For all `n in N`, n(n + 1) (n + 5) is a multiple of 8

For all n in N and n ge2 , n^2(n^4 - 1) is divisible by

If A = {x| x is a multiple of 2, x in N} B = {x| x is a multiple of 5, x in N }, C= {x| x is multiple of 10, x in N}, then (A nn B) nn C=

Prove that 1 + w ^( n ) + w ^( 2n) = 3, if n is multiple of 3 1 + w ^( n ) + w ^( 2n) = 0, if n is not multiple of 3 n in N

If A = {x//x is a multiple of 2,x in N }, B={x| x is a multiple of 5,x in N}, C= {x|x is multiple of 10, x in N}, then A nn(B nn C)=

If M = {x | x is a multiple of 5} : N = {x | x is a multiple of 7}, then M n N =

Prove the following by the method of induction for all n in N : 3^n - 2n - 1 s divisible by 4.

By method of induction prove that 1.3 + 2.5 + 3.7 +...+ n (2n + 1) = n/6 (n + 1) (4n + 5) for all n in N

Prove, by method of induction, for all n in N : 8 + 17 + 26 +...+ (9n - 1) = n/2 (9n + 7)

Prove by the method of Induction for all n in N : 1/3.5 + 1/5.7 + 1/7.9 + …. n terms = n/(3(2n+3))

Prove the following by the method of induction for all n in N : (2^(3n) -1) is divisible by 7.