[QUOTE=Rde;103476]Yes I am, from time to time :wink:

Dont know when I'll finsih, but I will.[/QUOTE]

Fine! Thanks for your time!

Luigi

So, here are a few more results:

No factors for the following five exponents up to 68 bits:

M3321933113
M3321933179
M3321933193
M3321933289
M3321933313

and

M3321929041 doesnt have a factor between 71 and 72 bits

Thats it for the moment

M3321933361 no factor from 2^66 to 2^71.
M3321933367 no factor from 2^66 to 2^71.
M3321933389 no factor from 2^66 to 2^71.
M3321933451 no factor from 2^66 to 2^71 .
M3321933541 no factor from 2^67 to 2^71.
M3321933551 no factor from 2^66 to 2^71.
M3321933577 no factor from 2^66 to 2^71.
M3321933613 no factor from 2^67 to 2^71.
M3321933661 no factor from 2^66 to 2^71.
M3321933679 no factor from 2^66 to 2^71.
M3321933893 no factor from 2^66 to 2^71.

Exponents released.

Patrick

M3321933289 no factor from 2^68 to 2^71.
M3321933313 no factor from 2^68 to 2^71.

Exponents released.

Patrick

M3321933007 no factor up to 71
M3321933047 no factor up to 71

Hi
Massimo

M3321933113 no factor from 2^68 to 2^71.
M3321933179 no factor from 2^68 to 2^71.
M3321933193 no factor from 2^68 to 2^71.

Exponents released.

Patrick

M3321933337 no factor from 2^69 to 2^71.

Exponent released.

Patrick

Patrick, you reserved 26 (already factored) exponents up to 69.

Did you finish with them? :huh:

Luigi

[QUOTE=Joshua2;45689]Factor Found. Yah!!! My first factor.
M3321931111 has a factor: 1702196773411748730881
Was found searching from 70 to 71[/QUOTE]

[QUOTE=Joshua2;46107]M3321931267 has a factor: 1078901975478791259223[/QUOTE]

[QUOTE=wblipp;46109]1. Did you quit M3321931267 when you found the factor, or continue through 2[sup]70[/sup]?

William[/QUOTE]

[QUOTE=Joshua2;46150]1. I continued through 2^70. (70.023 actually) 69.87 was that factors bit depth. The last factor I found (the one before this) I think I might have stopped as soon as I saw it and not let it continue. Not sure. Should I let it finish that bit depth next time, or no?[/QUOTE]

> 3321931267 70? 1078901975478791259223 Joshua2

The question mark can be removed.

> 3321931111 71 1702196773411748730881 Joshua2

I'll complete the testing of M3321931111 to 71 bits.

Patrick

[QUOTE=ET_;106551]Patrick, you reserved 26 (already factored) exponents up to 69.

Did you finish with them? :huh:

Luigi[/QUOTE]

Yes, I finished with them today, and I'll report my results soon (no further factor found).

Patrick

no factor up to 71 for:

M3321933089
M3321933233
M3321933253

Exponents released

Massimo