rootsG: storing d1*46*X = 300872053296446345224353177 in G[47]
ecm_rootsG: storing d1*47*X = 1018047803683851546074513062 in G[48]
ecm_rootsG: storing d1*48*X = 1276827558966532804761501889 in G[49]
ecm_rootsG: storing d1*49*X = 339044920616448049070424378 in G[50]
ecm_rootsG: storing d1*50*X = 377359037150855985783683437 in G[51]
ecm_rootsG: storing d1*51*X = 1866091971650675127282860645 in G[52]
ecm_rootsG: storing d1*52*X = 891126948579847756805014241 in G[53]
ecm_rootsG: storing d1*53*X = 1417356968234362196167623553 in G[54]
ecm_rootsG: storing d1*54*X = 1903072136376945419293467717 in G[55]
ecm_rootsG: storing d1*55*X = 1556671628100236493442981274 in G[56]
ecm_rootsG: storing d1*56*X = 1454342367789398247131255788 in G[57]
ecm_rootsG: storing d1*57*X = 1065255247128375159679543564 in G[58]
ecm_rootsG: storing d1*58*X = 833387702688587309240296289 in G[59]
ecm_rootsG: storing d1*59*X = 551684843230351896199026795 in G[60]
ecm_rootsG: storing d1*60*X = 761091966980474520365029805 in G[61]
ecm_rootsG: storing d1*61*X = 1383359718029034122847149920 in G[62]
ecm_rootsG: storing d1*62*X = 449025175233839217702174547 in G[63]
ecm_rootsG: storing d1*63*X = 392595758587063409344857233 in G[64]
ecm_rootsG: storing d1*64*X = 690099555990453489010798048 in G[65]
ecm_rootsG: storing d1*65*X = 1110401824163885066477318260 in G[66]
ecm_rootsG: storing d1*66*X = 710560209031611308694171558 in G[67]
ecm_rootsG: storing d1*67*X = 1335190257380187933274039274 in G[68]
ecm_rootsG: storing d1*68*X = 809097095650435592403180540 in G[69]
ecm_rootsG: storing d1*69*X = 1769776741515610683883607649 in G[70]
ecm_rootsG: storing d1*70*X = 115955361382858019387409703 in G[71]
ecm_rootsG: storing d1*71*X = 701337938326944340264579303 in G[72]
ecm_rootsG: storing d1*72*X = 4581035738914436395861253 in G[73]
ecm_rootsG: storing d1*73*X = 6852081140867555079739777 in G[74]
ecm_rootsG: storing d1*74*X = 214069769913656628838267329 in G[75]
ecm_rootsG: storing d1*75*X = 1092095307989453379673226711 in G[76]
ecm_rootsG: storing d1*76*X = 1722501430738070689308365421 in G[77]
ecm_rootsG: storing d1*77*X = 1291690358165757864542569300 in G[78]
ecm_rootsG: storing d1*78*X = 724577566117368593966814127 in G[79]
ecm_rootsG: storing d1*79*X = 924573540397838132364516462 in G[80]
ecm_rootsG: storing d1*80*X = 704256848681703561869012675 in G[81]
ecm_rootsG: storing d1*81*X = 70228866311999601000902055 in G[82]
ecm_rootsG: storing d1*82*X = 1898753358004490627626100605 in G[83]
ecm_rootsG: storing d1*83*X = 1470916791009351542008845991 in G[84]
ecm_rootsG: storing d1*84*X = 1367421300968223997607034069 in G[85]
ecm_rootsG: storing d1*85*X = 127250029317401311227760036 in G[86]
ecm_rootsG: storing d1*86*X = 892261022893237685790137685 in G[87]
ecm_rootsG: storing d1*87*X = 859400218389328541430451718 in G[88]
ecm_rootsG: storing d1*88*X = 544671958383842103448437253 in G[89]
ecm_rootsG: storing d1*89*X = 727607981250517596607712317 in G[90]
ecm_rootsG: storing d1*90*X = 905632240784663996880164858 in G[91]
ecm_rootsG: storing d1*91*X = 392540855268809631581446457 in G[92]
ecm_rootsG: storing d1*92*X = 915578238424269511965026918 in G[93]
ecm_rootsG: storing d1*93*X = 1913658908451956563115351478 in G[94]
ecm_rootsG: storing d1*94*X = 1085698435776081260229459681 in G[95]
ecm_rootsG: storing d1*95*X = 138539326486441309379611676 in G[96]
ecm_rootsG: storing d1*96*X = 1989886088544932119051917333 in G[97]
ecm_rootsG: storing d1*97*X = 1331598979080672158608555914 in G[98]
ecm_rootsG: storing d1*98*X = 1038621800634576089365993518 in G[99]
ecm_rootsG: storing d1*99*X = 430648882847424689275008142 in G[100]
ecm_rootsG: storing d1*100*X = 751553757357461494252439208 in G[101]
ecm_rootsG: storing d1*101*X = 1313502420769188038053373183 in G[102]
ecm_rootsG: storing d1*102*X = 719158240649499276346359981 in G[103]
ecm_rootsG: storing d1*103*X = 1930135219942927349684553900 in G[104]
ecm_rootsG: storing d1*104*X = 461790066341344164796363756 in G[105]
ecm_rootsG: storing d1*105*X = 994750460872204119520572245 in G[106]
ecm_rootsG: storing d1*106*X = 452285474444454838575166064 in G[107]
ecm_rootsG: storing d1*107*X = 161747319400948467551230044 in G[108]
ecm_rootsG: storing d1*108*X = 1889473209679622863547501493 in G[109]
ecm_rootsG: storing d1*109*X = 243399785144837253611740185 in G[110]
ecm_rootsG: storing d1*110*X = 1028236252842047863621028868 in G[111]
ecm_rootsG: storing d1*111*X = 819242132588677193677341713 in G[112]
ecm_rootsG: storing d1*112*X = 1034996438199228346207850390 in G[113]
ecm_rootsG: storing d1*113*X = 1191180528337544437306021667 in G[114]
ecm_rootsG: storing d1*114*X = 17870146608754919788690934 in G[115]
ecm_rootsG: storing d1*115*X = 282716582603630193809961019 in G[116]
ecm_rootsG: storing d1*116*X = 956000955252787432056029600 in G[117]
ecm_rootsG: storing d1*117*X = 1702969027918851727046058240 in G[118]
ecm_rootsG: storing d1*118*X = 2027298860687872484884506738 in G[119]
ecm_rootsG: storing d1*119*X = 1392231516305908268426119999 in G[120]
ecm_rootsG: storing d1*120*X = 467947005858798663700376060 in G[121]
ecm_rootsG: storing d1*121*X = 1241118531721604263561387752 in G[122]
ecm_rootsG: storing d1*122*X = 1795370517736507903726070645 in G[123]
ecm_rootsG: storing d1*123*X = 1690196008381672100180453110 in G[124]
ecm_rootsG: storing d1*124*X = 954037286610612803838020796 in G[125]
ecm_rootsG: storing d1*125*X = 1831950900555958052403826854 in G[126]
ecm_rootsG: storing d1*126*X = 270429847227491050170975900 in G[127]
ecm_rootsG: storing d1*127*X = 128923940545259136302405399 in G[128]
ecm_rootsG: storing d1*128*X = 1431701688939435160901042816 in G[129]
ecm_rootsG: storing d1*129*X = 1773517518461612852211986256 in G[130]
ecm_rootsG: storing d1*130*X = 1394536101434263934188372308 in G[131]
ecm_rootsG: storing d1*131*X = 1415364099707810594920779863 in G[132]
ecm_rootsG: storing d1*132*X = 1704298627048947099583022515 in G[133]
ecm_rootsG: storing d1*133*X = 189854586736823042951150849 in G[134]
ecm_rootsG: storing d1*134*X = 151431721694788043071978466 in G[135]
ecm_rootsG: storing d1*135*X = 285901704098151254050967832 in G[136]
ecm_rootsG: storing d1*136*X = 2031325011469283239468747395 in G[137]
ecm_rootsG: storing d1*137*X = 658958087500951203369481957 in G[138]
ecm_rootsG: storing d1*138*X = 816858967132970403309120851 in G[139]
ecm_rootsG: storing d1*139*X = 140962768732866831931971857 in G[140]
ecm_rootsG: storing d1*140*X = 1574632623858585192295327906 in G[141]
ecm_rootsG: storing d1*141*X = 775737675326364601351838568 in G[142]
ecm_rootsG: storing d1*142*X = 1790123903901003984823801966 in G[143]
ecm_rootsG: storing d1*143*X = 1756001025779080149469272729 in G[144]
ecm_rootsG: storing d1*144*X = 1160744764467555359219554928 in G[145]
ecm_rootsG: storing d1*145*X = 725231531118295887638982913 in G[146]
ecm_rootsG: storing d1*146*X = 553367350173938292662657116 in G[147]
ecm_rootsG: storing d1*147*X = 644021678171981033432799661 in G[148]
ecm_rootsG: storing d1*148*X = 32563331023839941305723655 in G[149]
ecm_rootsG: storing d1*149*X = 1890050792124087878096448471 in G[150]
ecm_rootsG: storing d1*150*X = 549207833529762502829198113 in G[151]
ecm_rootsG: storing d1*151*X = 273506075671912861760894579 in G[152]
ecm_rootsG: storing d1*152*X = 860380023846503870889536733 in G[153]
ecm_rootsG: storing d1*153*X = 1010086033730553101508746534 in G[154]
ecm_rootsG: storing d1*154*X = 1380278145799337201812892407 in G[155]
ecm_rootsG: storing d1*155*X = 189455593569365979924512658 in G[156]
ecm_rootsG: storing d1*156*X = 465405776244372623987270880 in G[157]
ecm_rootsG: storing d1*157*X = 1226498655969905717014421361 in G[158]
ecm_rootsG: storing d1*158*X = 998604267478452304425310285 in G[159]
ecm_rootsG: storing d1*159*X = 1119845776677450827465546150 in G[160]
ecm_rootsG: storing d1*160*X = 897746144446897751640953357 in G[161]
ecm_rootsG: storing d1*161*X = 1268133695963829827088958354 in G[162]
ecm_rootsG: storing d1*162*X = 1731380034544028454035475576 in G[163]
ecm_rootsG: storing d1*163*X = 1700045968275465642468556793 in G[164]
ecm_rootsG: storing d1*164*X = 941062759741227493669879623 in G[165]
ecm_rootsG: storing d1*165*X = 292333399406728764573421560 in G[166]
ecm_rootsG: storing d1*166*X = 1512084616034543611545905173 in G[167]
ecm_rootsG: storing d1*167*X = 693018284647965650073033028 in G[168]
ecm_rootsG: storing d1*168*X = 528603868799380382250623836 in G[169]
ecm_rootsG: storing d1*169*X = 138632795216086637977498227 in G[170]
ecm_rootsG: storing d1*170*X = 1859255319253211545969743202 in G[171]
ecm_rootsG: storing d1*171*X = 1057243606049248878632830694 in G[172]
ecm_rootsG: storing d1*172*X = 2017283101414497599743242256 in G[173]
ecm_rootsG: storing d1*173*X = 295560554060095018897986078 in G[174]
ecm_rootsG: storing d1*174*X = 1374724288386321032352895730 in G[175]
ecm_rootsG: storing d1*175*X = 1248320826301008151253707876 in G[176]
ecm_rootsG: storing d1*176*X = 1313270362186541425593318036 in G[177]
ecm_rootsG: storing d1*177*X = 754226078045146048419222238 in G[178]
ecm_rootsG: storing d1*178*X = 1130206276972300310785253105 in G[179]
ecm_rootsG: storing d1*179*X = 1389808488880884682109330501 in G[180]
ecm_rootsG: storing d1*180*X = 1173267800379739934870566328 in G[181]
ecm_rootsG: storing d1*181*X = 1416499229467289470743807626 in G[182]
ecm_rootsG: storing d1*182*X = 986402682823663193606561976 in G[183]
ecm_rootsG: storing d1*183*X = 1016595574405817807894220821 in G[184]
ecm_rootsG: storing d1*184*X = 1922515943266133465214188952 in G[185]
ecm_rootsG: storing d1*185*X = 1850582500645150436093981540 in G[186]
ecm_rootsG: storing d1*186*X = 1619930303280466623816272901 in G[187]
ecm_rootsG: storing d1*187*X = 1326112435346289710169895034 in G[188]
ecm_rootsG: storing d1*188*X = 1875690712295077425178979246 in G[189]
ecm_rootsG: storing d1*189*X = 1624300072954471919062937529 in G[190]
ecm_rootsG: storing d1*190*X = 1340985280051785746197633444 in G[191]
ecm_rootsG: storing d1*191*X = 1287058174392721931096814946 in G[192]
ecm_rootsG: storing d1*192*X = 1945666305632084982870985788 in G[193]
ecm_rootsG: storing d1*193*X = 1229994029461231718416433202 in G[194]
ecm_rootsG: storing d1*194*X = 291933564216822866604705377 in G[195]
ecm_rootsG: storing d1*195*X = 68127446145881180713247424 in G[196]
ecm_rootsG: storing d1*196*X = 726243594635575482140630347 in G[197]
ecm_rootsG: storing d1*197*X = 1505979642118531331179651187 in G[198]
ecm_rootsG: storing d1*198*X = 1768496192072862966571776897 in G[199]
ecm_rootsG: storing d1*199*X = 241011391651070111951326151 in G[200]
ecm_rootsG: storing d1*200*X = 1254246181023728483594685713 in G[201]
ecm_rootsG: storing d1*201*X = 386228639992305496009315210 in G[202]
ecm_rootsG: storing d1*202*X = 1194158334276295771116297365 in G[203]
ecm_rootsG: storing d1*203*X = 286256235071045004812215326 in G[204]
ecm_rootsG: storing d1*204*X = 171117623197517472328364494 in G[205]
ecm_rootsG: storing d1*205*X = 13293006873570722464806690 in G[206]
ecm_rootsG: storing d1*206*X = 292526054640446919113378304 in G[207]
ecm_rootsG: storing d1*207*X = 1852429126833611846459880663 in G[208]
ecm_rootsG: storing d1*208*X = 518770679492843243961777804 in G[209]
ecm_rootsG: storing d1*209*X = 995431853080717642430478803 in G[210]
ecm_rootsG: storing d1*210*X = 990127254930806058977895600 in G[211]
ecm_rootsG: storing d1*211*X = 597906689629888678861408568 in G[212]
ecm_rootsG: storing d1*212*X = 33841544469339635212404193 in G[213]
ecm_rootsG: storing d1*213*X = 1033854837166924433467746772 in G[214]
ecm_rootsG: storing d1*214*X = 1497739841531931070598236658 in G[215]
ecm_rootsG: storing d1*215*X = 1009901360643329872518851478 in G[216]
ecm_rootsG: storing d1*216*X = 891682322991039145834019865 in G[217]
ecm_rootsG: storing d1*217*X = 1599431592227298771963480721 in G[218]
ecm_rootsG: storing d1*218*X = 960359438954002908365244956 in G[219]
ecm_rootsG: storing d1*219*X = 1951562711696172987336717923 in G[220]
ecm_rootsG: storing d1*220*X = 1763514117025813526280369603 in G[221]
ecm_rootsG: storing d1*221*X = 2017909992668874918531349204 in G[222]
ecm_rootsG: storing d1*222*X = 754260101171637832995311743 in G[223]
ecm_rootsG: storing d1*223*X = 1984114927346583763456832657 in G[224]
ecm_rootsG: storing d1*224*X = 345235508474155494470090740 in G[225]
ecm_rootsG: storing d1*225*X = 165363777729605800435271846 in G[226]
ecm_rootsG: storing d1*226*X = 105420150483035766261381185 in G[227]
ecm_rootsG: storing d1*227*X = 645673052639496238746741856 in G[228]
ecm_rootsG: storing d1*228*X = 1090895233759974521538820804 in G[229]
ecm_rootsG: storing d1*229*X = 858860873634422899210421979 in G[230]
ecm_rootsG: storing d1*230*X = 499168739474172315366776745 in G[231]
ecm_rootsG: storing d1*231*X = 1790278514818706101097372872 in G[232]
ecm_rootsG: storing d1*232*X = 678720615195977638309144780 in G[233]
ecm_rootsG: storing d1*233*X = 74205104012724209607518851 in G[234]
ecm_rootsG: storing d1*234*X = 920886337122421918219473820 in G[235]
ecm_rootsG: storing d1*235*X = 1122887495614748909054509434 in G[236]
ecm_rootsG: storing d1*236*X = 1004217384911335536521774532 in G[237]
ecm_rootsG: storing d1*237*X = 1880964575098137848155476580 in G[238]
ecm_rootsG: storing d1*238*X = 1353247591134432341888249603 in G[239]
ecm_rootsG: storing d1*239*X = 996101312094357141670196435 in G[240]
ecm_rootsG: storing d1*240*X = 377644345808400522273348036 in G[241]
ecm_rootsG: storing d1*241*X = 2006138369597347879191055800 in G[242]
ecm_rootsG: storing d1*242*X = 1853080924897359369405368668 in G[243]
ecm_rootsG: storing d1*243*X = 1565420252097981698886058293 in G[244]
ecm_rootsG: storing d1*244*X = 2027152188180930755842496706 in G[245]
ecm_rootsG: storing d1*245*X = 1267759876673768234346857545 in G[246]
ecm_rootsG: storing d1*246*X = 985141946025836194754440828 in G[247]
ecm_rootsG: storing d1*247*X = 116631599496738881873788455 in G[248]
ecm_rootsG: storing d1*248*X = 891491259351175886219312054 in G[249]
ecm_rootsG: storing d1*249*X = 436169393318670574803516586 in G[250]
ecm_rootsG: storing d1*250*X = 187800985759954227671041115 in G[251]
ecm_rootsG: storing d1*251*X = 803626379988274684097878182 in G[252]
ecm_rootsG: storing d1*252*X = 263737715552732663497838206 in G[253]
ecm_rootsG: storing d1*253*X = 1838722771759925846705747832 in G[254]
ecm_rootsG: storing d1*254*X = 803549421714156072318739148 in G[255]
ecm_rootsG: storing d1*255*X = 1641559886739802663607275325 in G[256]
ecm_rootsG: storing d1*256*X = 1950842321203677893157749506 in G[257]
ecm_rootsG: storing d1*257*X = 1217794348285645274554716468 in G[258]
ecm_rootsG: storing d1*258*X = 1739782510555251202197304017 in G[259]
ecm_rootsG: storing d1*259*X = 565112580228932369051877603 in G[260]
ecm_rootsG: storing d1*260*X = 2040789290499517823020825849 in G[261]
ecm_rootsG: storing d1*261*X = 2486208164537920639232665 in G[262]
ecm_rootsG: storing d1*262*X = 36460325703052830329906300 in G[263]
ecm_rootsG: storing d1*263*X = 253003921366268123855213443 in G[264]
ecm_rootsG: storing d1*264*X = 1512157547762748208596626878 in G[265]
ecm_rootsG: storing d1*265*X = 646674566281498346258904017 in G[266]
ecm_rootsG: storing d1*266*X = 1213461076799889019284108047 in G[267]
ecm_rootsG: storing d1*267*X = 118641684462025131306479589 in G[268]
ecm_rootsG: storing d1*268*X = 776859989588003876271090735 in G[269]
ecm_rootsG: storing d1*269*X = 297601986455889944020201734 in G[270]
ecm_rootsG: storing d1*270*X = 76015594027674202198518752 in G[271]
ecm_rootsG: storing d1*271*X = 258023293266614724723187007 in G[272]
ecm_rootsG: storing d1*272*X = 179091915534330076045462728 in G[273]
ecm_rootsG: storing d1*273*X = 1547980730530061731527631608 in G[274]
ecm_rootsG: storing d1*274*X = 705958891239418100996929037 in G[275]
ecm_rootsG: storing d1*275*X = 298240809046788120415063869 in G[276]
ecm_rootsG: storing d1*276*X = 555706443138700231920153871 in G[277]
ecm_rootsG: storing d1*277*X = 15382214641128387945973145 in G[278]
ecm_rootsG: storing d1*278*X = 1872849374768934380329097668 in G[279]
ecm_rootsG: storing d1*279*X = 1583446354328852112596899090 in G[280]
ecm_rootsG: storing d1*280*X = 646468024857282703551308634 in G[281]
ecm_rootsG: storing d1*281*X = 1324643956086087558671400769 in G[282]
ecm_rootsG: storing d1*282*X = 1676860044989228867375015498 in G[283]
ecm_rootsG: storing d1*283*X = 1329562647248410907133409585 in G[284]
ecm_rootsG: storing d1*284*X = 1627171991506850085071380132 in G[285]
ecm_rootsG: storing d1*285*X = 1986933894749333069389161887 in G[286]
ecm_rootsG: storing d1*286*X = 310472168187953475742636568 in G[287]
ecm_rootsG: storing d1*287*X = 463725669696371526983230593 in G[288]
ecm_rootsG: storing d1*288*X = 2026179420657387546045641468 in G[289]
ecm_rootsG: storing d1*289*X = 432550002704115229574888574 in G[290]
ecm_rootsG: storing d1*290*X = 392818188167858014574938040 in G[291]
ecm_rootsG: storing d1*291*X = 1927232650788873284765245155 in G[292]
ecm_rootsG: storing d1*292*X = 896821781658335443716838333 in G[293]
ecm_rootsG: storing d1*293*X = 1635135442578416915785849616 in G[294]
ecm_rootsG: storing d1*294*X = 1353870654024908596086577623 in G[295]
ecm_rootsG: storing d1*295*X = 299899264478811200513260642 in G[296]
ecm_rootsG: storing d1*296*X = 1415632549829909836776337009 in G[297]
ecm_rootsG: storing d1*297*X = 925508324458740975069920432 in G[298]
ecm_rootsG: storing d1*298*X = 1888814473133789606609169147 in G[299]
ecm_rootsG: storing d1*299*X = 1341395359516152480442702329 in G[300]
ecm_rootsG: storing d1*300*X = 1827143219698084117207696163 in G[301]
ecm_rootsG: storing d1*301*X = 500236796981793322860707768 in G[302]
ecm_rootsG: storing d1*302*X = 247326118923445385514543405 in G[303]
ecm_rootsG: storing d1*303*X = 996277845013495784640680688 in G[304]
ecm_rootsG: storing d1*304*X = 1319118950901200179426335663 in G[305]
ecm_rootsG: storing d1*305*X = 1400441623553249346332600931 in G[306]
ecm_rootsG: storing d1*306*X = 613447328202977771998996079 in G[307]
ecm_rootsG: storing d1*307*X = 193624753869622768065513278 in G[308]
ecm_rootsG: storing d1*308*X = 654296368551211333855723731 in G[309]
ecm_rootsG: storing d1*309*X = 153110774078889734322517024 in G[310]
ecm_rootsG: storing d1*310*X = 1903794244107811888268138608 in G[311]
ecm_rootsG: storing d1*311*X = 1276802648128301232205082581 in G[312]
ecm_rootsG: storing d1*312*X = 1511000085230967953977882964 in G[313]
ecm_rootsG: storing d1*313*X = 1075219496922674242744903490 in G[314]
ecm_rootsG: storing d1*314*X = 549672842724660913628996508 in G[315]
ecm_rootsG: storing d1*315*X = 1962894944614189915420530573 in G[316]
ecm_rootsG: storing d1*316*X = 597811941690276222312297501 in G[317]
ecm_rootsG: storing d1*317*X = 1763230640986457196045411917 in G[318]
ecm_rootsG: storing d1*318*X = 1792118949099423974763263034 in G[319]
ecm_rootsG: storing d1*319*X = 2035305089769134560541378670 in G[320]
ecm_rootsG: storing d1*320*X = 673695601407121218547644716 in G[321]
ecm_rootsG: storing d1*321*X = 198537178580075670114659563 in G[322]
ecm_rootsG: storing d1*322*X = 1783311445616407796287331907 in G[323]
ecm_rootsG: storing d1*323*X = 1564641073737803706968753445 in G[324]
ecm_rootsG: storing d1*324*X = 1249699027394306782839096071 in G[325]
ecm_rootsG: storing d1*325*X = 1290288695429805641282809828 in G[326]
ecm_rootsG: storing d1*326*X = 1816086866046363788640368603 in G[327]
ecm_rootsG: storing d1*327*X = 104384728387620007430629380 in G[328]
ecm_rootsG: storing d1*328*X = 264008999332766602872644283 in G[329]
ecm_rootsG: storing d1*329*X = 1804090952490650611241953210 in G[330]
ecm_rootsG: storing d1*330*X = 438484399752640391027881078 in G[331]
ecm_rootsG: storing d1*331*X = 1318354919766493211842848297 in G[332]
ecm_rootsG: storing d1*332*X = 180311756653814143448872040 in G[333]
ecm_rootsG: storing d1*333*X = 504549401810989208154001363 in G[334]
ecm_rootsG: storing d1*334*X = 1879753320094379528096488041 in G[335]
ecm_rootsG: storing d1*335*X = 1373614615884772309442771529 in G[336]
ecm_rootsG: storing d1*336*X = 588565677691617142888157686 in G[337]
ecm_rootsG: storing d1*337*X = 654184804488574359880549005 in G[338]
ecm_rootsG: storing d1*338*X = 940140125478592119176181896 in G[339]
ecm_rootsG: storing d1*339*X = 814053681477859537077952172 in G[340]
ecm_rootsG: storing d1*340*X = 1935161956122113563767909464 in G[341]
ecm_rootsG: storing d1*341*X = 1968999829384859095580181172 in G[342]
ecm_rootsG: storing d1*342*X = 680106546357065075993584586 in G[343]
ecm_rootsG: storing d1*343*X = 635591976655078451121331874 in G[344]
ecm_rootsG: storing d1*344*X = 751350042438327465575046500 in G[345]
ecm_rootsG: storing d1*345*X = 1543760187024872011879967409 in G[346]
ecm_rootsG: storing d1*346*X = 690216265014138157104787361 in G[347]
ecm_rootsG: storing d1*347*X = 787169926645210446105217973 in G[348]
ecm_rootsG: storing d1*348*X = 1436663383134127525863009728 in G[349]
ecm_rootsG: storing d1*349*X = 612069730005405424198458979 in G[350]
ecm_rootsG: storing d1*350*X = 1603338292379441604765176611 in G[351]
ecm_rootsG: storing d1*351*X = 310402314428416273355187023 in G[352]
ecm_rootsG: storing d1*352*X = 1802167800670079521425671013 in G[353]
ecm_rootsG: storing d1*353*X = 375501128246328025458449463 in G[354]
ecm_rootsG: storing d1*354*X = 1864074209237461496830025144 in G[355]
ecm_rootsG: storing d1*355*X = 1877034341785227895121857706 in G[356]
ecm_rootsG: storing d1*356*X = 440284173896568713399277907 in G[357]
ecm_rootsG: storing d1*357*X = 1548414101421619330355763757 in G[358]
ecm_rootsG: storing d1*358*X = 1412544640300971625840621688 in G[359]
ecm_rootsG: storing d1*359*X = 162293709147650187494235800 in G[360]
ecm_rootsG: storing d1*360*X = 1747022856846699746950450668 in G[361]
ecm_rootsG: storing d1*361*X = 252992635489620656962611275 in G[362]
ecm_rootsG: storing d1*362*X = 1801210787286028365356163875 in G[363]
ecm_rootsG: storing d1*363*X = 1968867464991865147260823580 in G[364]
ecm_rootsG: storing d1*364*X = 602839300099953114461181806 in G[365]
ecm_rootsG: storing d1*365*X = 1633588394252226274140413125 in G[366]
ecm_rootsG: storing d1*366*X = 1103629444139187658076190257 in G[367]
ecm_rootsG: storing d1*367*X = 462743738277779572519043026 in G[368]
ecm_rootsG: storing d1*368*X = 994725118608455232748222120 in G[369]
ecm_rootsG: storing d1*369*X = 1685426495516849358449589404 in G[370]
ecm_rootsG: storing d1*370*X = 578435140184760872624316148 in G[371]
ecm_rootsG: storing d1*371*X = 1729993064847789332552509469 in G[372]
ecm_rootsG: storing d1*372*X = 159588668783706561431618924 in G[373]
ecm_rootsG: storing d1*373*X = 479491777539317534936904449 in G[374]
ecm_rootsG: storing d1*374*X = 615089381069666155909814363 in G[375]
ecm_rootsG: storing d1*375*X = 1695653924400559653958302346 in G[376]
ecm_rootsG: storing d1*376*X = 2023093997081194932476999653 in G[377]
ecm_rootsG: storing d1*377*X = 144973467342636378836365198 in G[378]
ecm_rootsG: storing d1*378*X = 1805064137261378588700753818 in G[379]
ecm_rootsG: storing d1*379*X = 523385274368410048520820847 in G[380]
ecm_rootsG: storing d1*380*X = 226196065799812514006799579 in G[381]
ecm_rootsG: storing d1*381*X = 69614558165585689958861372 in G[382]
ecm_rootsG: storing d1*382*X = 1330917135250592399991867819 in G[383]
ecm_rootsG: storing d1*383*X = 1824881741615820328193927843 in G[384]
ecm_rootsG: storing d1*384*X = 1684571123005321692267142305 in G[385]
ecm_rootsG: storing d1*385*X = 273224503270685409250458358 in G[386]
ecm_rootsG: storing d1*386*X = 244006711283436035194016823 in G[387]
ecm_rootsG: storing d1*387*X = 1948632393533871099290960180 in G[388]
ecm_rootsG: storing d1*388*X = 1220894385531055514228421942 in G[389]
ecm_rootsG: storing d1*389*X = 400789941868523064742228116 in G[390]
ecm_rootsG: storing d1*390*X = 1792024790414928042728220790 in G[391]
ecm_rootsG: storing d1*391*X = 687878826345961874814295018 in G[392]
ecm_rootsG: storing d1*392*X = 807488308396099389369814109 in G[393]
ecm_rootsG: storing d1*393*X = 1485537530519307532126389927 in G[394]
ecm_rootsG: storing d1*394*X = 780131383952725130756685867 in G[395]
ecm_rootsG: storing d1*395*X = 1929641875719233708612340029 in G[396]
ecm_rootsG: storing d1*396*X = 1890887099443808542293946770 in G[397]
ecm_rootsG: storing d1*397*X = 1136549820992620822905913005 in G[398]
ecm_rootsG: storing d1*398*X = 1378726761904117342859332324 in G[399]
ecm_rootsG: storing d1*399*X = 422061478853615988961323130 in G[400]
ecm_rootsG: storing d1*400*X = 275922270074883606426187218 in G[401]
ecm_rootsG: storing d1*401*X = 594461651524415444991817068 in G[402]
ecm_rootsG: storing d1*402*X = 1153876002918298116360688023 in G[403]
ecm_rootsG: storing d1*403*X = 1907675184257293095301382147 in G[404]
ecm_rootsG: storing d1*404*X = 1062263629510229528645106532 in G[405]
ecm_rootsG: storing d1*405*X = 965865575360048893301451515 in G[406]
ecm_rootsG: storing d1*406*X = 262027992180304944051424148 in G[407]
ecm_rootsG: storing d1*407*X = 796864420649309218699833912 in G[408]
ecm_rootsG: storing d1*408*X = 501978263449214537834080039 in G[409]
ecm_rootsG: storing d1*409*X = 1748253659006482862383597264 in G[410]
ecm_rootsG: storing d1*410*X = 1538768072483638409313376149 in G[411]
ecm_rootsG: storing d1*411*X = 436139981388356231066130886 in G[412]
ecm_rootsG: storing d1*412*X = 1513797475601127566219136629 in G[413]
ecm_rootsG: storing d1*413*X = 948322483941565203396452159 in G[414]
ecm_rootsG: storing d1*414*X = 1255735301473193851430677824 in G[415]
ecm_rootsG: storing d1*415*X = 1340233203956852305712297732 in G[416]
ecm_rootsG: storing d1*416*X = 779128082764346139865255175 in G[417]
ecm_rootsG: storing d1*417*X = 195458914156234419489012905 in G[418]
ecm_rootsG: storing d1*418*X = 378415161264919471710335448 in G[419]
ecm_rootsG: storing d1*419*X = 116111325647630798768029323 in G[420]
ecm_rootsG: storing d1*420*X = 464986704151490974418499562 in G[421]
ecm_rootsG: storing d1*421*X = 1752963736728565825083745639 in G[422]
ecm_rootsG: storing d1*422*X = 2026803204473594921703530655 in G[423]
ecm_rootsG: storing d1*423*X = 1793793036689837466268120303 in G[424]
ecm_rootsG: storing d1*424*X = 2028028832842322572948035021 in G[425]
ecm_rootsG: storing d1*425*X = 954257127249085199124159968 in G[426]
ecm_rootsG: storing d1*426*X = 163006486909017999023001449 in G[427]
ecm_rootsG: storing d1*427*X = 288133612416972750140900012 in G[428]
ecm_rootsG: storing d1*428*X = 964629701955735920883288574 in G[429]
ecm_rootsG: storing d1*429*X = 1675595539393775575814196589 in G[430]
ecm_rootsG: storing d1*430*X = 812683246107823891850883991 in G[431]
ecm_rootsG: storing d1*431*X = 1326895357811797475987835511 in G[432]
ecm_rootsG: storing d1*432*X = 951198852354324974831204707 in G[433]
ecm_rootsG: storing d1*433*X = 1270909460168516151825813689 in G[434]
ecm_rootsG: storing d1*434*X = 1087961380599584273807761224 in G[435]
ecm_rootsG: storing d1*435*X = 964853513699847319867371361 in G[436]
ecm_rootsG: storing d1*436*X = 1815875526753664573145784615 in G[437]
ecm_rootsG: storing d1*437*X = 347551768196338443234391654 in G[438]
ecm_rootsG: storing d1*438*X = 1549555256342804232921243150 in G[439]
ecm_rootsG: storing d1*439*X = 828812825606270204897534710 in G[440]
ecm_rootsG: storing d1*440*X = 1131159488494277714112936651 in G[441]
ecm_rootsG: storing d1*441*X = 1024593303709685431033795948 in G[442]
ecm_rootsG: storing d1*442*X = 1054753314862001738308442142 in G[443]
ecm_rootsG: storing d1*443*X = 233344396936452760974119831 in G[444]
ecm_rootsG: storing d1*444*X = 1123231566100556440019887885 in G[445]
ecm_rootsG: storing d1*445*X = 726167626305956863268852715 in G[446]
ecm_rootsG: storing d1*446*X = 574672543782878634398206712 in G[447]
ecm_rootsG: storing d1*447*X = 1728700571521485146732318626 in G[448]
ecm_rootsG: storing d1*448*X = 764388532787340848720356896 in G[449]
ecm_rootsG: storing d1*449*X = 1966011930488942498589961922 in G[450]
ecm_rootsG: storing d1*450*X = 1103845307956687951465175057 in G[451]
ecm_rootsG: storing d1*451*X = 1204406328646793545449017430 in G[452]
ecm_rootsG: storing d1*452*X = 1762233021954559544462367397 in G[453]
ecm_rootsG: storing d1*453*X = 1234955718037394023953135835 in G[454]
ecm_rootsG: storing d1*454*X = 1221191394898204535221502975 in G[455]
ecm_rootsG: storing d1*455*X = 1825877475862833193093654805 in G[456]
ecm_rootsG: storing d1*456*X = 1256987853776193524382215512 in G[457]
ecm_rootsG: storing d1*457*X = 391657052132949613168289376 in G[458]
ecm_rootsG: storing d1*458*X = 2041638455019055080913922917 in G[459]
ecm_rootsG: storing d1*459*X = 1921905421703140345513712333 in G[460]
ecm_rootsG: storing d1*460*X = 2040420007427298430193532978 in G[461]
ecm_rootsG: storing d1*461*X = 1397722547504882230434571345 in G[462]
ecm_rootsG: storing d1*462*X = 1088722730222974674186183578 in G[463]
ecm_rootsG: storing d1*463*X = 1614831787270519290796101617 in G[464]
ecm_rootsG: storing d1*464*X = 1621411416905472982078940646 in G[465]
ecm_rootsG: storing d1*465*X = 1398852710143882235341384753 in G[466]
ecm_rootsG: storing d1*466*X = 181855844182350506188126789 in G[467]
ecm_rootsG: storing d1*467*X = 296868076145336371684832803 in G[468]
ecm_rootsG: storing d1*468*X = 1991230122265730737305506289 in G[469]
ecm_rootsG: storing d1*469*X = 821880369740914540173000544 in G[470]
ecm_rootsG: storing d1*470*X = 947533960522808154373409813 in G[471]
ecm_rootsG: storing d1*471*X = 285723673337647865764916877 in G[472]
ecm_rootsG: storing d1*472*X = 1799438837371264954919750385 in G[473]
ecm_rootsG: storing d1*473*X = 986119592439135716970658713 in G[474]
ecm_rootsG: storing d1*474*X = 704267076012811443824357671 in G[475]
ecm_rootsG: storing d1*475*X = 1725567083764689902874232244 in G[476]
ecm_rootsG: storing d1*476*X = 662980362719516657056277124 in G[477]
ecm_rootsG: storing d1*477*X = 1593402762821210247863576059 in G[478]
ecm_rootsG: storing d1*478*X = 1224256179953060175388169464 in G[479]
ecm_rootsG: storing d1*479*X = 953754351040594851112367405 in G[480]
ecm_rootsG: storing d1*480*X = 628850577621153657097412553 in G[481]
ecm_rootsG: storing d1*481*X = 2039219753681934459415597627 in G[482]
ecm_rootsG: storing d1*482*X = 107540470236132956332828135 in G[483]
ecm_rootsG: storing d1*483*X = 1851573799017630500316497150 in G[484]
ecm_rootsG: storing d1*484*X = 39366774546585151929992831 in G[485]
ecm_rootsG: storing d1*485*X = 537258939343682298111932154 in G[486]
ecm_rootsG: storing d1*486*X = 366007665795358806459311138 in G[487]
ecm_rootsG: storing d1*487*X = 633305747367455404066316963 in G[488]
ecm_rootsG: storing d1*488*X = 1206888488907891877682130532 in G[489]
ecm_rootsG: storing d1*489*X = 1372527488196491049004859707 in G[490]
ecm_rootsG: storing d1*490*X = 36438873517171228027471949 in G[491]
ecm_rootsG: storing d1*491*X = 267151672336042462313981295 in G[492]
ecm_rootsG: storing d1*492*X = 240299910320833114871583549 in G[493]
ecm_rootsG: storing d1*493*X = 2022142791408449119785102045 in G[494]
ecm_rootsG: storing d1*494*X = 1367572385660936967235539547 in G[495]
ecm_rootsG: storing d1*495*X = 955605753206148384813319675 in G[496]
ecm_rootsG: storing d1*496*X = 1541522322944016696325443766 in G[497]
ecm_rootsG: storing d1*497*X = 1406831342130659998367705881 in G[498]
ecm_rootsG: storing d1*498*X = 144699422857091384787231131 in G[499]
ecm_rootsG: storing d1*499*X = 836737133850644565813598580 in G[500]
ecm_rootsG: storing d1*500*X = 1988210177857963970790268698 in G[501]
ecm_rootsG: storing d1*501*X = 120327678300751341370048467 in G[502]
ecm_rootsG: storing d1*502*X = 1077842031660142067666632661 in G[503]
ecm_rootsG: storing d1*503*X = 1049433289190428905063065735 in G[504]
ecm_rootsG: storing d1*504*X = 798801559910701724798955711 in G[505]
ecm_rootsG: storing d1*505*X = 1538797861254452799895788275 in G[506]
ecm_rootsG: storing d1*506*X = 807507048371217320694303948 in G[507]
ecm_rootsG: storing d1*507*X = 1229647561602157723876539870 in G[508]
ecm_rootsG: storing d1*508*X = 763328955682599615358203908 in G[509]
ecm_rootsG: storing d1*509*X = 880513186555522312267166134 in G[510]
ecm_rootsG: storing d1*510*X = 28673408654292395707189457 in G[511]
ecm_rootsG: storing d1*511*X = 1013730464213524379048206759 in G[512]
Computing roots of G took 12ms, 2898 muls and 42 extgcds
g_0 = 1460872497814131027522942228
g_1 = 411122612785131077760336782
g_2 = 1604124952323803071973490813
g_3 = 1909699108020327689889181246
g_4 = 748323743452439248320377610
g_5 = 1979117394792816577748686168
g_6 = 1752265579097339459935574056
g_7 = 1761689290308441566706246024
g_8 = 1156569869504867352167621421
g_9 = 1743040650428364813737785523
g_10 = 1598572927410725676010058149
g_11 = 136303274823540553959865509
g_12 = 136303274823540553959865509
g_13 = 1598572927410725676010058149
g_14 = 1743040650428364813737785523
g_15 = 1156569869504867352167621421
g_16 = 1761689290308441566706246024
g_17 = 1752265579097339459935574056
g_18 = 1979117394792816577748686168
g_19 = 748323743452439248320377610
g_20 = 1909699108020327689889181246
g_21 = 1604124952323803071973490813
g_22 = 411122612785131077760336782
g_23 = 1460872497814131027522942228
g_24 = 1629623956762772349158989213
g_25 = 1411959662670183284148897530
g_26 = 259545138983581463100464588
g_27 = 1181753103914577136376663315
g_28 = 1855134929377480637547590180
g_29 = 739400419092651548593287775
g_30 = 656965566508043281521747114
g_31 = 606637447974203521553722374
g_32 = 1608293900295364192182618622
g_33 = 1704690504305770227537320613
g_34 = 237558926340646890293721095
g_35 = 1398787754481620343751806105
g_36 = 1244134653311820863915061078
g_37 = 476375099056973691898367312
g_38 = 1831934883659898941548026559
g_39 = 314869848355530505227359889
g_40 = 868838802701766802695123205
g_41 = 414825577993933351804798471
g_42 = 113404719018838971462634525
g_43 = 1734398373045977908911219732
g_44 = 2009326779601798027854321756
g_45 = 1266645493769479933522363200
g_46 = 300872053296446345224353177
g_47 = 1018047803683851546074513062
g_48 = 1276827558966532804761501889
g_49 = 339044920616448049070424378
g_50 = 377359037150855985783683437
g_51 = 1866091971650675127282860645
g_52 = 891126948579847756805014241
g_53 = 1417356968234362196167623553
g_54 = 1903072136376945419293467717
g_55 = 1556671628100236493442981274
g_56 = 1454342367789398247131255788
g_57 = 1065255247128375159679543564
g_58 = 833387702688587309240296289
g_59 = 551684843230351896199026795
g_60 = 761091966980474520365029805
g_61 = 1383359718029034122847149920
g_62 = 449025175233839217702174547
g_63 = 392595758587063409344857233
g_64 = 690099555990453489010798048
g_65 = 1110401824163885066477318260
g_66 = 710560209031611308694171558
g_67 = 1335190257380187933274039274
g_68 = 809097095650435592403180540
g_69 = 1769776741515610683883607649
g_70 = 115955361382858019387409703
g_71 = 701337938326944340264579303
g_72 = 4581035738914436395861253
g_73 = 6852081140867555079739777
g_74 = 214069769913656628838267329
g_75 = 1092095307989453379673226711
g_76 = 1722501430738070689308365421
g_77 = 1291690358165757864542569300
g_78 = 724577566117368593966814127
g_79 = 924573540397838132364516462
g_80 = 704256848681703561869012675
g_81 = 70228866311999601000902055
g_82 = 1898753358004490627626100605
g_83 = 1470916791009351542008845991
g_84 = 1367421300968223997607034069
g_85 = 127250029317401311227760036
g_86 = 892261022893237685790137685
g_87 = 859400218389328541430451718
g_88 = 544671958383842103448437253
g_89 = 727607981250517596607712317
g_90 = 905632240784663996880164858
g_91 = 392540855268809631581446457
g_92 = 915578238424269511965026918
g_93 = 1913658908451956563115351478
g_94 = 1085698435776081260229459681
g_95 = 138539326486441309379611676
g_96 = 1989886088544932119051917333
g_97 = 1331598979080672158608555914
g_98 = 1038621800634576089365993518
g_99 = 430648882847424689275008142
g_100 = 751553757357461494252439208
g_101 = 1313502420769188038053373183
g_102 = 719158240649499276346359981
g_103 = 1930135219942927349684553900
g_104 = 461790066341344164796363756
g_105 = 994750460872204119520572245
g_106 = 452285474444454838575166064
g_107 = 161747319400948467551230044
g_108 = 1889473209679622863547501493
g_109 = 243399785144837253611740185
g_110 = 1028236252842047863621028868
g_111 = 819242132588677193677341713
g_112 = 1034996438199228346207850390
g_113 = 1191180528337544437306021667
g_114 = 17870146608754919788690934
g_115 = 282716582603630193809961019
g_116 = 956000955252787432056029600
g_117 = 1702969027918851727046058240
g_118 = 2027298860687872484884506738
g_119 = 1392231516305908268426119999
g_120 = 467947005858798663700376060
g_121 = 1241118531721604263561387752
g_122 = 1795370517736507903726070645
g_123 = 1690196008381672100180453110
g_124 = 954037286610612803838020796
g_125 = 1831950900555958052403826854
g_126 = 270429847227491050170975900
g_127 = 128923940545259136302405399
g_128 = 1431701688939435160901042816
g_129 = 1773517518461612852211986256
g_130 = 1394536101434263934188372308
g_131 = 1415364099707810594920779863
g_132 = 1704298627048947099583022515
g_133 = 189854586736823042951150849
g_134 = 151431721694788043071978466
g_135 = 285901704098151254050967832
g_136 = 2031325011469283239468747395
g_137 = 658958087500951203369481957
g_138 = 816858967132970403309120851
g_139 = 140962768732866831931971857
g_140 = 1574632623858585192295327906
g_141 = 775737675326364601351838568
g_142 = 1790123903901003984823801966
g_143 = 1756001025779080149469272729
g_144 = 1160744764467555359219554928
g_145 = 725231531118295887638982913
g_146 = 553367350173938292662657116
g_147 = 644021678171981033432799661
g_148 = 32563331023839941305723655
g_149 = 1890050792124087878096448471
g_150 = 549207833529762502829198113
g_151 = 273506075671912861760894579
g_152 = 860380023846503870889536733
g_153 = 1010086033730553101508746534
g_154 = 1380278145799337201812892407
g_155 = 189455593569365979924512658
g_156 = 465405776244372623987270880
g_157 = 1226498655969905717014421361
g_158 = 998604267478452304425310285
g_159 = 1119845776677450827465546150
g_160 = 897746144446897751640953357
g_161 = 1268133695963829827088958354
g_162 = 1731380034544028454035475576
g_163 = 1700045968275465642468556793
g_164 = 941062759741227493669879623
g_165 = 292333399406728764573421560
g_166 = 1512084616034543611545905173
g_167 = 693018284647965650073033028
g_168 = 528603868799380382250623836
g_169 = 138632795216086637977498227
g_170 = 1859255319253211545969743202
g_171 = 1057243606049248878632830694
g_172 = 2017283101414497599743242256
g_173 = 295560554060095018897986078
g_174 = 1374724288386321032352895730
g_175 = 1248320826301008151253707876
g_176 = 1313270362186541425593318036
g_177 = 754226078045146048419222238
g_178 = 1130206276972300310785253105
g_179 = 1389808488880884682109330501
g_180 = 1173267800379739934870566328
g_181 = 1416499229467289470743807626
g_182 = 986402682823663193606561976
g_183 = 1016595574405817807894220821
g_184 = 1922515943266133465214188952
g_185 = 1850582500645150436093981540
g_186 = 1619930303280466623816272901
g_187 = 1326112435346289710169895034
g_188 = 1875690712295077425178979246
g_189 = 1624300072954471919062937529
g_190 = 1340985280051785746197633444
g_191 = 1287058174392721931096814946
g_192 = 1945666305632084982870985788
g_193 = 1229994029461231718416433202
g_194 = 291933564216822866604705377
g_195 = 68127446145881180713247424
g_196 = 726243594635575482140630347
g_197 = 1505979642118531331179651187
g_198 = 1768496192072862966571776897
g_199 = 241011391651070111951326151
g_200 = 1254246181023728483594685713
g_201 = 386228639992305496009315210
g_202 = 1194158334276295771116297365
g_203 = 286256235071045004812215326
g_204 = 171117623197517472328364494
g_205 = 13293006873570722464806690
g_206 = 292526054640446919113378304
g_207 = 1852429126833611846459880663
g_208 = 518770679492843243961777804
g_209 = 995431853080717642430478803
g_210 = 990127254930806058977895600
g_211 = 597906689629888678861408568
g_212 = 33841544469339635212404193
g_213 = 1033854837166924433467746772
g_214 = 1497739841531931070598236658
g_215 = 1009901360643329872518851478
g_216 = 891682322991039145834019865
g_217 = 1599431592227298771963480721
g_218 = 960359438954002908365244956
g_219 = 1951562711696172987336717923
g_220 = 1763514117025813526280369603
g_221 = 2017909992668874918531349204
g_222 = 754260101171637832995311743
g_223 = 1984114927346583763456832657
g_224 = 345235508474155494470090740
g_225 = 165363777729605800435271846
g_226 = 105420150483035766261381185
g_227 = 645673052639496238746741856
g_228 = 1090895233759974521538820804
g_229 = 858860873634422899210421979
g_230 = 499168739474172315366776745
g_231 = 1790278514818706101097372872
g_232 = 678720615195977638309144780
g_233 = 74205104012724209607518851
g_234 = 920886337122421918219473820
g_235 = 1122887495614748909054509434
g_236 = 1004217384911335536521774532
g_237 = 1880964575098137848155476580
g_238 = 1353247591134432341888249603
g_239 = 996101312094357141670196435
g_240 = 377644345808400522273348036
g_241 = 2006138369597347879191055800
g_242 = 1853080924897359369405368668
g_243 = 1565420252097981698886058293
g_244 = 2027152188180930755842496706
g_245 = 1267759876673768234346857545
g_246 = 985141946025836194754440828
g_247 = 116631599496738881873788455
g_248 = 891491259351175886219312054
g_249 = 436169393318670574803516586
g_250 = 187800985759954227671041115
g_251 = 803626379988274684097878182
g_252 = 263737715552732663497838206
g_253 = 1838722771759925846705747832
g_254 = 803549421714156072318739148
g_255 = 1641559886739802663607275325
g_256 = 1950842321203677893157749506
g_257 = 1217794348285645274554716468
g_258 = 1739782510555251202197304017
g_259 = 565112580228932369051877603
g_260 = 2040789290499517823020825849
g_261 = 2486208164537920639232665
g_262 = 36460325703052830329906300
g_263 = 253003921366268123855213443
g_264 = 1512157547762748208596626878
g_265 = 646674566281498346258904017
g_266 = 1213461076799889019284108047
g_267 = 118641684462025131306479589
g_268 = 776859989588003876271090735
g_269 = 297601986455889944020201734
g_270 = 76015594027674202198518752
g_271 = 258023293266614724723187007
g_272 = 179091915534330076045462728
g_273 = 1547980730530061731527631608
g_274 = 705958891239418100996929037
g_275 = 298240809046788120415063869
g_276 = 555706443138700231920153871
g_277 = 15382214641128387945973145
g_278 = 1872849374768934380329097668
g_279 = 1583446354328852112596899090
g_280 = 646468024857282703551308634
g_281 = 1324643956086087558671400769
g_282 = 1676860044989228867375015498
g_283 = 1329562647248410907133409585
g_284 = 1627171991506850085071380132
g_285 = 1986933894749333069389161887
g_286 = 310472168187953475742636568
g_287 = 463725669696371526983230593
g_288 = 2026179420657387546045641468
g_289 = 432550002704115229574888574
g_290 = 392818188167858014574938040
g_291 = 1927232650788873284765245155
g_292 = 896821781658335443716838333
g_293 = 1635135442578416915785849616
g_294 = 1353870654024908596086577623
g_295 = 299899264478811200513260642
g_296 = 1415632549829909836776337009
g_297 = 925508324458740975069920432
g_298 = 1888814473133789606609169147
g_299 = 1341395359516152480442702329
g_300 = 1827143219698084117207696163
g_301 = 500236796981793322860707768
g_302 = 247326118923445385514543405
g_303 = 996277845013495784640680688
g_304 = 1319118950901200179426335663
g_305 = 1400441623553249346332600931
g_306 = 613447328202977771998996079
g_307 = 193624753869622768065513278
g_308 = 654296368551211333855723731
g_309 = 153110774078889734322517024
g_310 = 1903794244107811888268138608
g_311 = 1276802648128301232205082581
g_312 = 1511000085230967953977882964
g_313 = 1075219496922674242744903490
g_314 = 549672842724660913628996508
g_315 = 1962894944614189915420530573
g_316 = 597811941690276222312297501
g_317 = 1763230640986457196045411917
g_318 = 1792118949099423974763263034
g_319 = 2035305089769134560541378670
g_320 = 673695601407121218547644716
g_321 = 198537178580075670114659563
g_322 = 1783311445616407796287331907
g_323 = 1564641073737803706968753445
g_324 = 1249699027394306782839096071
g_325 = 1290288695429805641282809828
g_326 = 1816086866046363788640368603
g_327 = 104384728387620007430629380
g_328 = 264008999332766602872644283
g_329 = 1804090952490650611241953210
g_330 = 438484399752640391027881078
g_331 = 1318354919766493211842848297
g_332 = 180311756653814143448872040
g_333 = 504549401810989208154001363
g_334 = 1879753320094379528096488041
g_335 = 1373614615884772309442771529
g_336 = 588565677691617142888157686
g_337 = 654184804488574359880549005
g_338 = 940140125478592119176181896
g_339 = 814053681477859537077952172
g_340 = 1935161956122113563767909464
g_341 = 1968999829384859095580181172
g_342 = 680106546357065075993584586
g_343 = 635591976655078451121331874
g_344 = 751350042438327465575046500
g_345 = 1543760187024872011879967409
g_346 = 690216265014138157104787361
g_347 = 787169926645210446105217973
g_348 = 1436663383134127525863009728
g_349 = 612069730005405424198458979
g_350 = 1603338292379441604765176611
g_351 = 310402314428416273355187023
g_352 = 1802167800670079521425671013
g_353 = 375501128246328025458449463
g_354 = 1864074209237461496830025144
g_355 = 1877034341785227895121857706
g_356 = 440284173896568713399277907
g_357 = 1548414101421619330355763757
g_358 = 1412544640300971625840621688
g_359 = 162293709147650187494235800
g_360 = 1747022856846699746950450668
g_361 = 252992635489620656962611275
g_362 = 1801210787286028365356163875
g_363 = 1968867464991865147260823580
g_364 = 602839300099953114461181806
g_365 = 1633588394252226274140413125
g_366 = 1103629444139187658076190257
g_367 = 462743738277779572519043026
g_368 = 994725118608455232748222120
g_369 = 1685426495516849358449589404
g_370 = 578435140184760872624316148
g_371 = 1729993064847789332552509469
g_372 = 159588668783706561431618924
g_373 = 479491777539317534936904449
g_374 = 615089381069666155909814363
g_375 = 1695653924400559653958302346
g_376 = 2023093997081194932476999653
g_377 = 144973467342636378836365198
g_378 = 1805064137261378588700753818
g_379 = 523385274368410048520820847
g_380 = 226196065799812514006799579
g_381 = 69614558165585689958861372
g_382 = 1330917135250592399991867819
g_383 = 1824881741615820328193927843
g_384 = 1684571123005321692267142305
g_385 = 273224503270685409250458358
g_386 = 244006711283436035194016823
g_387 = 1948632393533871099290960180
g_388 = 1220894385531055514228421942
g_389 = 400789941868523064742228116
g_390 = 1792024790414928042728220790
g_391 = 687878826345961874814295018
g_392 = 807488308396099389369814109
g_393 = 1485537530519307532126389927
g_394 = 780131383952725130756685867
g_395 = 1929641875719233708612340029
g_396 = 1890887099443808542293946770
g_397 = 1136549820992620822905913005
g_398 = 1378726761904117342859332324
g_399 = 422061478853615988961323130
g_400 = 275922270074883606426187218
g_401 = 594461651524415444991817068
g_402 = 1153876002918298116360688023
g_403 = 1907675184257293095301382147
g_404 = 1062263629510229528645106532
g_405 = 965865575360048893301451515
g_406 = 262027992180304944051424148
g_407 = 796864420649309218699833912
g_408 = 501978263449214537834080039
g_409 = 1748253659006482862383597264
g_410 = 1538768072483638409313376149
g_411 = 436139981388356231066130886
g_412 = 1513797475601127566219136629
g_413 = 948322483941565203396452159
g_414 = 1255735301473193851430677824
g_415 = 1340233203956852305712297732
g_416 = 779128082764346139865255175
g_417 = 195458914156234419489012905
g_418 = 378415161264919471710335448
g_419 = 116111325647630798768029323
g_420 = 464986704151490974418499562
g_421 = 1752963736728565825083745639
g_422 = 2026803204473594921703530655
g_423 = 1793793036689837466268120303
g_424 = 2028028832842322572948035021
g_425 = 954257127249085199124159968
g_426 = 163006486909017999023001449
g_427 = 288133612416972750140900012
g_428 = 964629701955735920883288574
g_429 = 1675595539393775575814196589
g_430 = 812683246107823891850883991
g_431 = 1326895357811797475987835511
g_432 = 951198852354324974831204707
g_433 = 1270909460168516151825813689
g_434 = 1087961380599584273807761224
g_435 = 964853513699847319867371361
g_436 = 1815875526753664573145784615
g_437 = 347551768196338443234391654
g_438 = 1549555256342804232921243150
g_439 = 828812825606270204897534710
g_440 = 1131159488494277714112936651
g_441 = 1024593303709685431033795948
g_442 = 1054753314862001738308442142
g_443 = 233344396936452760974119831
g_444 = 1123231566100556440019887885
g_445 = 726167626305956863268852715
g_446 = 574672543782878634398206712
g_447 = 1728700571521485146732318626
g_448 = 764388532787340848720356896
g_449 = 1966011930488942498589961922
g_450 = 1103845307956687951465175057
g_451 = 1204406328646793545449017430
g_452 = 1762233021954559544462367397
g_453 = 1234955718037394023953135835
g_454 = 1221191394898204535221502975
g_455 = 1825877475862833193093654805
g_456 = 1256987853776193524382215512
g_457 = 391657052132949613168289376
g_458 = 2041638455019055080913922917
g_459 = 1921905421703140345513712333
g_460 = 2040420007427298430193532978
g_461 = 1397722547504882230434571345
g_462 = 1088722730222974674186183578
g_463 = 1614831787270519290796101617
g_464 = 1621411416905472982078940646
g_465 = 1398852710143882235341384753
g_466 = 181855844182350506188126789
g_467 = 296868076145336371684832803
g_468 = 1991230122265730737305506289
g_469 = 821880369740914540173000544
g_470 = 947533960522808154373409813
g_471 = 285723673337647865764916877
g_472 = 1799438837371264954919750385
g_473 = 986119592439135716970658713
g_474 = 704267076012811443824357671
g_475 = 1725567083764689902874232244
g_476 = 662980362719516657056277124
g_477 = 1593402762821210247863576059
g_478 = 1224256179953060175388169464
g_479 = 953754351040594851112367405
g_480 = 628850577621153657097412553
g_481 = 2039219753681934459415597627
g_482 = 107540470236132956332828135
g_483 = 1851573799017630500316497150
g_484 = 39366774546585151929992831
g_485 = 537258939343682298111932154
g_486 = 366007665795358806459311138
g_487 = 633305747367455404066316963
g_488 = 1206888488907891877682130532
g_489 = 1372527488196491049004859707
g_490 = 36438873517171228027471949
g_491 = 267151672336042462313981295
g_492 = 240299910320833114871583549
g_493 = 2022142791408449119785102045
g_494 = 1367572385660936967235539547
g_495 = 955605753206148384813319675
g_496 = 1541522322944016696325443766
g_497 = 1406831342130659998367705881
g_498 = 144699422857091384787231131
g_499 = 836737133850644565813598580
g_500 = 1988210177857963970790268698
g_501 = 120327678300751341370048467
g_502 = 1077842031660142067666632661
g_503 = 1049433289190428905063065735
g_504 = 798801559910701724798955711
g_505 = 1538797861254452799895788275
g_506 = 807507048371217320694303948
g_507 = 1229647561602157723876539870
g_508 = 763328955682599615358203908
g_509 = 880513186555522312267166134
g_510 = 28673408654292395707189457
g_511 = 1013730464213524379048206759
G(x) = x^512 + (11165256968290140795322332 * x^0)+ (1285155903712216637241703198 * x^1)+ (564652476699843683501020318 * x^2)+ (747708596954065311009108037 * x^3)+ (1375151935404504458087203457 * x^4)+ (905930314517040092689917069 * x^5)+ (151106994091604266241063938 * x^6)+ (1846365713554228903570823382 * x^7)+ (492052303256866693049522030 * x^8)+ (335008581536158248969134810 * x^9)+ (421194557995620566637739150 * x^10)+ (1985266543514709724465758342 * x^11)+ (1535654501057125639217682646 * x^12)+ (1136106258807400244969018175 * x^13)+ (466493559324983633821336362 * x^14)+ (1620570991110337462188050862 * x^15)+ (978971515661536059594724066 * x^16)+ (304187833186562993601130542 * x^17)+ (485387577111007267909380970 * x^18)+ (831959418121986978616055838 * x^19)+ (1365334591606317979591636430 * x^20)+ (737581210900701471646435741 * x^21)+ (1595124961853082723004666077 * x^22)+ (1383268426506076102796627307 * x^23)+ (860775919444560428563831609 * x^24)+ (205923843358885262620388559 * x^25)+ (1136054498451457921021639965 * x^26)+ (843244793703354934822459917 * x^27)+ (180040816022519502583490207 * x^28)+ (1245350354338875495843910745 * x^29)+ (1123840170999832583313258011 * x^30)+ (1131215160341930497875976983 * x^31)+ (177100104128149531951947748 * x^32)+ (1084724877155606173428256075 * x^33)+ (1160415988359587894576937808 * x^34)+ (1526215674302874255781026372 * x^35)+ (1955454188663638234370140555 * x^36)+ (197290595241558862361793859 * x^37)+ (1243623236889240168142717527 * x^38)+ (1655214584826285330859296108 * x^39)+ (1532895289606532299014030770 * x^40)+ (220131765859326116849164009 * x^41)+ (463420777763784523950648570 * x^42)+ (602459244697173751541335496 * x^43)+ (1355985704287053530717682133 * x^44)+ (162279659181383389183641809 * x^45)+ (1912584988060839040541573171 * x^46)+ (668087529887108177982421384 * x^47)+ (403973249291287765807366213 * x^48)+ (348206774286761640358361856 * x^49)+ (482528396091212533086010003 * x^50)+ (1882258446050854331242755655 * x^51)+ (1241133899960578987064948226 * x^52)+ (844444092197131961806257961 * x^53)+ (171094885341666227483820862 * x^54)+ (804370832385341588560897978 * x^55)+ (437720559273212659770865516 * x^56)+ (44809315744207333723013235 * x^57)+ (1116923957477323260588954597 * x^58)+ (272810400497435075066501640 * x^59)+ (1189954421404555046475130363 * x^60)+ (1248670120851895960856160746 * x^61)+ (1253124145551183907870237498 * x^62)+ (842124041762535675706005362 * x^63)+ (2041404256295046271940284981 * x^64)+ (775717524614469682068321896 * x^65)+ (991428009211348783722666133 * x^66)+ (1321270778858740385926334971 * x^67)+ (121372924147365434562728667 * x^68)+ (578565153769395019238371353 * x^69)+ (423788963450397025331847329 * x^70)+ (750919739963651309109185191 * x^71)+ (2034352530752225985030702744 * x^72)+ (478825968926006553413028479 * x^73)+ (1418427035590531805232830476 * x^74)+ (1748522742852453356526254093 * x^75)+ (212385994997243311104667717 * x^76)+ (980093390216802186182005477 * x^77)+ (1441256768503257008347906422 * x^78)+ (1370889632683897164928188879 * x^79)+ (1049309904769003740070194642 * x^80)+ (1661346318167574971070264153 * x^81)+ (1687194843806498475891076444 * x^82)+ (1718423394945503596799768572 * x^83)+ (271243124327355767385893106 * x^84)+ (286442402785947802330342527 * x^85)+ (1740671240977158290256592607 * x^86)+ (938969988804835426196036576 * x^87)+ (474031544579584228493694079 * x^88)+ (599271861363683065570413074 * x^89)+ (2013488101067808965610660881 * x^90)+ (652969419316771600981205697 * x^91)+ (1426225239839068271982648862 * x^92)+ (1655873282520231063438637472 * x^93)+ (1004312037063868873747147318 * x^94)+ (1427836049935167693323619312 * x^95)+ (1539070511007800041827207229 * x^96)+ (2031093045079509269499011571 * x^97)+ (1705744393681735339170415819 * x^98)+ (674190994244530561044355678 * x^99)+ (1212542053126968321957548972 * x^100)+ (1973127550512233370713402661 * x^101)+ (765279895742776664008163156 * x^102)+ (1001342221157024898695008420 * x^103)+ (1211670582530053214024643386 * x^104)+ (1487944612082631887534420171 * x^105)+ (1070469709169645799352348711 * x^106)+ (1936790316828131516273541429 * x^107)+ (858232493279831855075217589 * x^108)+ (1947863363658886518315587322 * x^109)+ (90628664823399036118219346 * x^110)+ (101461696995915674711111422 * x^111)+ (1085664878084372484599694341 * x^112)+ (1747647645520190172008278783 * x^113)+ (736301177488240617090240584 * x^114)+ (1151151539304798856858219340 * x^115)+ (107572455906423970595257456 * x^116)+ (409891265156846957013736539 * x^117)+ (1815863667804809606303213130 * x^118)+ (1816659344231510359742142557 * x^119)+ (1929502807714641956576192926 * x^120)+ (654434018374950057327527291 * x^121)+ (224416263323710150765918474 * x^122)+ (310442707139927372005648957 * x^123)+ (1626658722546879243914335306 * x^124)+ (680261836631255418968756429 * x^125)+ (698338128459438099260646384 * x^126)+ (1784242990128758911912358624 * x^127)+ (1516194406371480370233582244 * x^128)+ (1859139484456744889176464959 * x^129)+ (723343954980131280300667635 * x^130)+ (783574796216004964321992166 * x^131)+ (257519528117286338195642847 * x^132)+ (1084233794877788488296640514 * x^133)+ (1633660473157620802955578188 * x^134)+ (52738934859439688710089719 * x^135)+ (757355283779434643883185906 * x^136)+ (2035498282685961369141942918 * x^137)+ (1134923326242213631089423821 * x^138)+ (758478691973214906814765840 * x^139)+ (474683298355648227544378875 * x^140)+ (464454818874617487772846689 * x^141)+ (31942091980064801210105645 * x^142)+ (756209597302248202559713197 * x^143)+ (1489484693256641403105313578 * x^144)+ (1253099835168254547756161237 * x^145)+ (2047735572457579759400677444 * x^146)+ (1522794217611489000344313500 * x^147)+ (438344124725324684483329002 * x^148)+ (559716176448034053580365521 * x^149)+ (1517084274997293805548473897 * x^150)+ (778166456885444665193507946 * x^151)+ (622495330270920256749881418 * x^152)+ (88472815878899645204862608 * x^153)+ (1634452615265199178481511878 * x^154)+ (1970557511745870429426352351 * x^155)+ (1085915707449215845382742171 * x^156)+ (1832572589435091986140919339 * x^157)+ (924196884726283007225118307 * x^158)+ (1316237214575767475758077692 * x^159)+ (800873837359681686366532126 * x^160)+ (1273988539157000508868591249 * x^161)+ (1583151376799387164384718123 * x^162)+ (1606882263765541567422835432 * x^163)+ (719744908920179802203702710 * x^164)+ (1540965087924782783306526958 * x^165)+ (1271352484886304387661008660 * x^166)+ (1701413103489623111847603153 * x^167)+ (108399156239754258600097355 * x^168)+ (1265292770690902709792616265 * x^169)+ (1926043360595660785677290401 * x^170)+ (1952469772359667549405626930 * x^171)+ (631890683259788569925740905 * x^172)+ (1437206492650940800704639465 * x^173)+ (1658757021374360200881411454 * x^174)+ (983049548901861486503539811 * x^175)+ (93275665561508002608664480 * x^176)+ (473584414607042894205605379 * x^177)+ (116397105908621032111090282 * x^178)+ (1885857240582050611972542246 * x^179)+ (365808677261269204886787390 * x^180)+ (1007977924452938269814802156 * x^181)+ (914527028070459634202228592 * x^182)+ (585039313299506962028658588 * x^183)+ (1564021108179253510722616337 * x^184)+ (1896387872659324466923166029 * x^185)+ (1097208201082124163856481455 * x^186)+ (1184074132608618137696837506 * x^187)+ (1219834112376632278831764914 * x^188)+ (233141960442798758146088842 * x^189)+ (1681235970038324754886667068 * x^190)+ (642282764447759128038538809 * x^191)+ (1635006980851519671850979293 * x^192)+ (1616501681984590745459305165 * x^193)+ (1154629154105002115645363770 * x^194)+ (829696348135208515878201945 * x^195)+ (1250369124295153391288832353 * x^196)+ (1334830042548263006825377479 * x^197)+ (1271114961359941553784025863 * x^198)+ (274733929270622146226083624 * x^199)+ (1033809758811533062567770853 * x^200)+ (426610413846048419276842321 * x^201)+ (610309758364505987764906996 * x^202)+ (1992294195465261883908723159 * x^203)+ (828562153998167465639747595 * x^204)+ (608660686034011259248622698 * x^205)+ (1335930179474853148352316345 * x^206)+ (936203936922894824360000316 * x^207)+ (579587498341698142196243371 * x^208)+ (1948642821146796947121497701 * x^209)+ (981094928049648588308066079 * x^210)+ (1234845841896631893159064147 * x^211)+ (48323849191983307071963639 * x^212)+ (1447076101275145834824478821 * x^213)+ (214798890137972401819154274 * x^214)+ (852398619581876896232777092 * x^215)+ (1425345123793238662453940245 * x^216)+ (356178751741561138528631816 * x^217)+ (1312644582351843883427601614 * x^218)+ (1590526536248513626681247380 * x^219)+ (1337564255925637304447371415 * x^220)+ (264175922501258125894433217 * x^221)+ (1266986959344133951681994308 * x^222)+ (1727025965178047497625877273 * x^223)+ (449203639429091711145591219 * x^224)+ (1654999005979122233844079533 * x^225)+ (871850508189782705629277860 * x^226)+ (990036977119097606708931551 * x^227)+ (1413014721664472412464636237 * x^228)+ (1825408093400339305913189972 * x^229)+ (77291249883806919167356616 * x^230)+ (470392229387924894601475418 * x^231)+ (199698969699661705393237795 * x^232)+ (1108286310314954943569266035 * x^233)+ (1917546149111373978209079871 * x^234)+ (1723762430108790192081684423 * x^235)+ (1745503179697064986008137774 * x^236)+ (1734272522022397762068927419 * x^237)+ (677327520654215452303535832 * x^238)+ (502793785861980388976198052 * x^239)+ (868952983917813698803136839 * x^240)+ (705086923594309563733658143 * x^241)+ (1948410693762997510062546827 * x^242)+ (1417830181710992122834325298 * x^243)+ (398790280455093647555994266 * x^244)+ (1478568273718566198275255583 * x^245)+ (1585123997131798642337028834 * x^246)+ (69351995950885256637849370 * x^247)+ (842250436239750594943940971 * x^248)+ (1145936405704189181590460868 * x^249)+ (1966810250021981327232603876 * x^250)+ (1930145464454751379291521124 * x^251)+ (1378728871728409196373382000 * x^252)+ (491473535614607364903073964 * x^253)+ (742769608994925085948668452 * x^254)+ (1542346355782201897672714951 * x^255)+ (94505853807214081955740759 * x^256)+ (1438230737092343729442093182 * x^257)+ (1636617889507779431278178950 * x^258)+ (1340635451372223368268593236 * x^259)+ (1874629399570692782891572000 * x^260)+ (802612881416228667901633468 * x^261)+ (1736500577842836381908937813 * x^262)+ (749722345284750513427420079 * x^263)+ (1379774925380717235134430195 * x^264)+ (870751877343626054539084117 * x^265)+ (1314764589517012937588096343 * x^266)+ (219518721739398465806138900 * x^267)+ (902613436831851721965501698 * x^268)+ (524131658067682377995450223 * x^269)+ (1526862060960406530333482129 * x^270)+ (511107885087524503970959885 * x^271)+ (579397034955780008925362359 * x^272)+ (179733793319960761983954062 * x^273)+ (1348676197220810694834131239 * x^274)+ (783597063951518941702189733 * x^275)+ (284241558912850667573149625 * x^276)+ (1164952583948991037922938759 * x^277)+ (907713080606902890179789712 * x^278)+ (1219299346462999296573495566 * x^279)+ (1200346141997483993694091716 * x^280)+ (1524570708624173212919859836 * x^281)+ (1872151746756058799673078832 * x^282)+ (564930395896227947074927546 * x^283)+ (413385194625819308061245111 * x^284)+ (1425956310580066584391447757 * x^285)+ (986313198018750796902352449 * x^286)+ (1199291437984747507505950106 * x^287)+ (620999324993136851437074183 * x^288)+ (147788231457202836292201882 * x^289)+ (1444812212428577697865707201 * x^290)+ (2018887171701572970221277045 * x^291)+ (1796056451133035906740465757 * x^292)+ (195963149357346518179873433 * x^293)+ (1845411168765329296873735424 * x^294)+ (601731478803097815274789389 * x^295)+ (1857046704298970607201170892 * x^296)+ (54411161825972242819832864 * x^297)+ (151323263115322325220991203 * x^298)+ (1719927049511313402635859261 * x^299)+ (534010420570839745364210670 * x^300)+ (276655138971800118527335685 * x^301)+ (666653799344534190833265976 * x^302)+ (275160596289551327341483312 * x^303)+ (474368675054846380291690153 * x^304)+ (249754609705292260151844148 * x^305)+ (715736956976399938701261559 * x^306)+ (1965965421119696177358667276 * x^307)+ (624504579422702904476212252 * x^308)+ (104066866961807394444072258 * x^309)+ (671238482459383576987185750 * x^310)+ (79175621595182197645483218 * x^311)+ (1162500109681898653620318039 * x^312)+ (1975295851281455499553841979 * x^313)+ (1673243251546653871462023155 * x^314)+ (376899509136749319222757922 * x^315)+ (643942454617813019256762727 * x^316)+ (1933018916584350541278640960 * x^317)+ (976834729468588762799165718 * x^318)+ (1548053291405175084012555317 * x^319)+ (1804581238461568414315880257 * x^320)+ (1244048906950085102408076136 * x^321)+ (1762911595507823017231137936 * x^322)+ (1165797624382433846173189865 * x^323)+ (934819591892317214868395768 * x^324)+ (1946314728611063910155084164 * x^325)+ (574694801430452206866465214 * x^326)+ (286750856770547319209162844 * x^327)+ (1520078237955697605960159445 * x^328)+ (605039580126076540042488437 * x^329)+ (43433412437782201789846282 * x^330)+ (1727145878089478211597973288 * x^331)+ (567664608527244680789291773 * x^332)+ (1193306136767689648294573146 * x^333)+ (1635939595168569728278259783 * x^334)+ (1283846800968203277139481826 * x^335)+ (1958114723808228895784376835 * x^336)+ (1630859441650204560488355445 * x^337)+ (1073802210841281696673890425 * x^338)+ (1762819368474409182306648606 * x^339)+ (731580473749247865284532496 * x^340)+ (338872091691778272503210150 * x^341)+ (1001585665154557014521356255 * x^342)+ (1051238495663423099711581627 * x^343)+ (703141034554821548210932184 * x^344)+ (1781700396395683337144410076 * x^345)+ (295360178053292559527252640 * x^346)+ (84628993614408208342989524 * x^347)+ (1718566643042569453150954249 * x^348)+ (1987049596189891083464557754 * x^349)+ (558021027688187523173215345 * x^350)+ (292676422444411557313652774 * x^351)+ (1217762299855151914329199160 * x^352)+ (210493485849414983148788225 * x^353)+ (949178381347022844364679120 * x^354)+ (126409732612130492576003513 * x^355)+ (731685598654682227560706597 * x^356)+ (395668584271083945346927912 * x^357)+ (1998970743212028287996381486 * x^358)+ (1880399779674990678192498000 * x^359)+ (24309066936798223264114432 * x^360)+ (1830137351363125457693148294 * x^361)+ (1410904203838545199416494490 * x^362)+ (1233796636928302911630424815 * x^363)+ (1460988388398504259724595388 * x^364)+ (1527129745351516568438301791 * x^365)+ (1266524583735108115063752683 * x^366)+ (1767444464406839318486029025 * x^367)+ (927324163182718864580019620 * x^368)+ (1110865545026113260028251579 * x^369)+ (22172419348655399898214783 * x^370)+ (1217791417896125140056912057 * x^371)+ (1476751979958900060267780892 * x^372)+ (705599327480768670804806752 * x^373)+ (1324589204165417775941000716 * x^374)+ (1667975345232279170431451402 * x^375)+ (1204233109874242065675319496 * x^376)+ (1614721448610031671807495040 * x^377)+ (1250250029476532675165175436 * x^378)+ (1973022568927597626929756903 * x^379)+ (547235197835750114921261419 * x^380)+ (1666682931495906595653089239 * x^381)+ (902982897212818099417693823 * x^382)+ (1008474311931889882343773246 * x^383)+ (1845911653438141422045687760 * x^384)+ (1659829594358705557185250868 * x^385)+ (1777587218720436156488339602 * x^386)+ (1262625396643351158584593025 * x^387)+ (379108528896698556927273558 * x^388)+ (256322747775284781975452454 * x^389)+ (340088252818668721450057463 * x^390)+ (482721190579381425662455401 * x^391)+ (42970543483606145625327851 * x^392)+ (672076155340809350629414604 * x^393)+ (1192559286899560230345646975 * x^394)+ (430675345164806158207844880 * x^395)+ (672911055376547033825349100 * x^396)+ (151856809531154330386200013 * x^397)+ (1847671272832922980703129131 * x^398)+ (259249270585369112176685590 * x^399)+ (1241300374882686600320197884 * x^400)+ (842730326298090049951753346 * x^401)+ (1590447166878902641332293971 * x^402)+ (327751094923942080168460369 * x^403)+ (764244582257146947268587633 * x^404)+ (1796332071087678833475649476 * x^405)+ (1283583864000447286472136651 * x^406)+ (278018896485566830400599873 * x^407)+ (1380530291133443327905102229 * x^408)+ (1408217689507542364941971859 * x^409)+ (1480133305231767845124480237 * x^410)+ (96766933665322986087781032 * x^411)+ (560561615360443385652783266 * x^412)+ (1102453927018347730948143884 * x^413)+ (297992194520091711370897108 * x^414)+ (460243820744420400241419539 * x^415)+ (287183310040341752434102458 * x^416)+ (1514875356332427979291932475 * x^417)+ (9881110782989153768521635 * x^418)+ (673252089665868363163249190 * x^419)+ (1215100897160432871329466733 * x^420)+ (452830683727192716625835890 * x^421)+ (904586787871093655596126575 * x^422)+ (1706837028906563648892259687 * x^423)+ (7969526166371653113327912 * x^424)+ (1358307818230881194813963358 * x^425)+ (560688236805908090745312480 * x^426)+ (728892067391152018841032247 * x^427)+ (854233115520038036350903771 * x^428)+ (586531059333735871805467370 * x^429)+ (2016753279648149598881748475 * x^430)+ (1654886266592541644319611034 * x^431)+ (592396155159579484102341634 * x^432)+ (1806411931961161714430917759 * x^433)+ (1728199113966455463941068732 * x^434)+ (552683413369784213012698217 * x^435)+ (1141810700483006290232260454 * x^436)+ (562126471508390838449457551 * x^437)+ (814992921476812489536554670 * x^438)+ (616093718091257955311389735 * x^439)+ (419723658709992726452108990 * x^440)+ (1801266589668740484812581517 * x^441)+ (1101564755775582965756402973 * x^442)+ (1113757313812610707423403752 * x^443)+ (1594493967934579982765240825 * x^444)+ (2020534440111143006814369727 * x^445)+ (996697378656360022248782454 * x^446)+ (1195494330739260541854007860 * x^447)+ (464267234759520249537976427 * x^448)+ (1886429158113424812987609157 * x^449)+ (1868777212173921281006981 * x^450)+ (1952341475730178095453372830 * x^451)+ (41997047692071977617793881 * x^452)+ (1525454598487897895123592132 * x^453)+ (873344248963122835685882070 * x^454)+ (1279169315971685587120005519 * x^455)+ (1166308794899412125733409019 * x^456)+ (535919934367757284743388716 * x^457)+ (746263198790126301425829843 * x^458)+ (1457042226329094157364949012 * x^459)+ (1639302704329495764485386948 * x^460)+ (894326523002976214437993075 * x^461)+ (325493625510410625252020772 * x^462)+ (1409936455124383724570607459 * x^463)+ (394592263770288173527364488 * x^464)+ (1130487843556318113601577144 * x^465)+ (714084022415597474938951893 * x^466)+ (225987811693771935249272303 * x^467)+ (1025464006958100521202610518 * x^468)+ (859100684002910867182049593 * x^469)+ (1756787695924646140403499318 * x^470)+ (913620559166881413349987727 * x^471)+ (940959901294404115703353833 * x^472)+ (1378637690673670654059160471 * x^473)+ (1967508163285980735956758065 * x^474)+ (1098744997208665884211427696 * x^475)+ (87216949423128965893878838 * x^476)+ (1888368402412423938045251670 * x^477)+ (1794948860250931454984493599 * x^478)+ (1779139066812285828941136963 * x^479)+ (4006741172179060352253795 * x^480)+ (459415949243507930997792701 * x^481)+ (1894190127481525878453046400 * x^482)+ (1000292609013216623412875311 * x^483)+ (451924535759881953004961346 * x^484)+ (1087045279134028145902339503 * x^485)+ (331342421023049037952668288 * x^486)+ (1631455725241851907968501275 * x^487)+ (1887110903959797585752150358 * x^488)+ (1433337050716875781673308571 * x^489)+ (546918616359845817177388238 * x^490)+ (173462678045567659379595946 * x^491)+ (1180355223050173368855117917 * x^492)+ (156283595825613361629715060 * x^493)+ (1953025480417879113802363912 * x^494)+ (1012831103503636589851036123 * x^495)+ (627195913051390449208500732 * x^496)+ (672484338354429351573853932 * x^497)+ (1448503655477661379420718054 * x^498)+ (853210578165456968701800548 * x^499)+ (1303575144598418963796966084 * x^500)+ (1583224044144804611573686405 * x^501)+ (757845078310237327945772249 * x^502)+ (1508974095330064195283863306 * x^503)+ (273076743703547205478942670 * x^504)+ (1715579396988463004912238218 * x^505)+ (388725452757186297619476808 * x^506)+ (2035601594522950688682402487 * x^507)+ (312060882591282179994885255 * x^508)+ (1161299627704643261080520968 * x^509)+ (595732334910323581547837129 * x^510)+ (42709184972733996024644825 * x^511)
Building G from its roots took 16ms
G(x_0) = 147852203381780227453080320
G(x_1) = 467602376031785423756778386
G(x_2) = 1419080610991809869774967018
G(x_3) = 1890281967216757982939076761
G(x_4) = 504275947850133294112312397
G(x_5) = 1777693012335610338128613382
G(x_6) = 913852801459105215791304498
G(x_7) = 345515266028159819743004340
G(x_8) = 205437536321955002748510591
G(x_9) = 1930477556585005553027219919
G(x_10) = 1120632219948655461892983508
G(x_11) = 1018471210117015460160817567
G(x_12) = 2001091623358291450158816281
G(x_13) = 1110459669867272855773934560
G(x_14) = 266789752887597840932914956
G(x_15) = 1298205876158800320036022124
G(x_16) = 104395397868823939395829032
G(x_17) = 203860737324041210525023599
G(x_18) = 154225754982592338995055255
G(x_19) = 738291546532405863846161160
G(x_20) = 1590164615588381568219118167
G(x_21) = 514292516754438485143133291
G(x_22) = 1889062782465752188773528987
G(x_23) = 2036638750146025363344631490
G(x_24) = 1712241412771917925628425565
G(x_25) = 367097757497373258339082723
G(x_26) = 1865806034895547611154105443
G(x_27) = 478712924108510500060942858
G(x_28) = 84961868469519568357504224
G(x_29) = 648160626213006592937788849
G(x_30) = 889721944662225925473574862
G(x_31) = 904643858747202428682610773
G(x_32) = 1134129914211077058444735045
G(x_33) = 1609779811560264264291903012
G(x_34) = 1704278033838402905540899653
G(x_35) = 303244147629330461017509588
G(x_36) = 273415164649933027952153973
G(x_37) = 1155573625644795487217104611
G(x_38) = 690921712568068204008832037
G(x_39) = 2025589712517153732180441104
G(x_40) = 2013676327983739936984385579
G(x_41) = 1590202915767794480717959754
G(x_42) = 302785924773348446039200281
G(x_43) = 46478967146555781376391521
G(x_44) = 1926017159614278018170138499
G(x_45) = 212049787919757591362599324
G(x_46) = 1226529045973434779616515755
G(x_47) = 737510074255070089450745301
G(x_48) = 445384882905950680827996495
G(x_49) = 501095288840637976677263511
G(x_50) = 1490845796011375364499445629
G(x_51) = 1043780196336773450889499253
G(x_52) = 807838868039740259034056606
G(x_53) = 894796564820734342338338947
G(x_54) = 1060723520257284625368848409
G(x_55) = 1650988372237316139517864016
G(x_56) = 237166686674572358840787127
G(x_57) = 513542368923208037489927619
G(x_58) = 1470451448706613073142990187
G(x_59) = 1824241307203493601551826865
G(x_60) = 1767368105896773205587508403
G(x_61) = 1875620355240145401361945559
G(x_62) = 384285917482643881945469145
G(x_63) = 567554378103849926479900060
G(x_64) = 1486699658426179880675420947
G(x_65) = 1777296347857958896723234627
G(x_66) = 1027162091090953102411045837
G(x_67) = 1965117219819252703675001864
G(x_68) = 673638427295960431549155659
G(x_69) = 545656059790803638058650360
G(x_70) = 24138265443901794998300764
G(x_71) = 184072694241267617319808949
G(x_72) = 1103182319006122100917566511
G(x_73) = 1206410654095503812527345593
G(x_74) = 1488929889476132135334010322
G(x_75) = 251491771538109551069871853
G(x_76) = 206590410856741288558945046
G(x_77) = 659643226996635192427256043
G(x_78) = 1309644726519501988313706319
G(x_79) = 425526492684579341766800154
G(x_80) = 1204921486144115684041019075
G(x_81) = 639074007652161141788955683
G(x_82) = 2033407298639982216563944063
G(x_83) = 529503391040530807550938081
G(x_84) = 1062595521616939406104311597
G(x_85) = 995410684651288909294657594
G(x_86) = 561420379186955184797994752
G(x_87) = 806691397761339981025967267
G(x_88) = 1067952534323274807204855089
G(x_89) = 123466400301146619616982453
G(x_90) = 1636432194209517777222284736
G(x_91) = 1080161795762012106371819579
G(x_92) = 296286734533019091718230105
G(x_93) = 1708223999251420081935438866
G(x_94) = 342450265822812241465519940
G(x_95) = 41633785847038853764358449
G(x_96) = 1768270972872130823027510439
G(x_97) = 61212443076997464838296425
G(x_98) = 174934373440371839079811665
G(x_99) = 1515112067531755256536084602
G(x_100) = 1721654401118841669950867956
G(x_101) = 895818523470105640607509199
G(x_102) = 485650587125062897409578462
G(x_103) = 700963372053784962667443090
G(x_104) = 1580589779978076562775624110
G(x_105) = 1852461706948067613606725667
G(x_106) = 1571798423423420816639092758
G(x_107) = 1844219161003005471555657965
G(x_108) = 200125085714794139981163421
G(x_109) = 1924010702842701928274308942
G(x_110) = 1257715004665943400932944490
G(x_111) = 1958708402721802531680801485
G(x_112) = 45572584994702857353821017
G(x_113) = 1381752906968273702319343209
G(x_114) = 687636671773829839286015282
G(x_115) = 1769002869983305710564442950
G(x_116) = 698964659434238064952289437
G(x_117) = 941015651817876084902960214
G(x_118) = 1586640224617997008834785214
G(x_119) = 521225139201235816166573547
G(x_120) = 20130108823893833549260838
G(x_121) = 719606735106624619185306460
G(x_122) = 176534454506324673397272454
G(x_123) = 930506425736092727020717401
G(x_124) = 1875142860103036132045108239
G(x_125) = 1474853033477229730936145783
G(x_126) = 72027410234821630670427000
G(x_127) = 302736383993357632016868762
G(x_128) = 2592877818344055426140654
G(x_129) = 1045175687922787628837924069
G(x_130) = 593683215246362708827232703
G(x_131) = 1171404546794300551213748684
G(x_132) = 780989269826124219945992571
G(x_133) = 38785164688096073903948678
G(x_134) = 547405263608918503936982670
G(x_135) = 1107476840873753383451554845
G(x_136) = 1902541789895532252180011340
G(x_137) = 1988535746986717925895172049
G(x_138) = 993124261473345992598509698
G(x_139) = 1864271397026357682834013777
G(x_140) = 60415613802297742858169449
G(x_141) = 1996269353324494987004508028
G(x_142) = 747082601555950819189623536
G(x_143) = 1100326062399788020283483821
G(x_144) = 1458994884037904353845455685
G(x_145) = 421763894442512043856881824
G(x_146) = 558914602414955454237908436
G(x_147) = 229755473024963157752711537
G(x_148) = 1826821526202472881792325999
G(x_149) = 1734301755758597699723491320
G(x_150) = 388933651657081866326021199
G(x_151) = 541309616246460193653477112
G(x_152) = 157077978677117170213622765
G(x_153) = 1455248978084410814071262433
G(x_154) = 27459699534501840358419660
G(x_155) = 931386535113086039582248236
G(x_156) = 705050490950102808512707241
G(x_157) = 1078524291134429333124708458
G(x_158) = 183992757026271186333599384
G(x_159) = 1432508154423948306173394644
G(x_160) = 1513956733549768005785200205
G(x_161) = 589434875694180401572516391
G(x_162) = 557932501702379688701345979
G(x_163) = 1877393512093997794934690757
G(x_164) = 2030118227334789523651456580
G(x_165) = 963836114985503626453624981
G(x_166) = 1711458210113348987620716267
G(x_167) = 392342234201679443113603357
G(x_168) = 1701023051711403628016385581
G(x_169) = 758040071169788825841295594
G(x_170) = 129492156404959012608630936
G(x_171) = 181575080511150999698603535
G(x_172) = 1005621846448873180571639305
G(x_173) = 682596539550171639830324098
G(x_174) = 740867715217618334133688812
G(x_175) = 379142689722142475387539212
G(x_176) = 1137736923823886902400406024
G(x_177) = 1429084870083095724961230737
G(x_178) = 503980863603000320813301061
G(x_179) = 457326676195779185169891932
G(x_180) = 1085086488862496868648494039
G(x_181) = 1596992034570933707669217352
G(x_182) = 1729902237318335948808868930
G(x_183) = 633168807046678078615056902
G(x_184) = 725888007402781432816244248
G(x_185) = 901588875224505873008673025
G(x_186) = 1281418431778902796361517757
G(x_187) = 2031543498618818222165893043
G(x_188) = 1013057793820967942534472523
G(x_189) = 195720174414931103202444079
G(x_190) = 915529330339809145999475446
G(x_191) = 570452393142130182529435136
G(x_192) = 892369433166240357004089854
G(x_193) = 274666687488840159369168657
G(x_194) = 302549784118086789001694841
G(x_195) = 519697660182505611667267653
G(x_196) = 43782480624195578786376879
G(x_197) = 1116078857065512108801371867
G(x_198) = 147503110047514230802237335
G(x_199) = 1250119301742486718743731909
G(x_200) = 1805134323726532111763165991
G(x_201) = 450884658961929335376519263
G(x_202) = 973905940450531796194656843
G(x_203) = 1822703638818995019559373795
G(x_204) = 465661703701807418348556690
G(x_205) = 1068646097311284823276309489
G(x_206) = 1154022268613157789527785269
G(x_207) = 766743481446261802245975677
G(x_208) = 1860931088759973075418276020
G(x_209) = 187915102087156666934774270
G(x_210) = 915097531672590102881634604
G(x_211) = 1501106896715815623636278076
G(x_212) = 421387294366259061420090584
G(x_213) = 1812945432409673566315187345
G(x_214) = 1666919310013726772109194570
G(x_215) = 51007615405083206496899420
G(x_216) = 1652339236059615228160674934
G(x_217) = 500349359444175062666415682
G(x_218) = 1163760334217306145224442896
G(x_219) = 1840391287750392672355401316
G(x_220) = 766878596802996389162814249
G(x_221) = 389999103348497693054305663
G(x_222) = 620963937818958707113500638
G(x_223) = 48256267023599643517759875
G(x_224) = 1444660597841223944639569724
G(x_225) = 140402419994376147530295020
G(x_226) = 2015594663266541240780563009
G(x_227) = 130323969324215825790665796
G(x_228) = 1445863814201535092573468960
G(x_229) = 1024972744712057216713484566
G(x_230) = 738012945381728930520341223
G(x_231) = 333046263734596604353574885
G(x_232) = 358053927816973177158467314
G(x_233) = 1962335964158011708737950013
G(x_234) = 971325790518361965781172324
G(x_235) = 288168822410623182437955814
G(x_236) = 240196818889537105577669147
G(x_237) = 241854325871851244368777231
G(x_238) = 1277932409245810165338916708
G(x_239) = 432949227999048954932750092
G(x_240) = 1730123589318990315023406864
G(x_241) = 1749588988002345903942297390
G(x_242) = 1653930855611090700022120404
G(x_243) = 1836243723919029115267194201
G(x_244) = 623537073837619166360254272
G(x_245) = 1821968538345779823521478508
G(x_246) = 1183991328958342275152050124
G(x_247) = 54353372837889697744626784
G(x_248) = 1378855745071092754916179425
G(x_249) = 1402503887306913608915449531
G(x_250) = 1542022882240768234396525360
G(x_251) = 1292243524738226114821676101
G(x_252) = 414097518630513534290146789
G(x_253) = 608929052691135152055317713
G(x_254) = 975455321265727567448752608
G(x_255) = 630200343668425114217200974
G(x_256) = 729101201103098986945566779
G(x_257) = 222470201136342358960496813
G(x_258) = 2008607763201476031095622534
G(x_259) = 185215038787277491375812438
G(x_260) = 131144927414398737402036462
G(x_261) = 920008180630798777341865384
G(x_262) = 1814689482837019923905940242
G(x_263) = 1735178409781969906253238755
G(x_264) = 895004014600278135152382871
G(x_265) = 1730881780208233014722333688
G(x_266) = 1711392419226009648111191484
G(x_267) = 575122951775310907861530440
G(x_268) = 409622543109569640755568557
G(x_269) = 1838668707107454347352117768
G(x_270) = 795456603569757067901358985
G(x_271) = 1310349282602823461336424876
G(x_272) = 1556102892738758311393179934
G(x_273) = 1742054522447725426306775007
G(x_274) = 2014236770976716714779404172
G(x_275) = 1173697190260885918069893056
G(x_276) = 1733585238652958493762996949
G(x_277) = 251348168983349412759646253
G(x_278) = 1360567180266432689246472137
G(x_279) = 985872222371235631361444041
G(x_280) = 1618181976599407543849439190
G(x_281) = 1585741199039273546979589691
G(x_282) = 487998919550259773780744149
G(x_283) = 1695697080877872773337760204
G(x_284) = 1405968321415073191307905101
G(x_285) = 1920692828401451087644614902
G(x_286) = 1184025827210806930638836958
G(x_287) = 958202475752658512493469590
G(x_288) = 1962443904406645543153098398
G(x_289) = 1950220864298178013754477981
G(x_290) = 962571718010401643642801959
G(x_291) = 1721695721678923559349582736
G(x_292) = 524563542738892183130138206
G(x_293) = 212050536678647483378467561
G(x_294) = 124188847634134941264262959
G(x_295) = 277985313073851116130092616
G(x_296) = 266738979208915337906218031
G(x_297) = 286214929450416709652410199
G(x_298) = 387878020296885563395780689
G(x_299) = 228402403254206482207661597
G(x_300) = 5335102611218215310633534
G(x_301) = 1899854470238635127650741443
G(x_302) = 1249170879235243981811820186
G(x_303) = 1575158052324044861957460594
G(x_304) = 709621508395553287245515447
G(x_305) = 1450036890654525374437208162
G(x_306) = 495568731579682535775066033
G(x_307) = 774770100080709799036498806
G(x_308) = 1666590111363685199289113177
G(x_309) = 52670863675324812168510680
G(x_310) = 138849861361237227828292839
G(x_311) = 1561070599107164054504082481
G(x_312) = 1499624940857101934976426012
G(x_313) = 1002834661358836587226778519
G(x_314) = 127941392643381230975064289
G(x_315) = 930775974898261196451482239
G(x_316) = 579234437671067407063542494
G(x_317) = 784692903160406541867301791
G(x_318) = 82528419213672678874181164
G(x_319) = 1207679231898399564567416774
G(x_320) = 1503467722222732104688468335
G(x_321) = 749838359015763916131218257
G(x_322) = 305926847646797133782957958
G(x_323) = 453229288249373350113721714
G(x_324) = 799742236282472315139011263
G(x_325) = 353790593424847905047259129
G(x_326) = 1980583331149634714392412543
G(x_327) = 1580149056334858296865509458
G(x_328) = 1635053032093390328826852139
G(x_329) = 1908925002505622055132738228
G(x_330) = 1322098845897859930674787650
G(x_331) = 1833082981220125041681590991
G(x_332) = 296386534155386576754375872
G(x_333) = 1059440460346027734694527811
G(x_334) = 1967818860454577711753116787
G(x_335) = 1913161431926737247822300759
G(x_336) = 1225360200612000169657632330
G(x_337) = 1401726488947266786625570984
G(x_338) = 574866536374673679423187817
G(x_339) = 1141182957012129096468436765
G(x_340) = 176824072475916726436978648
G(x_341) = 282795341832643951827397861
G(x_342) = 441101180644339807433271984
G(x_343) = 2003301483834591979186900843
G(x_344) = 894963126914490506360514099
G(x_345) = 756259454145312055539817417
G(x_346) = 1624523983798815621176170350
G(x_347) = 550254511984579132724740766
G(x_348) = 462272813781400855432330753
G(x_349) = 1150545966234514313730106376
G(x_350) = 1217022210166308525034139717
G(x_351) = 343186050163793821921928460
G(x_352) = 1227912475324741157157367739
G(x_353) = 1318796500821629020064142491
G(x_354) = 609930497835751156792276126
G(x_355) = 1822039377318825670008651056
G(x_356) = 591681438803768502041046606
G(x_357) = 1734023822983413235530218611
G(x_358) = 469400325347694700922931109
G(x_359) = 478005889721843920321536171
G(x_360) = 934715899524743287330159336
G(x_361) = 220490166868579160576886630
G(x_362) = 1002380817675759386421024118
G(x_363) = 816917365548317068262605368
G(x_364) = 94411104507151612213379014
G(x_365) = 347433883947530118437023962
G(x_366) = 256735866087040132906570254
G(x_367) = 275265382383012547833888036
G(x_368) = 1187441532815672183638690938
G(x_369) = 2008637105644916534089752661
G(x_370) = 423048709261136103432378553
G(x_371) = 1539366986311353541175141092
G(x_372) = 1843419044539699206854695083
G(x_373) = 65423662789334502260187825
G(x_374) = 1055692186824078367377450942
G(x_375) = 65841693489344539059289957
G(x_376) = 435505201117676543304256103
G(x_377) = 625551622264877560339230155
G(x_378) = 681172009862312609173578149
G(x_379) = 1487742777965568778621944331
G(x_380) = 808141498292217510275781558
G(x_381) = 1670622126517709655809490734
G(x_382) = 1765328911290739546163012473
G(x_383) = 819685784225356263353265487
G(x_384) = 288629210373323983834902862
G(x_385) = 412167204063154684143649395
G(x_386) = 298499779033268207832552290
G(x_387) = 923706723151979841156846975
G(x_388) = 1682194378830092204299834552
G(x_389) = 1329779143813262389623572835
G(x_390) = 1950402164039811217786654014
G(x_391) = 1415833500296767107314883530
G(x_392) = 1204348379983040045345501535
G(x_393) = 1524222779276265506470023912
G(x_394) = 1392092489715775107346398816
G(x_395) = 190899946798194066566493237
G(x_396) = 1712394487297270089508573961
G(x_397) = 353196519779662192262429009
G(x_398) = 1614345029407433010101569810
G(x_399) = 773909130104129005298306760
G(x_400) = 2036774819954932645684240795
G(x_401) = 1925513472472490414242849809
G(x_402) = 1334773654155241786946882253
G(x_403) = 1079165812780373574529653483
G(x_404) = 2029472686979623442917103919
G(x_405) = 444915575313000985293270211
G(x_406) = 56527186366811375578613864
G(x_407) = 213751862041599605601998137
G(x_408) = 784991473274567041086677712
G(x_409) = 215634974375241749437167822
G(x_410) = 2002122038094145653281621695
G(x_411) = 938299195434295298874519836
G(x_412) = 1415505201041098040984437008
G(x_413) = 1833379160305745140501438069
G(x_414) = 76379886403268541444842705
G(x_415) = 1036286199069279555040245973
G(x_416) = 1630570052904642065388271842
G(x_417) = 1207200763624504443289044722
G(x_418) = 242262852659612532016106546
G(x_419) = 660200251651913095950516823
G(x_420) = 757453445998243739432339341
G(x_421) = 348355427915832937176477856
G(x_422) = 388555302565590225205215953
G(x_423) = 1911891804612470167777559451
G(x_424) = 1445833601806061762816374795
G(x_425) = 1349985589078089228221185398
G(x_426) = 957484220525666960226818764
G(x_427) = 1030824799582625371538994645
G(x_428) = 1883589268882850534610833484
G(x_429) = 2026915133948765336022794240
G(x_430) = 1992390503764923839376505249
G(x_431) = 1658540979852184855179000572
G(x_432) = 1680912248081177200376176128
G(x_433) = 1227205877504259060282169853
G(x_434) = 1103856839734207684526551035
G(x_435) = 1566129699424628915832861880
G(x_436) = 1883872267340397271731148154
G(x_437) = 1792742320659098164068684544
G(x_438) = 83566611686049543416704134
G(x_439) = 1543750221063451384800519840
G(x_440) = 685817449821845412399914665
G(x_441) = 1922017671428430818860108976
G(x_442) = 604108510001225588794390786
G(x_443) = 1448288550940413915674355594
G(x_444) = 1468727161598900365093026369
G(x_445) = 1350457098834273705851797911
G(x_446) = 542661092691405940118769199
G(x_447) = 1772939946181556049828304239
G(x_448) = 1607914289328349894661920198
G(x_449) = 351359170388192082155028234
G(x_450) = 304796519910796452426382581
G(x_451) = 185464403979374858605041589
G(x_452) = 1284833483922942618442291355
G(x_453) = 1675369496344025602904703145
G(x_454) = 687373999373293516654187870
G(x_455) = 1446338892683898404388818833
G(x_456) = 1771007244853189377146410122
G(x_457) = 1529697904375662905752445026
G(x_458) = 1279457921179851699426940311
G(x_459) = 1567152524394729282855352801
G(x_460) = 511488519984498451276949646
G(x_461) = 461999595465938628587737021
G(x_462) = 1799515970604378219584767287
G(x_463) = 1436264218320744763021414417
G(x_464) = 753508205124690470151598279
G(x_465) = 1219170010193348714092045590
G(x_466) = 2036439982192680400582560696
G(x_467) = 315980615281321494443862700
G(x_468) = 1709257200642437836982650341
G(x_469) = 635655572615826779722122672
G(x_470) = 874677871605895640087024265
G(x_471) = 716784054374211390404974299
G(x_472) = 1339484347238030906920522052
G(x_473) = 285444001228594755240798101
G(x_474) = 1135013509067794132457903617
G(x_475) = 1775700590828281664566133499
G(x_476) = 1229438676655023506854926345
G(x_477) = 1544072077583153167314095118
G(x_478) = 1059337787964251476590769992
G(x_479) = 190976459952284896662114251
G(x_480) = 334372199051455898131361868
G(x_481) = 1033077763180707889263114842
G(x_482) = 126443294389029754049174097
G(x_483) = 841562412234432020026746434
G(x_484) = 674357835338522781429339182
G(x_485) = 1857088591294645899460509464
G(x_486) = 1666546799647256875649605108
G(x_487) = 1617017580556622218613738117
G(x_488) = 1243968903681972909119263232
G(x_489) = 1176810434615951815357431267
G(x_490) = 1530329818852765019827151063
G(x_491) = 2004886984953590384637051461
G(x_492) = 1568582319987426023032652958
G(x_493) = 1395578032203943012128772488
G(x_494) = 175554676091692845373725818
G(x_495) = 416417230888634737162913021
G(x_496) = 211828206771213176344797008
G(x_497) = 410345790120062902646948829
G(x_498) = 679067353234633533703753786
G(x_499) = 117935891022683777185459996
G(x_500) = 446177903114294073390043440
G(x_501) = 1630275661186463928441639583
G(x_502) = 2007247152961223461567930900
G(x_503) = 516737330997601977055246356
G(x_504) = 1109775137437480023363958369
G(x_505) = 1781881285167774746098785689
G(x_506) = 974098038766126810663021093
G(x_507) = 432998857352972951642925667
G(x_508) = 26192785004724525951393066
G(x_509) = 1824093373586793970991551228
G(x_510) = 627667326431942073128302397
G(x_511) = 560602199784455952240422302
Computing polyeval(F,G) took 60ms
Computing product of all F(g_i) took 0ms
Step 2 took 152ms
********** Factor found in step 2: 30210181
Found prime factor of 8 digits: 30210181
Prime cofactor 67872792749091946543 has 20 digits
Peak memory usage: 4MB
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2050449353925555290706354283 (28 digits)
Using B1=30, B2=1000000, polynomial x^1, sigma=0:7
Step 1 took 4ms
Step 2 took 124ms
********** Factor found in step 2: 30210181
Found prime factor of 8 digits: 30210181
Prime cofactor 67872792749091946543 has 20 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2050449353925555290706354283 (28 digits)
Using B1=100, B2=2046, polynomial x^1, sigma=0:7
Step 1 took 4ms
Step 2 took 0ms
Run 2 out of 3:
Using B1=110, B2=110-2046, polynomial x^1, sigma=0:7
Step 1 took 0ms
Step 2 took 4ms
Run 3 out of 3:
Using B1=120, B2=120-2706, polynomial x^1, sigma=0:7
Step 1 took 0ms
Step 2 took 0ms
********** Factor found in step 2: 30210181
Found prime factor of 8 digits: 30210181
Prime cofactor 67872792749091946543 has 20 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2050449353925555290706354283 (28 digits)
Using B1=30, B2=1000000, polynomial x^1, sigma=0:7
Step 1 took 4ms
Step 2 took 68ms
********** Factor found in step 2: 30210181
Found prime factor of 8 digits: 30210181
Prime cofactor 67872792749091946543 has 20 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Resuming ECM residue
Input number is 2050449353925555290706354283 (28 digits)
Using B1=30-30, B2=1000000, polynomial x^1, A=899451165556911502964137591
Step 1 took 0ms
Step 2 took 72ms
********** Factor found in step 2: 30210181
Found prime factor of 8 digits: 30210181
Prime cofactor 67872792749091946543 has 20 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2050449353925555290706354283 (28 digits)
Using B1=100, B2=2046, polynomial x^1, sigma=0:7
Step 1 took 4ms
Step 2 took 0ms
Run 2 out of 3:
Using B1=110, B2=110-2046, polynomial x^1, sigma=0:7
Step 1 took 4ms
Step 2 took 0ms
Run 3 out of 3:
Using B1=120, B2=120-2706, polynomial x^1, sigma=0:7
Step 1 took 0ms
Step 2 took 4ms
********** Factor found in step 2: 30210181
Found prime factor of 8 digits: 30210181
Prime cofactor 67872792749091946543 has 20 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 212252637915375215854013140804296246361 (39 digits)
Using B1=63421, B2=1822795201-1822795201, polynomial x^1, sigma=0:781683988
Step 1 took 804ms
Step 2 took 4ms
********** Factor found in step 2: 212252637915375215854013140804296246361
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 137703491 (9 digits)
Using B1=84, B2=1000, polynomial x^1, sigma=0:6
Step 1 took 0ms
********** Factor found in step 1: 137703491
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 3533000986701102061387017352606588294716061 (43 digits)
Using B1=191, B2=225, polynomial x^1, sigma=0:1621
Step 1 took 0ms
Step 2 took 0ms
********** Factor found in step 2: 291310394389387
Found prime factor of 15 digits: 291310394389387
Prime cofactor 12127960604037464813777571703 has 29 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 145152979917007299777325725119 (30 digits)
Using B1=924, B2=117751, polynomial x^1, sigma=0:711387948
Step 1 took 8ms
Step 2 took 20ms
********** Factor found in step 2: 59124358487827
Found prime factor of 14 digits: 59124358487827
Prime cofactor 2455045325301797 has 16 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^919-1 (277 digits)
Using B1=937, B2=1, polynomial x^1, sigma=0:262763035
Step 1 took 80ms
********** Factor found in step 1: 33554520197234177
Found prime factor of 17 digits: 33554520197234177
Composite cofactor (2^919-1)/33554520197234177 has 261 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^919-1 (277 digits)
Using B1=937, B2=1, polynomial x^1, sigma=0:262763035
Step 1 took 80ms
********** Factor found in step 1: 33554520197234177
Found prime factor of 17 digits: 33554520197234177
Composite cofactor (2^919-1)/33554520197234177 has 261 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 101#-1 (39 digits)
Using B1=400000, B2=258290770, polynomial Dickson(3), sigma=0:17
Step 1 took 5164ms
Step 2 took 2416ms
********** Factor found in step 2: 2990092035859
Found prime factor of 13 digits: 2990092035859
Prime cofactor (101#-1)/2990092035859 has 26 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 101!-1 (160 digits)
Using B1=100000, B2=40868532, polynomial x^2, sigma=0:17
Step 1 took 6432ms
********** Factor found in step 1: 23999
Found composite factor of 5 digits: 23999
Composite cofactor (101!-1)/23999 has 156 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 101!3-1 (55 digits)
Using B1=100000, B2=40868532, polynomial x^2, sigma=0:17
Step 1 took 1640ms
********** Factor found in step 1: 29986164777207
Found composite factor of 14 digits: 29986164777207
Composite cofactor (101!3-1)/29986164777207 has 41 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 101#3-2 (39 digits)
Using B1=100000, B2=40868532, polynomial x^2, sigma=0:18
Step 1 took 1196ms
********** Factor found in step 1: 642655730663
Found prime factor of 12 digits: 642655730663
Prime cofactor (101#3-2)/642655730663 has 27 digits
Parsing Error: inexact division
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is -1234 (4 digits)
Error, n should be positive.
Please report internal errors at <ecm-discuss@lists.gforge.inria.fr>.
Error, conflict between -sigma and -param arguments
Error, conflict between -sigma and -param arguments
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^1123-1 (339 digits)
Error, x0 should be equal to 2 with this parametrization
Please report internal errors at <ecm-discuss@lists.gforge.inria.fr>.
Error, invalid starting point: 1.2
Error, invalid starting point: 1.2
Error, invalid -param value: -1
Error, invalid sigma value: 1.2
Error, invalid A value: 1.2
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^1123-1 (339 digits)
Error, -A requires a starting point (-x0 x).
Please report internal errors at <ecm-discuss@lists.gforge.inria.fr>.
Error, the -I f option requires f > 0
Can't find input file 1
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Tuned for arm/params.h
Running on bm-wb-03
Input number is 2^1123-1 (339 digits)
Using special division for factor of 2^1123-1
Error: too large step 2 bound, increase -k
Please report internal errors at <ecm-discuss@lists.gforge.inria.fr>.
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Tuned for arm/params.h
Running on bm-wb-03
Input number is 2^1123-1 (339 digits)
Using special division for factor of 2^1123-1
Error: stage 2 interval too large, cannot generate suitable parameters.
Try a smaller B2 value.
Please report internal errors at <ecm-discuss@lists.gforge.inria.fr>.
Error, Function Phi() requires 2 parameters
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Parsing Error - Invalid parameter passed to the Phi function
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Error - invalid number [)]
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Error - unknown operator: '$'
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Unknown option: -inp
Invalid arguments. See /<<BUILDDIR>>/gmp-ecm-7.0.1+ds/_build/.libs/lt-ecm --help.
Invalid B2 value: -1000000
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Error, -sigma parameter is incompatible with -A and -x0 parameters.
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Error, -y0 must be used with -A and -x0 parameters.
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Could not open file test_M877.save for reading
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Error, option -c is incompatible with -x0
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [P-1]
Input number is 2^1123-1 (339 digits)
Error, the -param option is only valid for ECM
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 95209938255048826235189575712705128366296557149606415206280987204268594538412191641776798249266895999715600261737863698825644292938050707507901970225804581 (155 digits)
Could not open file sfile.txt for reading
Error while reading s from file
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 95209938255048826235189575712705128366296557149606415206280987204268594538412191641776798249266895999715600261737863698825644292938050707507901970225804581 (155 digits)
read_s_from_file: 0 bytes read from test_dummy2.save
Error while reading s from file
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 95209938255048826235189575712705128366296557149606415206280987204268594538412191641776798249266895999715600261737863698825644292938050707507901970225804581 (155 digits)
Using B1=11000, B2=1873422, polynomial x^1, sigma=3:2734829753
Step 1 took 604ms
Step 2 took 444ms
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 95209938255048826235189575712705128366296557149606415206280987204268594538412191641776798249266895999715600261737863698825644292938050707507901970225804581 (155 digits)
Error, the value of the batch product in test.ecm.s does not correspond to B1=1000.
Error while reading s from file
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 95209938255048826235189575712705128366296557149606415206280987204268594538412191641776798249266895999715600261737863698825644292938050707507901970225804581 (155 digits)
Error, the value of the batch product in test.ecm.s does not correspond to B1=10900.
Error while reading s from file
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 95209938255048826235189575712705128366296557149606415206280987204268594538412191641776798249266895999715600261737863698825644292938050707507901970225804581 (155 digits)
Error, -bsaves/-bloads makes sense in batch mode only
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 95209938255048826235189575712705128366296557149606415206280987204268594538412191641776798249266895999715600261737863698825644292938050707507901970225804581 (155 digits)
Error, invalid parametrization.
Please report internal errors at <ecm-discuss@lists.gforge.inria.fr>.
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 95209938255048826235189575712705128366296557149606415206280987204268594538412191641776798249266895999715600261737863698825644292938050707507901970225804581 (155 digits)
mpmod_init_BASE2: n does not divide 2^32768+1
Please report internal errors at <ecm-discuss@lists.gforge.inria.fr>.
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 95209938255048826235189575712705128366296557149606415206280987204268594538412191641776798249266895999715600261737863698825644292938050707507901970225804581 (155 digits)
Error - invalid number [�]
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^1000-(101%7) (302 digits)
Using B1=1000, B2=69876, polynomial x^1, sigma=0:17
Step 1 took 240ms
********** Factor found in step 1: 53730269985058335227
Found composite factor of 20 digits: 53730269985058335227
Composite cofactor (2^1000-(101%7))/53730269985058335227 has 282 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^919-1 (277 digits)
Using B1=937, B2=1, polynomial x^1, sigma=0:262763035
Step 1 took 184ms
********** Factor found in step 1: 33554520197234177
Found prime factor of 17 digits: 33554520197234177
Composite cofactor (2^919-1)/33554520197234177 has 261 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^919-1 (277 digits)
Using B1=937, B2=1, polynomial x^1, sigma=0:262763035
Step 1 took 80ms
********** Factor found in step 1: 33554520197234177
Found prime factor of 17 digits: 33554520197234177
Composite cofactor (2^919-1)/33554520197234177 has 261 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^919-1 (277 digits)
Using B1=937, B2=1, polynomial x^1, sigma=0:262763035
Step 1 took 88ms
********** Factor found in step 1: 33554520197234177
Found prime factor of 17 digits: 33554520197234177
Composite cofactor (2^919-1)/33554520197234177 has 261 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^919-1 (277 digits)
Using B1=283, B2=1709, polynomial x^1, sigma=0:1691973485
Step 1 took 24ms
Step 2 took 28ms
********** Factor found in step 2: 33554520197234177
Found prime factor of 17 digits: 33554520197234177
Composite cofactor (2^919-1)/33554520197234177 has 261 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is (2^1033+1)/3 (311 digits)
Using B1=521, B2=1, polynomial x^1, sigma=0:2301432245
Step 1 took 56ms
********** Factor found in step 1: 24651922299337
Found prime factor of 14 digits: 24651922299337
Composite cofactor ((2^1033+1)/3)/24651922299337 has 298 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is (2^1033+1)/3 (311 digits)
Using B1=223, B2=1847, polynomial x^1, sigma=0:2301432245
Step 1 took 24ms
Step 2 took 24ms
********** Factor found in step 2: 24651922299337
Found prime factor of 14 digits: 24651922299337
Composite cofactor ((2^1033+1)/3)/24651922299337 has 298 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is (2^1063+1)/3/26210488518118323164267329859 (292 digits)
Using B1=383, B2=1, polynomial x^1, sigma=0:2399424618
Step 1 took 44ms
********** Factor found in step 1: 114584129081
Found prime factor of 12 digits: 114584129081
Composite cofactor ((2^1063+1)/3/26210488518118323164267329859)/114584129081 has 281 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is (2^1063+1)/3/26210488518118323164267329859 (292 digits)
Using B1=71, B2=500, polynomial x^1, sigma=0:2399424618
Step 1 took 8ms
Step 2 took 12ms
********** Factor found in step 2: 114584129081
Found prime factor of 12 digits: 114584129081
Composite cofactor ((2^1063+1)/3/26210488518118323164267329859)/114584129081 has 281 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 242668358425701966181147598421249782519178289604307455138484425562807899 (72 digits)
Using B1=28560, B2=80000000-85507063, polynomial x^1, sigma=0:1417477358
Step 1 took 660ms
Step 2 took 424ms
********** Factor found in step 2: 314189411150178070008866231673623
Found prime factor of 33 digits: 314189411150178070008866231673623
Prime cofactor 772363261821417470288502136863983499613 has 39 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 3533000986701102061387017352606588294716061 (43 digits)
********** Factor found in step 1: 291310394389387
Found prime factor of 15 digits: 291310394389387
Prime cofactor 12127960604037464813777571703 has 29 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 121279606270805899614487548491773862357 (39 digits)
********** Factor found in step 1: 10000000019
Found prime factor of 11 digits: 10000000019
Prime cofactor 12127960604037464813777571703 has 29 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 291310394389387 (15 digits)
Using B1=2000, B2=147396, polynomial x^3, sigma=0:40
Step 1 took 16ms
Step 2 took 16ms
********** Factor found in step 2: 291310394389387
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 3533000986701102061387017352606588294716061 (43 digits)
Using B1=167, B2=211, polynomial x^1, sigma=0:3547
Step 1 took 0ms
Step 2 took 0ms
********** Factor found in step 2: 291310394389387
Found prime factor of 15 digits: 291310394389387
Prime cofactor 12127960604037464813777571703 has 29 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 449590253344339769860648131841615148645295989319968106906219761704350259884936939123964073775456979170209297434164627098624602597663490109944575251386017 (153 digits)
Using B1=61843, B2=20658299, polynomial x^2, sigma=0:63844855
Step 1 took 3648ms
Step 2 took 2504ms
********** Factor found in step 2: 241421225374647262615077397
Found prime factor of 27 digits: 241421225374647262615077397
Prime cofactor 1862264813902122131423372344559339567503391871088436708374700394762064021217072743463856958990845558484946068708307156081498461 has 127 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 17061648125571273329563156588435816942778260706938821014533 (59 digits)
Using B1=174000, B2=85880350, polynomial x^2, sigma=0:585928442
Step 1 took 3736ms
Step 2 took 1752ms
********** Factor found in step 2: 4562371492227327125110177
Found prime factor of 25 digits: 4562371492227327125110177
Prime cofactor 3739644646350764691998599898592229 has 34 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 17061648125571273329563156588435816942778260706938821014533 (59 digits)
Using B1=174000, B2=0, polynomial x^1, sigma=0:585928442
Step 1 took 3716ms
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Resuming ECM residue saved by buildd@bm-wb-03 with GMP-ECM 7.0.1 on Tue Jun 21 05:27:13 2016
Input number is 17061648125571273329563156588435816942778260706938821014533 (59 digits)
Using B1=174000-174000, B2=85880350, polynomial x^2, sigma=0:585928442
Step 1 took 0ms
Step 2 took 1740ms
********** Factor found in step 2: 4562371492227327125110177
Found prime factor of 25 digits: 4562371492227327125110177
Prime cofactor 3739644646350764691998599898592229 has 34 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 17061648125571273329563156588435816942778260706938821014533 (59 digits)
Using B1=174000, B2=0, polynomial x^1, sigma=0:585928442
Step 1 took 3716ms
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Resuming ECM residue saved by buildd@bm-wb-03 with GMP-ECM 7.0.1 on Tue Jun 21 05:27:19 2016
Input number is 17061648125571273329563156588435816942778260706938821014533 (59 digits)
Using B1=174000-174000, B2=85880350, polynomial x^2, sigma=0:585928442
Step 1 took 0ms
Step 2 took 1752ms
********** Factor found in step 2: 4562371492227327125110177
Found prime factor of 25 digits: 4562371492227327125110177
Prime cofactor 3739644646350764691998599898592229 has 34 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Resuming P-1 residue (this is a comment)
Input number is 17 (2 digits)
Using B1=2-174000, B2=103940730, polynomial x^1
Step 1 took 136ms
********** Factor found in step 1: 17
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Save file line has unknown tag: FOO
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
B1 field not followed by semicolon
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 17061648125571273329563156588435816942778260706938821014533 (59 digits)
Using B1=1000, B2=51606, polynomial x^1, A=7312134910959117141241352823615350118333540302973780434803
Step 1 took 20ms
Step 2 took 20ms
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Resuming ECM residue saved by buildd@bm-wb-03 with GMP-ECM 7.0.1 on Tue Jun 21 05:27:22 2016
Input number is 17061648125571273329563156588435816942778260706938821014533 (59 digits)
Using B1=1000-1000, B2=51606, polynomial x^1, A=7312134910959117141241352823615350118333540302973780434803
Step 1 took 0ms
Step 2 took 20ms
Resume file line has bad checksum 505596339, expected 1505596339
Save file line lacks fields
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Resume warning, skipping line with no '=' after: METHOD ECM; PAR
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Resume warning, skipping line with no '=' after: [Tue Jan 05 20:
Resuming ECM residue saved with Prime95
Input number is 0x7FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF (152 digits)
Using B1=1, B2=2000000, polynomial x^1, sigma=0:3969830600789499
Step 1 took 0ms
Step 2 took 500ms
********** Factor found in step 2: 3213684984979279
Found prime factor of 16 digits: 3213684984979279
Composite cofactor (0x7FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF)/3213684984979279 has 136 digits
Resume warning, skipping line with no '=' after: M503 completed
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 89101594496537524661600025466303491594098940711325290746374420963129505171895306244425914080753573576861992127359576789001 (122 digits)
Using B1=157721, B2=1032299, polynomial x^1, sigma=0:877655087
Step 1 took 7304ms
Step 2 took 224ms
********** Factor found in step 2: 122213491239590733375594767461662771175707001
Found prime factor of 45 digits: 122213491239590733375594767461662771175707001
Prime cofactor 729065126875888654836271846897328714196046117321552802754910712464291427082001 has 78 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 5394204444759808120647321820789847518754252780933425517607611172590240019087317088600360602042567541009369753816111824690753627535877960715703346991252857 (154 digits)
Using B1=149827, B2=61418292, polynomial x^2, sigma=0:805816989
Step 1 took 8904ms
********** Factor found in step 1: 25233450176615986500234063824208915571213
Found prime factor of 41 digits: 25233450176615986500234063824208915571213
Composite cofactor 213771973590779703877582369062709101178538085915092060190430818668514532785234237012872011811995059836377330127389 has 114 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 3923385745693995079670229419275984584311007321932374190635656246740175165573932140787529348954892963218868359081838772941945556717 (130 digits)
Using B1=141667, B2=150814537, polynomial Dickson(3), sigma=0:876329474
Step 1 took 6620ms
Step 2 took 6116ms
********** Factor found in step 2: 662926550178509475639682769961460088456141816377
Found prime factor of 48 digits: 662926550178509475639682769961460088456141816377
Prime cofactor 5918281210244974807753908524217714036623152303854001660136533635338204743433806421 has 82 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 124539923134619429718018353168641490719788526741873602224103589351798060075728544650990190016536810151633233676972068237330360238752628542584228856301923448951 (159 digits)
Using B1=96097, B2=24289207, polynomial x^2, sigma=0:1604840403
Step 1 took 4560ms
Step 2 took 2636ms
********** Factor found in step 2: 148296291984475077955727317447564721950969097
Found prime factor of 45 digits: 148296291984475077955727317447564721950969097
Prime cofactor 839804700900123195473468092497901750422530587828620063507554515144683510250490874819119570309824866293030799718783 has 114 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 4983070578699621345648758795946786489699447158923341167929707152021191319057138908604417894224244096909460401007237133698775496719078793168004317119431646035122982915288481052088094940158965731422616671 (202 digits)
Using B1=122861, B2=176711, polynomial x^1, sigma=0:909010734
Step 1 took 14316ms
Step 2 took 96ms
********** Factor found in step 2: 1610390727168185680580455244749516255695631992277
Found prime factor of 49 digits: 1610390727168185680580455244749516255695631992277
Composite cofactor 3094323939297745576239630305708145221943652772146352976583265583941709400206907308455251844923141717213622722981913978180008321605958419308465245792685923 has 154 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 1408323592065265621229603282020508687 (37 digits)
Using B1=531571, B2=29973883000-29973884000, polynomial x^1, sigma=0:1549542516
Step 1 took 6404ms
Step 2 took 4ms
********** Factor found in step 2: 1408323592065265621229603282020508687
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 3213162276640339413566047915418064969550383692549981333701 (58 digits)
Using B1=408997, B2=33631583, polynomial x^2, sigma=0:2735675386
Step 1 took 6860ms
Step 2 took 1036ms
********** Factor found in step 2: 3213162276640339413566047915418064969550383692549981333701
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 39614081257132168796771975177 (29 digits)
Using B1=1000000, B2=1045563762, polynomial Dickson(6), sigma=0:480
Step 1 took 10136ms
Step 2 took 5204ms
********** Factor found in step 2: 39614081257132168796771975177
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 10000286586958753753 (20 digits)
Using B1=1000000, B2=1045563762, polynomial Dickson(6), sigma=0:3956738175
Step 1 took 8864ms
Step 2 took 4068ms
********** Factor found in step 2: 10000286586958753753
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 49672383630046506169472128421 (29 digits)
Using B1=166669, B2=86778487, polynomial Dickson(3), sigma=0:2687434659
Step 1 took 1756ms
Step 2 took 1236ms
********** Factor found in step 2: 49672383630046506169472128421
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 216259730493575791390589173296092767511 (39 digits)
Using B1=1124423, B2=20477641, polynomial x^2, sigma=0:214659179
Step 1 took 14596ms
Step 2 took 500ms
********** Factor found in step 2: 216259730493575791390589173296092767511
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 49367108402201032092269771894422156977426293789852367266303146912244441959559870316184237 (89 digits)
Using B1=5000, B2=600786, polynomial x^1, sigma=0:6
Step 1 took 152ms
Step 2 took 116ms
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 10090030271*10^400+696212088699 (411 digits)
Using B1=1000, B2=1000000, polynomial x^1, sigma=0:3923937547
Step 1 took 384ms
Step 2 took 1204ms
********** Factor found in step 2: 10090030271
Found prime factor of 11 digits: 10090030271
P = 2, Q = 3 (0.23%)
P = 2, Q = 5 (0.45%)
P = 2, Q = 7 (0.68%)
P = 2, Q = 11 (0.90%)
P = 2, Q = 13 (1.13%)
P = 2, Q = 31 (1.35%)
P = 2, Q = 61 (1.58%)
P = 2, Q = 17 (1.80%)
P = 2, Q = 19 (2.03%)
P = 2, Q = 29 (2.25%)
P = 2, Q = 37 (2.48%)
P = 2, Q = 41 (2.70%)
P = 2, Q = 43 (2.93%)
P = 2, Q = 71 (3.15%)
P = 2, Q = 73 (3.38%)
P = 2, Q = 113 (3.60%)
P = 2, Q = 127 (3.83%)
P = 2, Q = 181 (4.05%)
P = 2, Q = 211 (4.28%)
P = 2, Q = 241 (4.50%)
P = 2, Q = 281 (4.73%)
P = 2, Q = 337 (4.95%)
P = 2, Q = 421 (5.18%)
P = 2, Q = 631 (5.41%)
P = 2, Q = 1009 (5.63%)
P = 2, Q = 2521 (5.86%)
P = 2, Q = 23 (6.08%)
P = 2, Q = 67 (6.31%)
P = 2, Q = 89 (6.53%)
P = 2, Q = 199 (6.76%)
P = 2, Q = 331 (6.98%)
P = 2, Q = 397 (7.21%)
P = 2, Q = 463 (7.43%)
P = 2, Q = 617 (7.66%)
P = 2, Q = 661 (7.88%)
P = 2, Q = 881 (8.11%)
P = 2, Q = 991 (8.33%)
P = 2, Q = 1321 (8.56%)
P = 2, Q = 2311 (8.78%)
P = 2, Q = 3697 (9.01%)
P = 2, Q = 4621 (9.23%)
P = 2, Q = 9241 (9.46%)
P = 2, Q = 18481 (9.68%)
P = 2, Q = 55441 (9.91%)
P = 2, Q = 53 (10.14%)
P = 2, Q = 79 (10.36%)
P = 2, Q = 131 (10.59%)
P = 2, Q = 157 (10.81%)
P = 2, Q = 313 (11.04%)
P = 2, Q = 521 (11.26%)
P = 2, Q = 547 (11.49%)
P = 2, Q = 859 (11.71%)
P = 2, Q = 911 (11.94%)
P = 2, Q = 937 (12.16%)
P = 2, Q = 1093 (12.39%)
P = 2, Q = 1171 (12.61%)
P = 2, Q = 1873 (12.84%)
P = 2, Q = 2003 (13.06%)
P = 2, Q = 2341 (13.29%)
P = 2, Q = 2731 (13.51%)
P = 2, Q = 2861 (13.74%)
P = 2, Q = 3121 (13.96%)
P = 2, Q = 3433 (14.19%)
P = 2, Q = 6007 (14.41%)
P = 2, Q = 6553 (14.64%)
P = 2, Q = 8009 (14.86%)
P = 2, Q = 8191 (15.09%)
P = 2, Q = 8581 (15.32%)
P = 2, Q = 16381 (15.54%)
P = 2, Q = 20021 (15.77%)
P = 2, Q = 20593 (15.99%)
P = 2, Q = 21841 (16.22%)
P = 2, Q = 25741 (16.44%)
P = 3, Q = 7 (17.34%)
P = 3, Q = 13 (17.79%)
P = 3, Q = 31 (18.02%)
P = 3, Q = 61 (18.24%)
P = 3, Q = 19 (18.69%)
P = 3, Q = 37 (19.14%)
P = 3, Q = 43 (19.59%)
P = 3, Q = 73 (20.05%)
P = 3, Q = 127 (20.50%)
P = 3, Q = 181 (20.72%)
P = 3, Q = 211 (20.95%)
P = 3, Q = 241 (21.17%)
P = 3, Q = 337 (21.62%)
P = 3, Q = 421 (21.85%)
P = 3, Q = 631 (22.07%)
P = 3, Q = 1009 (22.30%)
P = 3, Q = 2521 (22.52%)
P = 3, Q = 67 (22.97%)
P = 3, Q = 199 (23.42%)
P = 3, Q = 331 (23.65%)
P = 3, Q = 397 (23.87%)
P = 3, Q = 463 (24.10%)
P = 3, Q = 661 (24.55%)
P = 3, Q = 991 (25.00%)
P = 3, Q = 1321 (25.23%)
P = 3, Q = 2311 (25.45%)
P = 3, Q = 3697 (25.68%)
P = 3, Q = 4621 (25.90%)
P = 3, Q = 9241 (26.13%)
P = 3, Q = 18481 (26.35%)
P = 3, Q = 55441 (26.58%)
P = 3, Q = 79 (27.03%)
P = 3, Q = 157 (27.48%)
P = 3, Q = 313 (27.70%)
P = 3, Q = 547 (28.15%)
P = 3, Q = 859 (28.38%)
P = 3, Q = 937 (28.83%)
P = 3, Q = 1093 (29.05%)
P = 3, Q = 1171 (29.28%)
P = 3, Q = 1873 (29.50%)
P = 3, Q = 2341 (29.95%)
P = 3, Q = 2731 (30.18%)
P = 3, Q = 3121 (30.63%)
P = 3, Q = 3433 (30.86%)
P = 3, Q = 6007 (31.08%)
P = 3, Q = 6553 (31.31%)
P = 3, Q = 8191 (31.76%)
P = 3, Q = 8581 (31.98%)
P = 3, Q = 16381 (32.21%)
P = 3, Q = 20593 (32.66%)
P = 3, Q = 21841 (32.88%)
P = 3, Q = 25741 (33.11%)
P = 5, Q = 11 (34.23%)
P = 5, Q = 31 (34.68%)
P = 5, Q = 61 (34.91%)
P = 5, Q = 41 (36.04%)
P = 5, Q = 71 (36.49%)
P = 5, Q = 181 (37.39%)
P = 5, Q = 211 (37.61%)
P = 5, Q = 241 (37.84%)
P = 5, Q = 281 (38.06%)
P = 5, Q = 421 (38.51%)
P = 5, Q = 631 (38.74%)
P = 5, Q = 2521 (39.19%)
P = 5, Q = 331 (40.32%)
P = 5, Q = 661 (41.22%)
P = 5, Q = 881 (41.44%)
P = 5, Q = 991 (41.67%)
P = 5, Q = 1321 (41.89%)
P = 5, Q = 2311 (42.12%)
P = 5, Q = 4621 (42.57%)
P = 5, Q = 9241 (42.79%)
P = 5, Q = 18481 (43.02%)
P = 5, Q = 55441 (43.24%)
P = 5, Q = 131 (43.92%)
P = 5, Q = 521 (44.59%)
P = 5, Q = 911 (45.27%)
P = 5, Q = 1171 (45.95%)
P = 5, Q = 2341 (46.62%)
P = 5, Q = 2731 (46.85%)
P = 5, Q = 2861 (47.07%)
P = 5, Q = 3121 (47.30%)
P = 5, Q = 8191 (48.42%)
P = 5, Q = 8581 (48.65%)
P = 5, Q = 16381 (48.87%)
P = 5, Q = 20021 (49.10%)
P = 5, Q = 21841 (49.55%)
P = 5, Q = 25741 (49.77%)
P = 7, Q = 29 (52.25%)
P = 7, Q = 43 (52.93%)
P = 7, Q = 71 (53.15%)
P = 7, Q = 113 (53.60%)
P = 7, Q = 127 (53.83%)
P = 7, Q = 211 (54.28%)
P = 7, Q = 281 (54.73%)
P = 7, Q = 337 (54.95%)
P = 7, Q = 421 (55.18%)
P = 7, Q = 631 (55.41%)
P = 7, Q = 1009 (55.63%)
P = 7, Q = 2521 (55.86%)
P = 7, Q = 463 (57.43%)
P = 7, Q = 617 (57.66%)
P = 7, Q = 2311 (58.78%)
P = 7, Q = 3697 (59.01%)
P = 7, Q = 4621 (59.23%)
P = 7, Q = 9241 (59.46%)
P = 7, Q = 18481 (59.68%)
P = 7, Q = 55441 (59.91%)
P = 7, Q = 547 (61.49%)
P = 7, Q = 911 (61.94%)
P = 7, Q = 1093 (62.39%)
P = 7, Q = 2003 (63.06%)
P = 7, Q = 2731 (63.51%)
P = 7, Q = 6007 (64.41%)
P = 7, Q = 6553 (64.64%)
P = 7, Q = 8009 (64.86%)
P = 7, Q = 8191 (65.09%)
P = 7, Q = 16381 (65.54%)
P = 7, Q = 20021 (65.77%)
P = 7, Q = 21841 (66.22%)
P = 11, Q = 23 (72.75%)
P = 11, Q = 67 (72.97%)
P = 11, Q = 89 (73.20%)
P = 11, Q = 199 (73.42%)
P = 11, Q = 331 (73.65%)
P = 11, Q = 397 (73.87%)
P = 11, Q = 463 (74.10%)
P = 11, Q = 617 (74.32%)
P = 11, Q = 661 (74.55%)
P = 11, Q = 881 (74.77%)
P = 11, Q = 991 (75.00%)
P = 11, Q = 1321 (75.23%)
P = 11, Q = 2311 (75.45%)
P = 11, Q = 3697 (75.68%)
P = 11, Q = 4621 (75.90%)
P = 11, Q = 9241 (76.13%)
P = 11, Q = 18481 (76.35%)
P = 11, Q = 55441 (76.58%)
P = 11, Q = 859 (78.38%)
P = 11, Q = 2003 (79.73%)
P = 11, Q = 2861 (80.41%)
P = 11, Q = 3433 (80.86%)
P = 11, Q = 6007 (81.08%)
P = 11, Q = 8009 (81.53%)
P = 11, Q = 8581 (81.98%)
P = 11, Q = 20021 (82.43%)
P = 11, Q = 20593 (82.66%)
P = 11, Q = 25741 (83.11%)
P = 13, Q = 53 (93.47%)
P = 13, Q = 79 (93.69%)
P = 13, Q = 131 (93.92%)
P = 13, Q = 157 (94.14%)
P = 13, Q = 313 (94.37%)
P = 13, Q = 521 (94.59%)
P = 13, Q = 547 (94.82%)
P = 13, Q = 859 (95.05%)
P = 13, Q = 911 (95.27%)
P = 13, Q = 937 (95.50%)
P = 13, Q = 1093 (95.72%)
P = 13, Q = 1171 (95.95%)
P = 13, Q = 1873 (96.17%)
P = 13, Q = 2003 (96.40%)
P = 13, Q = 2341 (96.62%)
P = 13, Q = 2731 (96.85%)
P = 13, Q = 2861 (97.07%)
P = 13, Q = 3121 (97.30%)
P = 13, Q = 3433 (97.52%)
P = 13, Q = 6007 (97.75%)
P = 13, Q = 6553 (97.97%)
P = 13, Q = 8009 (98.20%)
P = 13, Q = 8191 (98.42%)
P = 13, Q = 8581 (98.65%)
P = 13, Q = 16381 (98.87%)
P = 13, Q = 20021 (99.10%)
P = 13, Q = 20593 (99.32%)
P = 13, Q = 21841 (99.55%)
P = 13, Q = 25741 (99.77%)
Prime cofactor (10090030271*10^400+696212088699)/10090030271 has 401 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 31622776601683791911 (20 digits)
Using B1=11000, B2=1873422, polynomial x^1, sigma=0:249908706013996416
Step 1 took 124ms
Step 2 took 88ms
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 31622776601683791911 (20 digits)
Using B1=11000, B2=1873422, polynomial x^1, sigma=2:5539417145734457396
Step 1 took 76ms
Step 2 took 84ms
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 31622776601683791911 (20 digits)
Using B1=11000, B2=1873422, polynomial x^1, sigma=3:3462003578
Step 1 took 76ms
Step 2 took 84ms
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 458903930815802071188998938170281707063809443792768383215233 (60 digits)
Using B1=10000, B2=1873422, polynomial x^1, sigma=2:142
Step 1 took 164ms
Step 2 took 156ms
********** Factor found in step 2: 5422968571
Found prime factor of 10 digits: 5422968571
Prime cofactor 84622273724735933231540562835816167053314357811123 has 50 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^349-1 (106 digits)
Using B1=587, B2=29383, polynomial x^1, sigma=2:9
Step 1 took 20ms
Step 2 took 28ms
********** Factor found in step 2: 1779973928671
Found prime factor of 13 digits: 1779973928671
Composite cofactor (2^349-1)/1779973928671 has 93 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^347-1 (105 digits)
Using B1=3301, B2=229939, polynomial x^1, A=292897222300654795048417351458499833714895857628156011078988080472621879897670335421898676171177982
Step 1 took 108ms
Step 2 took 84ms
********** Factor found in step 2: 14143189112952632419639
Found prime factor of 23 digits: 14143189112952632419639
Prime cofactor (2^347-1)/14143189112952632419639 has 83 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 911962091 (9 digits)
Using B1=50000, B2=12746592, polynomial x^2, sigma=2:14
Step 1 took 188ms
Step 2 took 184ms
********** Factor found in step 2: 911962091
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 911962091 (9 digits)
Using B1=1297, B2=1831, polynomial x^1, sigma=2:3
Step 1 took 4ms
Step 2 took 4ms
********** Factor found in step 2: 911962091
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 291310394389387 (15 digits)
********** Factor found in step 1: 291310394389387
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 4294967279 (10 digits)
********** Factor found in step 1: 4294967279
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 458903930815802071188998938170281707063809443792768383215233 (60 digits)
Using B1=10000, B2=1873422, polynomial x^1, sigma=3:42
Step 1 took 152ms
Step 2 took 160ms
********** Factor found in step 2: 5422968571
Found prime factor of 10 digits: 5422968571
Prime cofactor 84622273724735933231540562835816167053314357811123 has 50 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^349-1 (106 digits)
Using B1=587, B2=29383, polynomial x^1, sigma=3:13
Step 1 took 16ms
Step 2 took 32ms
********** Factor found in step 2: 1779973928671
Found prime factor of 13 digits: 1779973928671
Composite cofactor (2^349-1)/1779973928671 has 93 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^347-1 (105 digits)
Using B1=3301, B2=229939, polynomial x^1, sigma=3:1097
Step 1 took 96ms
Step 2 took 92ms
********** Factor found in step 2: 14143189112952632419639
Found prime factor of 23 digits: 14143189112952632419639
Prime cofactor (2^347-1)/14143189112952632419639 has 83 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is Phi(101,30) (148 digits)
Using B1=100000, B2=40868532, polynomial x^2, sigma=0:12023436370081639188
Step 1 took 5924ms
Step 2 took 3004ms
********** Factor found in step 2: 7477880583756995608969
Found prime factor of 22 digits: 7477880583756995608969
Prime cofactor (Phi(101,30))/7477880583756995608969 has 126 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 1+Phi(102,1) (1 digits)
********** Factor found in step 1: 2
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is Phi(101,1) (3 digits)
Using B1=100000, B2=40868532, polynomial x^2, sigma=0:12023436370081639188
Step 1 took 0ms
********** Factor found in step 1: 101
Found input number N
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 17+Phi(1,2) (2 digits)
********** Factor found in step 1: 2
Found prime factor of 1 digits: 2
Composite cofactor (17+Phi(1,2))/2 has 1 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^567-181 (171 digits)
Using B1=11000, B2=1873422, polynomial x^1, sigma=0:2521899833399249862
Step 1 took 772ms
Step 2 took 488ms
********** Factor found in step 2: 844252244688192311
Found prime factor of 18 digits: 844252244688192311
Prime cofactor (2^567-181)/844252244688192311 has 153 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^600-93 (181 digits)
Using B1=11000, B2=1873422, polynomial x^1, sigma=0:8302474899089961032
Step 1 took 856ms
Step 2 took 528ms
********** Factor found in step 2: 1072666965308872111
Found prime factor of 19 digits: 1072666965308872111
Composite cofactor (2^600-93)/1072666965308872111 has 163 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^654-53 (197 digits)
Using B1=11000, B2=1873422, polynomial x^1, sigma=0:15038331775204443632
Step 1 took 1272ms
Step 2 took 620ms
********** Factor found in step 2: 963625272019
Found prime factor of 12 digits: 963625272019
Composite cofactor (2^654-53)/963625272019 has 185 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^753-511 (227 digits)
Using B1=11000, B2=1873422, polynomial x^1, sigma=0:282111327134773146
Step 1 took 1612ms
Step 2 took 752ms
********** Factor found in step 2: 29323158113225054861
Found prime factor of 20 digits: 29323158113225054861
Composite cofactor (2^753-511)/29323158113225054861 has 208 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^789-91 (238 digits)
Using B1=11000, B2=1873422, polynomial x^1, sigma=0:5564144145207154979
Step 1 took 1716ms
Step 2 took 792ms
********** Factor found in step 2: 25092305624788007621
Found prime factor of 20 digits: 25092305624788007621
Composite cofactor (2^789-91)/25092305624788007621 has 219 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^850-251 (256 digits)
Using B1=11000, B2=1873422, polynomial x^1, sigma=0:1755119194409032967
Step 1 took 1984ms
Step 2 took 884ms
********** Factor found in step 2: 1372862663371153
Found prime factor of 16 digits: 1372862663371153
Composite cofactor (2^850-251)/1372862663371153 has 241 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^931-19 (281 digits)
Using B1=11000, B2=1873422, polynomial x^1, sigma=0:17749056889950488599
Step 1 took 2372ms
Step 2 took 1028ms
********** Factor found in step 2: 4368402493133786311
Found prime factor of 19 digits: 4368402493133786311
Composite cofactor (2^931-19)/4368402493133786311 has 262 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^987-105 (298 digits)
Using B1=11000, B2=1684420, polynomial x^1, sigma=0:9642611678409500628
Step 1 took 2540ms
********** Factor found in step 1: 284503485228187
Found prime factor of 15 digits: 284503485228187
Composite cofactor (2^987-105)/284503485228187 has 283 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^1025-13 (309 digits)
Using B1=11000, B2=1684420, polynomial x^1, sigma=0:15565298209539150294
Step 1 took 2896ms
********** Factor found in step 1: 5582148011358049363
Found prime factor of 19 digits: 5582148011358049363
Composite cofactor (2^1025-13)/5582148011358049363 has 290 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^1123-1 (339 digits)
Using B1=11000, B2=1684420, polynomial x^1, sigma=0:13488386679529262989
Step 1 took 1280ms
Step 2 took 1064ms
********** Factor found in step 2: 777288435261989969
Found prime factor of 18 digits: 777288435261989969
Composite cofactor (2^1123-1)/777288435261989969 has 321 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^1200-765 (362 digits)
Using B1=11000, B2=1684420, polynomial x^1, sigma=0:15594604713796776382
Step 1 took 3436ms
Step 2 took 1204ms
********** Factor found in step 2: 11026018946216941
Found prime factor of 17 digits: 11026018946216941
Composite cofactor (2^1200-765)/11026018946216941 has 346 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^1234-77 (372 digits)
Using B1=11000, B2=1684420, polynomial x^1, sigma=0:15792336214697966869
Step 1 took 3628ms
********** Factor found in step 1: 11093876941849597417147
Found prime factor of 23 digits: 11093876941849597417147
Composite cofactor (2^1234-77)/11093876941849597417147 has 350 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^1123-1 (339 digits)
Using B1=11000, B2=1684420, polynomial x^1, sigma=0:13488386679529262989
Step 1 took 1280ms
Step 2 took 1068ms
********** Factor found in step 2: 777288435261989969
Found prime factor of 18 digits: 777288435261989969
Composite cofactor (2^1123-1)/777288435261989969 has 321 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^753-511 (227 digits)
Using B1=11000, B2=1873422, polynomial x^1, sigma=0:38270210
Step 1 took 1604ms
Step 2 took 744ms
********** Factor found in step 2: 29323158113225054861
Found prime factor of 20 digits: 29323158113225054861
Composite cofactor (2^753-511)/29323158113225054861 has 208 digits
Run 2 out of 2:
Using B1=11000, B2=1873422, polynomial x^1, sigma=0:38270210
Step 1 took 1368ms
Step 2 took 664ms
Warning, for multiple -go options, only the last one is taken into account.
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^1123-1 (339 digits)
Using B1=11000, B2=1684420, polynomial x^1, sigma=0:13488386679529262989
Step 1 took 1280ms
Step 2 took 1064ms
********** Factor found in step 2: 777288435261989969
Found prime factor of 18 digits: 777288435261989969
Composite cofactor (2^1123-1)/777288435261989969 has 321 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Warning: -sigma, -param, -A and -x0 parameters are
ignored when resuming from save files.
Resuming ECM residue saved with Prime95
Input number is 0x2BA2CB2D2B2B53F996E46EB8A8A77F99BD1FF5C7DDE2C59A371A0B3BAF2337D599C4EF67BAE800CC819B18B3247A51CC43AA8C5280D8D3B2C2E329990409761164A109DB965B7C986395967BFCAA52930DC46137E82CA3BB57AAA7FFF7432EC7E4D93EB319ACB2CEA29 (254 digits)
Using B1=11000, B2=1873422, polynomial x^1, sigma=0:4985522057933944
Step 1 took 888ms
Step 2 took 828ms
777288435261989969 (2^1123-1)/777288435261989969
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 1507390577...2382984903 (2102 digits)
Using B1=2000, B2=161290, polynomial x^1, sigma=0:4702936202311981741
Step 1 took 10016ms
Step 2 took 4244ms
********** Factor found in step 2: 16878561691657
Found prime factor of 14 digits: 16878561691657
Composite cofactor 893079993883987997044029853814446540544841880489068175532308590516283399894428906001241393376535068355358731421053501547251274189304147796679814834939914873329985775130922420022944756430881652127342975514576807439015513270974814280253104717261110382874817505201135856074002747031723711830264379411365445852722757551393646795959240203356281101734013641113481869604257777016939050616722280378742466173175791946482899378353363567163513318262839700099726918375479688061897247089995557126849014800195620642300527490277869382004005056594334742835468734683009496475123849443799502217922440177523459877945650988659007701601715006029928616000215402284301846798378981015112271856265061166998639661149681876638202104692762407879987513171890599567071965637763277409990060292516907438831096989495691950103035564991012473923540868297667613025515154776267966722270211939240433029719817554611793822311671354434904031590285345508600613783093831262643744614086915091927191077805323786259756746519885428065145992031554641913815214643880766925864112676247640739063435429443839106682392502488318260756918179668431742133457996980248925578851035416915820161458351909160122988492217773068821503772372280433357541886034962652252088096397725358561474590222533010072166826335815741298277808993849951602427468604594929066596725675543309449398945281057655495218381752414184854803572455977188635089360752696907605980819208003011649129158620946273131701979376338933937264186971607020293869840531266962504705420330531787972678603329772011441190895026189308256480786624156324057691919706065437807479821997744357888594342492774957847000820139257989697107888023967000578635058621238555793770649810333199533273539396369500696032263057929090060949905112353525516560954507369025117440811741127059665438856803505960904381872306235288763534106977007826361258268702136187960705428442356664210771911897256323800282075837525367906738005583954534967374599422699667342844283499875128757118417399458709256225811532443273449513099819857454136886631212516419830662030221332182883992894719096144833284325148601812278955521300006081792079 has 2088 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^1123-1 (339 digits)
Using B1=11000, B2=1684420, polynomial x^1, sigma=0:13488386679529262989
Step 1 took 3104ms
Step 2 took 1160ms
********** Factor found in step 2: 777288435261989969
Found prime factor of 18 digits: 777288435261989969
Composite cofactor (2^1123-1)/777288435261989969 has 321 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^1123-1 (339 digits)
Using B1=11000, B2=1684420, polynomial x^1, sigma=0:13488386679529262989
Step 1 took 1280ms
Step 2 took 1152ms
********** Factor found in step 2: 777288435261989969
Found prime factor of 18 digits: 777288435261989969
Composite cofactor (2^1123-1)/777288435261989969 has 321 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is ((173^173+1)/174)/471462511391940575680645418941 (356 digits)
Using B1=20000, B2=3726670, polynomial x^1, sigma=0:12345
Step 1 took 6052ms
Step 2 took 2024ms
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is ((173^173+1)/174)/471462511391940575680645418941+122 (356 digits)
Using B1=20000, B2=3726670, polynomial x^1, sigma=0:77
Step 1 took 6048ms
Step 2 took 2044ms
********** Factor found in step 2: 289032185854443337
Found prime factor of 18 digits: 289032185854443337
Composite cofactor (((173^173+1)/174)/471462511391940575680645418941+122)/289032185854443337 has 338 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2050449353925555290706354283 (28 digits)
Using B1=3, B2=12, polynomial x^1, sigma=0:7
Step 1 took 0ms
Step 2 took 0ms
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2^3900-77 (1175 digits)
Using B1=600, B2=24246, polynomial x^1, sigma=0:1167435750
Step 1 took 1376ms
Step 2 took 1220ms
********** Factor found in step 2: 4061021
Found prime factor of 7 digits: 4061021
Composite cofactor (2^3900-77)/4061021 has 1168 digits
GMP-ECM 7.0.1 [configured with GMP 6.1.0] [ECM]
Input number is 2050449353925555290706354283 (28 digits)
Using B1=30, B2=308, polynomial x^1, sigma=0:7
Step 1 took 0ms
Step 2 took 4ms
Usage: ecm [options] B1 [[B2min-]B2] < file
Parameters:
B1 stage 1 bound
B2 stage 2 bound (or interval B2min-B2max)
Options:
-x0 x use x as initial point
-y0 y use y as initial point (Weierstrass form)
-param i which parametrization should be used [ecm]
-sigma s use s as parameter to compute curve's coefficients
can use -sigma i:s to specify -param i at the same time [ecm]
-A A use A as a curve coefficient [ecm, see README]
-torsion T to generate a curve with torsion group T [ecm, see README]
-k n perform >= n steps in stage 2
-power n use x^n for Brent-Suyama's extension
-dickson n use n-th Dickson's polynomial for Brent-Suyama's extension
-c n perform n runs for each input
-pm1 perform P-1 instead of ECM
-pp1 perform P+1 instead of ECM
-q quiet mode
-v verbose mode
-timestamp print a time stamp with each number
-mpzmod use GMP's mpz_mod for modular reduction
-modmuln use Montgomery's MODMULN for modular reduction
-redc use Montgomery's REDC for modular reduction
-nobase2 disable special base-2 code
-nobase2s2 disable special base-2 code in ecm stage 2 only
-base2 n force base 2 mode with 2^n+1 (n>0) or 2^|n|-1 (n<0)
-ntt enable NTT convolution routines in stage 2
-no-ntt disable NTT convolution routines in stage 2
-save file save residues at end of stage 1 to file
-savea file like -save, appends to existing files
-resume file resume residues from file, reads from stdin if file is "-"
-chkpnt file save periodic checkpoints during stage 1 to file
-primetest perform a primality test on input
-treefile f [ECM only] store stage 2 data in files f.0, ...
-maxmem n use at most n MB of memory in stage 2
-stage1time n add n seconds to ECM stage 1 time (for expected time est.)
-I f increment B1 by f*sqrt(B1) on each run
-inp file Use file as input (instead of redirecting stdin)
-one Stop processing a candidate if a factor is found (looping mode)
-go val Preload with group order val, which can be a simple expression,
or can use N as a placeholder for the number being factored.
-printconfig Print compile-time configuration and exit.
-bsaves file With -param 1-3, save stage 1 exponent in file.
-bloads file With -param 1-3, load stage 1 exponent from file.
-h, --help Prints this help and exit.
Tuning parameters from arm/params.h
All ECM tests are ok.
make[1]: Leaving directory '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds/_build'
fakeroot debian/rules binary-arch
dh binary-arch --with autoreconf --builddirectory=_build --parallel
dh_testroot -a -O--builddirectory=_build -O--parallel
dh_prep -a -O--builddirectory=_build -O--parallel
dh_auto_install -a -O--builddirectory=_build -O--parallel
make -j4 install DESTDIR=/<<BUILDDIR>>/gmp-ecm-7.0.1\+ds/debian/tmp AM_UPDATE_INFO_DIR=no
make[1]: Entering directory '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds/_build'
make[2]: Entering directory '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds/_build'
make[3]: Entering directory '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds/_build'
/bin/mkdir -p '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds/debian/tmp/usr/lib/arm-linux-gnueabihf'
/bin/bash ./libtool --mode=install /usr/bin/install -c libecm.la '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds/debian/tmp/usr/lib/arm-linux-gnueabihf'
/bin/mkdir -p '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds/debian/tmp/usr/share/man/man1'
/bin/mkdir -p '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds/debian/tmp/usr/include'
/usr/bin/install -c -m 644 ecm.h '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds/debian/tmp/usr/include'
/usr/bin/install -c -m 644 ../ecm.1 '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds/debian/tmp/usr/share/man/man1'
libtool: install: /usr/bin/install -c .libs/libecm.so.1.0.0 /<<BUILDDIR>>/gmp-ecm-7.0.1+ds/debian/tmp/usr/lib/arm-linux-gnueabihf/libecm.so.1.0.0
libtool: install: (cd /<<BUILDDIR>>/gmp-ecm-7.0.1+ds/debian/tmp/usr/lib/arm-linux-gnueabihf && { ln -s -f libecm.so.1.0.0 libecm.so.1 || { rm -f libecm.so.1 && ln -s libecm.so.1.0.0 libecm.so.1; }; })
libtool: install: (cd /<<BUILDDIR>>/gmp-ecm-7.0.1+ds/debian/tmp/usr/lib/arm-linux-gnueabihf && { ln -s -f libecm.so.1.0.0 libecm.so || { rm -f libecm.so && ln -s libecm.so.1.0.0 libecm.so; }; })
libtool: install: /usr/bin/install -c .libs/libecm.lai /<<BUILDDIR>>/gmp-ecm-7.0.1+ds/debian/tmp/usr/lib/arm-linux-gnueabihf/libecm.la
libtool: install: /usr/bin/install -c .libs/libecm.a /<<BUILDDIR>>/gmp-ecm-7.0.1+ds/debian/tmp/usr/lib/arm-linux-gnueabihf/libecm.a
libtool: install: chmod 644 /<<BUILDDIR>>/gmp-ecm-7.0.1+ds/debian/tmp/usr/lib/arm-linux-gnueabihf/libecm.a
libtool: install: ranlib /<<BUILDDIR>>/gmp-ecm-7.0.1+ds/debian/tmp/usr/lib/arm-linux-gnueabihf/libecm.a
libtool: warning: remember to run 'libtool --finish /usr/lib/arm-linux-gnueabihf'
/bin/mkdir -p '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds/debian/tmp/usr/bin'
/bin/bash ./libtool --mode=install /usr/bin/install -c ecm '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds/debian/tmp/usr/bin'
libtool: warning: 'libecm.la' has not been installed in '/usr/lib/arm-linux-gnueabihf'
libtool: install: /usr/bin/install -c .libs/ecm /<<BUILDDIR>>/gmp-ecm-7.0.1+ds/debian/tmp/usr/bin/ecm
make[3]: Leaving directory '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds/_build'
make[2]: Leaving directory '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds/_build'
make[1]: Leaving directory '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds/_build'
dh_install -a -O--builddirectory=_build -O--parallel
debian/rules override_dh_installdocs
make[1]: Entering directory '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds'
dh_installdocs -plibecm1-dev --link-doc=libecm1-dev-common
dh_installdocs: WARNING: --link-doc between architecture all and not all packages breaks binNMUs
dh_installdocs --remaining-packages
make[1]: Leaving directory '/<<BUILDDIR>>/gmp-ecm-7.0.1+ds'
dh_installchangelogs -a -O--builddirectory=_build -O--parallel
dh_installexamples -a -O--builddirectory=_build -O--parallel
dh_installman -a -O--builddirectory=_build -O--parallel
dh_lintian -a -O--builddirectory=_build -O--parallel
dh_perl -a -O--builddirectory=_build -O--parallel
dh_link -a -O--builddirectory=_build -O--parallel
dh_strip_nondeterminism -a -O--builddirectory=_build -O--parallel
dh_compress -a -O--builddirectory=_build -O--parallel
dh_fixperms -a -O--builddirectory=_build -O--parallel
dh_strip -a -O--builddirectory=_build -O--parallel
dh_makeshlibs -a -O--builddirectory=_build -O--parallel
dh_shlibdeps -a -O--builddirectory=_build -O--parallel
dpkg-shlibdeps: warning: package could avoid a useless dependency if debian/gmp-ecm/usr/bin/ecm was not linked against librt.so.1 (it uses none of the library's symbols)
dpkg-shlibdeps: warning: package could avoid a useless dependency if debian/libecm1/usr/lib/arm-linux-gnueabihf/libecm.so.1.0.0 was not linked against librt.so.1 (it uses none of the library's symbols)
dh_installdeb -a -O--builddirectory=_build -O--parallel
dh_gencontrol -a -O--builddirectory=_build -O--parallel
dpkg-gencontrol: warning: File::FcntlLock not available; using flock which is not NFS-safe
dpkg-gencontrol: warning: File::FcntlLock not available; using flock which is not NFS-safe
dpkg-gencontrol: warning: File::FcntlLock not available; using flock which is not NFS-safe
dpkg-gencontrol: warning: File::FcntlLock not available; using flock which is not NFS-safe
dpkg-gencontrol: warning: File::FcntlLock not available; using flock which is not NFS-safe
dh_md5sums -a -O--builddirectory=_build -O--parallel
dh_builddeb -a -O--builddirectory=_build -O--parallel
dpkg-deb: building package 'libecm1-dbgsym' in '../libecm1-dbgsym_7.0.1+ds-2_armhf.deb'.
dpkg-deb: building package 'gmp-ecm-dbgsym' in '../gmp-ecm-dbgsym_7.0.1+ds-2_armhf.deb'.
dpkg-deb: building package 'libecm1-dev' in '../libecm1-dev_7.0.1+ds-2_armhf.deb'.
dpkg-deb: building package 'libecm1' in '../libecm1_7.0.1+ds-2_armhf.deb'.
dpkg-deb: building package 'gmp-ecm' in '../gmp-ecm_7.0.1+ds-2_armhf.deb'.
dpkg-genchanges --build=any -mRaspbian wandboard test autobuilder <root@raspbian.org> >../gmp-ecm_7.0.1+ds-2_armhf.changes
dpkg-genchanges: warning: package libecm1-dbgsym listed in files list but not in control info
dpkg-genchanges: warning: package gmp-ecm-dbgsym listed in files list but not in control info
dpkg-genchanges: info: binary-only arch-specific upload (source code and arch-indep packages not included)
dpkg-source --after-build gmp-ecm-7.0.1+ds
dpkg-buildpackage: info: binary-only upload (no source included)
--------------------------------------------------------------------------------
Build finished at 20160621-0535
Finished
--------
I: Built successfully
+------------------------------------------------------------------------------+
| Post Build Chroot |
+------------------------------------------------------------------------------+
+------------------------------------------------------------------------------+
| Changes |
+------------------------------------------------------------------------------+
gmp-ecm_7.0.1+ds-2_armhf.changes:
---------------------------------
Format: 1.8
Date: Wed, 15 Jun 2016 14:00:32 +0000
Source: gmp-ecm
Binary: gmp-ecm libecm1 libecm1-dev libecm1-dev-common libecm-dev
Architecture: armhf
Version: 7.0.1+ds-2
Distribution: stretch-staging
Urgency: medium
Maintainer: Raspbian wandboard test autobuilder <root@raspbian.org>
Changed-By: Jerome Benoit <calculus@rezozer.net>
Description:
gmp-ecm - Factor integers using the Elliptic Curve Method
libecm-dev - dummy package
libecm1 - factor integers using the Elliptic Curve Method -- lib
libecm1-dev - factor integers using the Elliptic Curve Method -- libdev
libecm1-dev-common - factor integers using the Elliptic Curve Method -- header
Closes: 827034
Changes:
gmp-ecm (7.0.1+ds-2) unstable; urgency=medium
.
* FTBFS[s390x] fix release (Closes: #827034), ad hoc workaround a gcc-5 bug
not fully isolated.
* Debianization:
- debian/rules, force -O3 option.
Checksums-Sha1:
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eb173156afeaa0e681e4cf03dcb6997718a7a85a 235952 gmp-ecm_7.0.1+ds-2_armhf.deb
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04afa5754460b79bd511ade66e7dd120 276114 debug extra libecm1-dbgsym_7.0.1+ds-2_armhf.deb
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afe8725bf3fd2d94abd05ed1b03b19a6 290936 libs optional libecm1_7.0.1+ds-2_armhf.deb
+------------------------------------------------------------------------------+
| Package contents |
+------------------------------------------------------------------------------+
gmp-ecm-dbgsym_7.0.1+ds-2_armhf.deb
-----------------------------------
new debian package, version 2.0.
size 524890 bytes: control archive=486 bytes.
418 bytes, 13 lines control
106 bytes, 1 lines md5sums
Package: gmp-ecm-dbgsym
Source: gmp-ecm
Version: 7.0.1+ds-2
Architecture: armhf
Maintainer: Debian Science Maintainers <debian-science-maintainers@lists.alioth.debian.org>
Installed-Size: 550
Depends: gmp-ecm (= 7.0.1+ds-2)
Section: debug
Priority: extra
Homepage: http://ecm.gforge.inria.fr/
Description: Debug symbols for gmp-ecm
Auto-Built-Package: debug-symbols
Build-Ids: ae79b55fb6d04bee497242f8bdb0559b915f06d9
drwxr-xr-x root/root 0 2016-06-21 05:35 ./
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/lib/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/lib/debug/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/lib/debug/.build-id/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/lib/debug/.build-id/ae/
-rw-r--r-- root/root 552820 2016-06-21 05:34 ./usr/lib/debug/.build-id/ae/79b55fb6d04bee497242f8bdb0559b915f06d9.debug
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/share/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/share/doc/
lrwxrwxrwx root/root 0 2016-06-21 05:34 ./usr/share/doc/gmp-ecm-dbgsym -> gmp-ecm
gmp-ecm_7.0.1+ds-2_armhf.deb
----------------------------
new debian package, version 2.0.
size 235952 bytes: control archive=1267 bytes.
1297 bytes, 30 lines control
653 bytes, 10 lines md5sums
Package: gmp-ecm
Version: 7.0.1+ds-2
Architecture: armhf
Maintainer: Debian Science Maintainers <debian-science-maintainers@lists.alioth.debian.org>
Installed-Size: 420
Depends: libc6 (>= 2.7), libecm1, libgmp10 (>= 2:6.0)
Breaks: ecm (<< 1.00-2)
Replaces: ecm (<< 1.00-2)
Section: math
Priority: optional
Multi-Arch: foreign
Homepage: http://ecm.gforge.inria.fr/
Description: Factor integers using the Elliptic Curve Method
gmp-ecm is a free implementation of the Elliptic Curve Method (ECM)
for integer factorization.
.
The original purpose of the ECMNET project was to make Richard Brent's
prediction true, i.e. to find a factor of 50 digits or more by
ECM. This goal was attained on September 14, 1998, when Conrad Curry
found a 53-digit factor of 2^677-1 c150 using George Woltman's mprime
program. The new goal of ECMNET is now to find other large factors by
ecm, mainly by contributing to the Cunningham project, most likely the
longest, ongoing computational project in history according to Bob
Silverman. A new record was set by Nik Lygeros and Michel Mizony, who
found in December 1999 a prime factor of 54 digits using GMP-ECM.
.
See http://www.loria.fr/~zimmerma/records/ecmnet.html for more
information about ecmnet.
.
This package provides the command line utility.
drwxr-xr-x root/root 0 2016-06-21 05:34 ./
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/bin/
-rwxr-xr-x root/root 256552 2016-06-21 05:34 ./usr/bin/ecm
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/share/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/share/doc/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/share/doc/gmp-ecm/
-rw-r--r-- root/root 1758 2016-06-02 00:54 ./usr/share/doc/gmp-ecm/AUTHORS
-rw-r--r-- root/root 5465 2016-06-02 00:54 ./usr/share/doc/gmp-ecm/NEWS.gz
-rw-r--r-- root/root 13694 2016-06-02 00:54 ./usr/share/doc/gmp-ecm/README.gz
-rw-r--r-- root/root 3749 2016-06-15 14:48 ./usr/share/doc/gmp-ecm/changelog.Debian.gz
-rw-r--r-- root/root 119919 2016-06-02 00:54 ./usr/share/doc/gmp-ecm/changelog.gz
-rw-r--r-- root/root 6345 2016-06-02 00:51 ./usr/share/doc/gmp-ecm/copyright
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/share/doc/gmp-ecm/examples/
-rw-r--r-- root/root 156 2016-06-02 00:51 ./usr/share/doc/gmp-ecm/examples/c155
-rw-r--r-- root/root 271 2016-06-02 00:51 ./usr/share/doc/gmp-ecm/examples/c270
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/share/man/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/share/man/man1/
-rw-r--r-- root/root 5044 2016-06-21 05:34 ./usr/share/man/man1/ecm.1.gz
lrwxrwxrwx root/root 0 2016-06-21 05:34 ./usr/share/man/man1/gmp-ecm.1.gz -> ecm.1.gz
libecm1-dbgsym_7.0.1+ds-2_armhf.deb
-----------------------------------
new debian package, version 2.0.
size 276114 bytes: control archive=502 bytes.
435 bytes, 14 lines control
106 bytes, 1 lines md5sums
Package: libecm1-dbgsym
Source: gmp-ecm
Version: 7.0.1+ds-2
Architecture: armhf
Maintainer: Debian Science Maintainers <debian-science-maintainers@lists.alioth.debian.org>
Installed-Size: 298
Depends: libecm1 (= 7.0.1+ds-2)
Section: debug
Priority: extra
Multi-Arch: same
Homepage: http://ecm.gforge.inria.fr/
Description: Debug symbols for libecm1
Auto-Built-Package: debug-symbols
Build-Ids: 8a1dd9949c33694bcf6a7878e4324e31ea79c7b5
drwxr-xr-x root/root 0 2016-06-21 05:35 ./
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/lib/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/lib/debug/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/lib/debug/.build-id/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/lib/debug/.build-id/8a/
-rw-r--r-- root/root 294848 2016-06-21 05:34 ./usr/lib/debug/.build-id/8a/1dd9949c33694bcf6a7878e4324e31ea79c7b5.debug
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/share/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/share/doc/
lrwxrwxrwx root/root 0 2016-06-21 05:34 ./usr/share/doc/libecm1-dbgsym -> libecm1
libecm1-dev_7.0.1+ds-2_armhf.deb
--------------------------------
new debian package, version 2.0.
size 170996 bytes: control archive=995 bytes.
1382 bytes, 32 lines control
71 bytes, 1 lines md5sums
Package: libecm1-dev
Source: gmp-ecm
Version: 7.0.1+ds-2
Architecture: armhf
Maintainer: Debian Science Maintainers <debian-science-maintainers@lists.alioth.debian.org>
Installed-Size: 567
Depends: libecm1 (= 7.0.1+ds-2), libecm1-dev-common (= 7.0.1+ds-2), libgmp-dev
Breaks: libecm0-dev
Replaces: libecm0-dev
Section: libdevel
Priority: optional
Multi-Arch: same
Homepage: http://ecm.gforge.inria.fr/
Description: factor integers using the Elliptic Curve Method -- libdev
gmp-ecm is a free implementation of the Elliptic Curve Method (ECM)
for integer factorization.
.
The original purpose of the ECMNET project was to make Richard Brent's
prediction true, i.e. to find a factor of 50 digits or more by
ECM. This goal was attained on September 14, 1998, when Conrad Curry
found a 53-digit factor of 2^677-1 c150 using George Woltman's mprime
program. The new goal of ECMNET is now to find other large factors by
ecm, mainly by contributing to the Cunningham project, most likely the
longest, ongoing computational project in history according to Bob
Silverman. A new record was set by Nik Lygeros and Michel Mizony, who
found in December 1999 a prime factor of 54 digits using GMP-ECM.
.
See http://www.loria.fr/~zimmerma/records/ecmnet.html for more
information about ecmnet.
.
This package provides the static library and symbolic links needed
for development.
drwxr-xr-x root/root 0 2016-06-21 05:35 ./
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/lib/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/lib/arm-linux-gnueabihf/
-rw-r--r-- root/root 570704 2016-06-21 05:34 ./usr/lib/arm-linux-gnueabihf/libecm.a
lrwxrwxrwx root/root 0 2016-06-21 05:34 ./usr/lib/arm-linux-gnueabihf/libecm.so -> libecm.so.1.0.0
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/share/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/share/doc/
lrwxrwxrwx root/root 0 2016-06-21 05:34 ./usr/share/doc/libecm1-dev -> libecm1-dev-common
libecm1_7.0.1+ds-2_armhf.deb
----------------------------
new debian package, version 2.0.
size 290936 bytes: control archive=1300 bytes.
1252 bytes, 29 lines control
557 bytes, 8 lines md5sums
17 bytes, 1 lines shlibs
60 bytes, 2 lines triggers
Package: libecm1
Source: gmp-ecm
Version: 7.0.1+ds-2
Architecture: armhf
Maintainer: Debian Science Maintainers <debian-science-maintainers@lists.alioth.debian.org>
Installed-Size: 587
Depends: libc6 (>= 2.4), libgmp10 (>= 2:6.0)
Section: libs
Priority: optional
Multi-Arch: same
Homepage: http://ecm.gforge.inria.fr/
Description: factor integers using the Elliptic Curve Method -- lib
gmp-ecm is a free implementation of the Elliptic Curve Method (ECM)
for integer factorization.
.
The original purpose of the ECMNET project was to make Richard Brent's
prediction true, i.e. to find a factor of 50 digits or more by
ECM. This goal was attained on September 14, 1998, when Conrad Curry
found a 53-digit factor of 2^677-1 c150 using George Woltman's mprime
program. The new goal of ECMNET is now to find other large factors by
ecm, mainly by contributing to the Cunningham project, most likely the
longest, ongoing computational project in history according to Bob
Silverman. A new record was set by Nik Lygeros and Michel Mizony, who
found in December 1999 a prime factor of 54 digits using GMP-ECM.
.
See http://www.loria.fr/~zimmerma/records/ecmnet.html for more
information about ecmnet.
.
This package provides the shared library.
drwxr-xr-x root/root 0 2016-06-21 05:34 ./
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/lib/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/lib/arm-linux-gnueabihf/
lrwxrwxrwx root/root 0 2016-06-21 05:34 ./usr/lib/arm-linux-gnueabihf/libecm.so.1 -> libecm.so.1.0.0
-rw-r--r-- root/root 444940 2016-06-21 05:34 ./usr/lib/arm-linux-gnueabihf/libecm.so.1.0.0
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/share/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/share/doc/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/share/doc/libecm1/
-rw-r--r-- root/root 1758 2016-06-02 00:54 ./usr/share/doc/libecm1/AUTHORS
-rw-r--r-- root/root 5465 2016-06-02 00:54 ./usr/share/doc/libecm1/NEWS.gz
-rw-r--r-- root/root 386 2016-06-02 00:51 ./usr/share/doc/libecm1/README.Debian
-rw-r--r-- root/root 3749 2016-06-15 14:48 ./usr/share/doc/libecm1/changelog.Debian.gz
-rw-r--r-- root/root 119919 2016-06-02 00:54 ./usr/share/doc/libecm1/changelog.gz
-rw-r--r-- root/root 6345 2016-06-02 00:51 ./usr/share/doc/libecm1/copyright
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/share/lintian/
drwxr-xr-x root/root 0 2016-06-21 05:34 ./usr/share/lintian/overrides/
-rw-r--r-- root/root 883 2016-06-02 00:51 ./usr/share/lintian/overrides/libecm1
+------------------------------------------------------------------------------+
| Post Build |
+------------------------------------------------------------------------------+
+------------------------------------------------------------------------------+
| Cleanup |
+------------------------------------------------------------------------------+
Purging /<<BUILDDIR>>
Not cleaning session: cloned chroot in use
+------------------------------------------------------------------------------+
| Summary |
+------------------------------------------------------------------------------+
Build Architecture: armhf
Build-Space: 30828
Build-Time: 1485
Distribution: stretch-staging
Host Architecture: armhf
Install-Time: 295
Job: gmp-ecm_7.0.1+ds-2
Machine Architecture: armhf
Package: gmp-ecm
Package-Time: 1823
Source-Version: 7.0.1+ds-2
Space: 30828
Status: successful
Version: 7.0.1+ds-2
--------------------------------------------------------------------------------
Finished at 20160621-0535
Build needed 00:30:23, 30828k disc space