# (a^k(p-1)+ b) mod(p) here p is a prime number and a,b,k is an integer greater than 1 and a not divisble by p. Is this value same as (a^b)mod(p)? [closed]

According to Fermat's Little theorem a^(p-1) mod(p) is 1. So a^k(p-1) mod(p)will also be 1 by splitting into k parts and apply modulus independently we get '1'. Am I missing something?

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## closed as off topic by Barmar, AakashM, Rachel Gallen, Joni, AliMay 7 '13 at 8:32

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math.stackexchange.com ? –  Barmar May 7 '13 at 7:41
I didn't get any response there –  Alex May 7 '13 at 7:41
@Alex you posted your question there ten minutes ago. You generally should wait a bit more than ten minutes before deciding to cross post to a different site. And in any event this question is clearly off topic here. –  AakashM May 7 '13 at 7:44
@AakashM okay..but I thought there would be more users here –  Alex May 7 '13 at 7:45
That there are more users here doesn't somehow make it OK to ask off topic questions... –  AakashM May 7 '13 at 7:46

We know,

`((a mod N) * (b mod N)) mod N = (a*b) mod N`

`a^(p-1) mod p = 1`

Thus

`( a^(p-1) * a^(p-1) * a^(p-1) * ... * a^(p-1) ) mod p = ( 1 * 1 * 1 * ... * 1) mod p = 1`