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Title: Non Zero Digits:Extension Post by K_Sengupta on Nov 27th, 2005, 10:36pm Prove or disprove, giving sufficient reasons , whether or not there exist a number in Base-2P system (where 3<=P<=17) which is divisible by a number having a magnitude of P^(2P)^3 in the decimal notation such that the former number does not contain a single zero in its base-2P notation. |
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Title: Re: Non Zero Digits:Extension Post by zomcake on Nov 28th, 2005, 4:36pm Let M(m,r)/Curl F(x,y,z)^2-1/x^log(a/b) be the required magnitude, where m,r -> tonsil+ form and x,y,z Union vector space cross product V(a,b,z X m/r)**2 over Golightly fields. Since m < tonsil+ - r, 0 is not part of 2P. But, no element P^log(1/0 -> Curl F(P/a,P/b,P/c) gives up single zero in 2P. QED |
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Title: Re: Non Zero Digits:Extension Post by Michael_Dagg on Nov 28th, 2005, 9:41pm That's some oddball looking mathematics. Curl of F is not a scalar. What is a tonsil+? |
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Title: Re: Non Zero Digits:Extension Post by towr on Nov 29th, 2005, 1:22am on 11/28/05 at 21:41:22, Michael_Dagg wrote:
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