Here is the graph.

This is the standard form that was established when the [URL=http://mersenneforum.org/showpost.php?p=33120&postcount=287]previous[/URL] chart was posted. Some real progress shows up when comparing the 2.

[QUOTE=Uncwilly]Here is the graph.

This is the standard form that was established when the [URL=http://mersenneforum.org/showpost.php?p=33120&postcount=287]previous[/URL] chart was posted. Some real progress shows up when comparing the 2.[/QUOTE]

What do think about, next time, plotting the old and new on the same graph with different colors, so the comparison is easier?

William

I can do that. It will require a change in the way that I track things. I will try it for the next time. Don't be suprised if a peak disappears when a factor is found.

Next graph should be ~4 weeks away.

I'll factor M3321929053 up to 67 bits.

Andres

I'll take also M3321929059 to 67 bits.

Andres

I'll factor
M3321929113
M3321929173
M3321929179
M3321929197
M3321929209 up to 67 bits.

Andres

[QUOTE=Aitsen]I'll factor
M3321929113
M3321929173
M3321929179
M3321929197
M3321929209 up to 67 bits.

Andres[/QUOTE]

Nice work, folks! :-D
Excuse me for not updating the italian page of the search, I've been a bit busy last week ;-)

Andreas, welcome to the team!
Uncwilly, you did a superb job with the graph.
William, again thank you for your continuous monitoring the status of the operation.

I hope I will have some spare time to participate more next week.

Luigi

I'll reserve some more exponents to factor to 67 bits:

M3321929411
M3321929461
M3321929519
M3321929563
M3321929573
M3321929579

I'll also hope to post some results later today.

Andres

Here are finally some results after massive reserving of exponents.

M3321929053 no factor from 2^66 to 2^67.
M3321929059 no factor from 2^66 to 2^67.
M3321929113 no factor from 2^66 to 2^67.
M3321929173 no factor from 2^66 to 2^67.
M3321929197 no factor from 2^66 to 2^67.
M3321929209 no factor from 2^66 to 2^67.

Andres

[QUOTE=Aitsen]Here are finally some results after massive reserving of exponents.

M3321929053 no factor from 2^66 to 2^67.
M3321929059 no factor from 2^66 to 2^67.
M3321929113 no factor from 2^66 to 2^67.
M3321929173 no factor from 2^66 to 2^67.
M3321929197 no factor from 2^66 to 2^67.
M3321929209 no factor from 2^66 to 2^67.

Andres[/QUOTE]

What about M3321929179? :rolleyes:

Luigi

Everything will be announced, when it's ready :smile:
So here are few more results:

M3321929179 no factor from 2^66 to 2^67.
M3321929411 no factor from 2^66 to 2^67.
M3321929461 no factor from 2^66 to 2^67.
M3321929519 no factor from 2^66 to 2^67.

And I'd like to reserve

M3321929617
M3321929759
M3321929789
M3321929827
M3321929909

Cheers,
Andres