If ` 5^(99) ` is divided by 13, the remainder is

Suppose ,m divided by n , then quotient q and remainder r or m= nq + r , AA m,n,q, r in 1 and n ne 0 If 13^(99) is divided by 81 , the remainder is

If 7^(103) is divided by 25 , find the remainder .

If 2^(2006) + 2006 is divided by 7, the remainder is

When (x^31+31) is divided by (x+1), the remainder is

By the Principle of Mathematical Induction, prove that for all n in N, 3^(2n) when divided by 8, the remainder is 1 always.

For each of the following numbers,verify that when it is divided by 5,the remainder is equal to the remainder when the ones digit is divided by 5.The first one has been done for you. 571

For each of the following numbers,verify that when it is divided by 5,the remainder is equal to the remainder when the ones digit is divided by 5.The first one has been done for you. 294

For each of the following numbers,verify that when it is divided by 5,the remainder is equal to the remainder when the ones digit is divided by 5.The first one has been done for you. 929

For each of the following numbers,verify that when it is divided by 5,the remainder is equal to the remainder when the ones digit is divided by 5.The first one has been done for you. 799

For each of the following numbers,verify that when it is divided by2,the remainder is equal to the remainder when the ones digit is divided by 2.The first one has been done for you. 571