The factorization of primorials +/- 1 - Page 7

Joppe_Bos · 2008-01-11, 18:01

After 800 curves with B1=43e6 the following factor was found which completes this number:
P93# -1 = 487# - 1 = the remaining c153 = p45 * p108
p45 = 243810604583099404695859309054374271993455289
p108 = 592902732487179117200767901393074072096217907381402920110153085391261272071452441934015310882547695228770433

Joppe_Bos · 2008-01-29, 13:51

A new factor has been found for the remaining factor of:
P95# - 1 = 499# - 1 = (c197) = p42 * p155
p42 = 812046160972930842046175176626574726520219

And I run:
Done 8000 curves on P92# - 1 with B1=43e6

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2008-01-11, 18:01	#67
Joppe_Bos Apr 2007 2²·3² Posts	After 800 curves with B1=43e6 the following factor was found which completes this number: P93# -1 = 487# - 1 = the remaining c153 = p45 * p108 p45 = 243810604583099404695859309054374271993455289 p108 = 592902732487179117200767901393074072096217907381402920110153085391261272071452441934015310882547695228770433

2008-01-29, 13:51	#68
Joppe_Bos Apr 2007 44₈ Posts	A new factor has been found for the remaining factor of: P95# - 1 = 499# - 1 = (c197) = p42 * p155 p42 = 812046160972930842046175176626574726520219 And I run: Done 8000 curves on P92# - 1 with B1=43e6