If a is the remainder when `5^40` is divided by 11 and b is the remainder when `2^2003` is divided by 17 then the value of b-a is (A) 1 (B) 8 (C) 7 (D) 6

The remainder when 2^(2003) is divided by 17 is:

The remainder when 2^(2003) is divided by 17 is:

Find the remainder when 2^(2013) in divided by 17.

The remainder when 23^23 is divided by 53 is

Suppose ,m divided by n , then quotient q and remainder r {:("n)m(q"),(" "-), (" "-), (" "r) , (" "):} or m= nq + r , AA m,n,q, r in 1 and n ne 0 If a is the remainder when 5^(40) us divided by 11 and b is the remainder when 2^(2011) is divided by 17 , the value of a + b is

What is the remainder when 13 is divided by 6?

Find the remainder when 27^(40) is divided by 12.

Find the remainder when 32^(32^32) is divided by 7

What is the remainder when 7^(81) is divided by 5

Find the remainder when 7^(103) is divided by 25.