`3^(2n)` when divided by 8 leves the remainder-

Prove the following by using the Principle of mathematical induction AA n in N 3^(2n) when divided by 8 leaves the remainder 1.

3^(51) when divided by 8 leaves the remainder 2 2. 6 3. 3 4. 5 5. 1

Prove by the principle of mathematical induction that for all n in N ,3^(2n) when divided by 8 , the remainder is always 1.

Prove by the principle of mathematical induction that for all n in N,3^(2n) when divided by 8, the remainder is always 1.

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

Prove by the method of mathematica induction that for all ninNN,3^(2n) when divided by 8, the remainder is always 1.

The number a_(n) = 6^(n) - 5n for n=1,2,3,…. when divided by 25 leave the remainder

ninNN,(n+1)^(3)+(n+2)^(3)+(n+3)^(3) when divided by 9, then the remainder will be -

3^(2n)+9n+1 when divided by 9 will leave the remainder