Hello,

   following are the first 10079926 decimals of log(2) .

   I have used the trick used by Euler to manually compute it that is:

   log(2) = log(3/2) + log(4/3)

   I used roughly 400 hours of an 9000/871 160 Mhz

   I used the same format of the previous record for making an easy
   checking of the first 260000 decimals.

   I checked also with my previous 5 millions of decimals but the only
   first 260000 should be considered checked since computed by another
   program .

Amicalement Patrick.


.693147180559945309417232121458176568075500134360255254120680009493393621969\
    694715605863326996418687542001481020570685733685520235758130557032670751\
    635075961930727570828371435190307038623891673471123350115364497955239120\
    475172681574932065155524734139525882950453007095326366642654104239157814\
    952043740430385500801944170641671518644712839968171784546957026271631064\
    546150257207402481637773389638550695260668341137273873722928956493547025\
    762652098859693201965058554764703306793654432547632744951250406069438147\
    104689946506220167720424524529612687946546193165174681392672504103802546\
    259656869144192871608293803172714367782654877566485085674077648451464439\
    940461422603193096735402574446070308096085047486638523138181676751438667\
    476647890881437141985494231519973548803751658612753529166100071053558249\
    879414729509293113897155998205654392871700072180857610252368892132449713\
    893203784393530887748259701715591070882368362758984258918535302436342143\
    6706118923678919237231467232172053401649256872747782344535348

































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