fond of a factor? Turn yourself in to become inane
M77224867 as a factor; 39977700267067630681
(this is my first find) 
Any result beats nothing...
[QUOTE=firejuggler;231558]M77224867 as a factor; 39977700267067630681
(this is my first find)[/QUOTE] M74598451 has a factor: 503061816963520412903 I know how you feel. After my first two months of "No Factor Found" and "M4xxxxxxxx is not prime", I was thrilled to get my first "success" by finding a factor. Then nothing for another month, followed by 5 in one week. 
M90283087 has a factor: 2751173282304003942331209643538752923223 :big grin:

2751173282304003942331209643538752923223 = 38558349368410981273 x 71350909138188087151

My latest factors by P1 & TF:
M3060583 has a factor: 1691625283125322626439 M4494167 has a factor: 4090602041154466841 
My computer found the following results:
M120247 has a factor: 3250729890896242123679136285673 M200699 has a factor: 2560666376539295663544430207 M200723 has a factor: 88198734084915533896490498039 M244399 has a factor: 83084225896273645625002009 M253367 has a factor: 428118424378877527039271 M332273 has a factor: 32421566974480515508133113 M334177 has a factor: 699159963919259251767503 M334297 has a factor: 776286699004616614664844151 M334331 has a factor: 531598022680052134178237519 M334421 has a factor: 881767740830242233411702927457 M335953 has a factor: 300256724398460836714288247 M666269 has a factor: 599492540010920523991 M999631 has a factor: 182642107636183257011857 I think that at this time there are no more prime factors with less than 64 bits of unfactored Mersenne numbers with the exponent in the range 0  1M. 
[QUOTE=ckdo;231582]M90283087 has a factor: 2751173282304003942331209643538752923223 :big grin:[/QUOTE]Aww, you beat my largest factor...
M52884527 has a factor: 2627817767922406323172685733372671873 Mine is from P1. I have two P1 factors (this being the larger) and a handful of TF, of course none as large as these. I didn't realize P1 work was being done up in the M90XXXXXX range; all of my work has been assigned by Primenet thus far. I'm considering branching out into LMH/etc but for now, sticking with the assignments I get. 
The following exponents have the indicated 58 bit factors:
[code]M( 3321933281 )C: 247169243036792441 M( 3321941023 )C: 257335941907083329 M( 3321941533 )C: 207520199336703217 M( 3321946711 )C: 173831252702387009 M( 3321947353 )C: 211195002096122687 M( 3321947791 )C: 192945856601239487 M( 3321952147 )C: 207085766384122673 M( 3321956731 )C: 284053769851732609 M( 3321958399 )C: 265055977878815729 M( 3321961451 )C: 265406974016828759 M( 3321964949 )C: 173958707488043393 M( 3321968057 )C: 234572555796081983 M( 3321968747 )C: 174438837843717961 M( 3321968813 )C: 162031473823121369 M( 3321970529 )C: 152471776764277769 M( 3321970957 )C: 158899298626885967 M( 3321971503 )C: 171795762921588007 M( 3321971773 )C: 220839634071945041 M( 3321973117 )C: 174763311823447463 M( 3321976067 )C: 151279820244576103 M( 3321979051 )C: 184733188755140279 M( 3321979807 )C: 191218393131095833 M( 3321980647 )C: 202327417168800727 M( 3321982369 )C: 176546613477245503 M( 3321987131 )C: 224007146605813033 M( 3321988843 )C: 228460833239381959 M( 3321989947 )C: 217502541334200791 M( 3321990323 )C: 169528687168781273 M( 3321991681 )C: 203087935003009591 M( 3321992761 )C: 228369329317261481 M( 3321992809 )C: 220645639540210559 M( 3321994223 )C: 246531602737680391 M( 3321997027 )C: 241807984207490543 M( 3321998689 )C: 170234620254279583 M( 3321999797 )C: 203984361226970543 M( 3321999929 )C: 217315342439391439 [/code] 
M433494449 has a factor: 3656480526134520654607

ECM Factor found
M5308217 has a factor: 19389284433827290601

Funny example;
M2371703 has a factor: 172106762886153056494817 The funny part is that k= 2*2*2*2*1049*1811*34469*34631, so 2kp+1 could have been found with B2= 34631 
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