Statement 1: `1^(99)+2^(99)++100^(99)` is divisible by 10100. Statement 2: `a^n+b^n` is divisible by `a+bifn` is odd.

Statement 1: 2^(33)-1 is divisible by 7. Statement 2: x^(n)-a^(n) is divisible by x-a , for all n in NN and x ne a .

Statement 1:3^(2n+2)-8n-9 is divisible by 64,AA n in N. Statement 2:(1+x)^(n)-nx-1 is divisible by x^(2),AA n in N

Using the binomial theorem show that 1^(99) + 2^(99) +3^(99) + 4^(99) + 5^(99) is divisible by 3 and 5 so that it is actually divisible by 15.

Prove that 13^99-19^93 is divisible by 162.

If (x^(100)+2x^(99)+k) is divisible by ( x+1 ) then the value of k is

Find the remainder when 7^(99) is divisible by 2400.

If 24AB4 is divisible by 99, then A xx B is :

Test whether 382546692 is divisible by 99 or not.

Which of the following is divisible by 99?

Which of the following is divisible by 99?