`n^(2)+n+1` is a/an ___________ number for all ` n in N`

n^(2)-n+1 is an odd number for all ____________

Statement 1: ((n^(2))!)/((n!)^(n)) is natural number of for all n in N Statement 2: Number of ways in which n^(2) objects can be distributed among n persons equally is (n^(2))!/(n!)^(n)

If a,b are distinct rational numbers, then for all n in N the number a^(n)-b^(n) is divisible by

Statement-1: n(n+1)(n+2) is always divisible by 6 for all n in N . Statement-2: The product of any two consecutive natural number is divisible by 2.

Is 2^(3-n) a prime number for all natural numbers n?

If f(n+2)=(1)/(2){f(n+1)+(9)/(f(n))}, n in N and f(n) gt0 for all n in N , then lim_( n to oo)f(n) is equal to

2^(n) gt 2n+1 for all natual number n is for n>2

Prove by the principle of mathematical induction that n(n+1)(2n+1) is divisible by 6 for all n in N