If `n > 1` is an integer and `x!=0,` then `(1 +x)^n-nx-1` is divisible by

For n∈N, x^n+1 + (x+1)^ 2n−1 is divisible by

(1+x)^(n)-nx-1 is divisible by (where n in N)

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

If n is an odd integer then n ^(2) -1 is divisible by

If n is a positive integer then int_(0)^(1)(ln x)^(n)dx is :

If n is n odd integer that is greater than or equal to 3 but not a multiple of 3, then prove that (x+1)^(n)=x^(n)-1 is divisible by x^(3)+x^(2)+x

If n in N,x^(2n-1)+y^(2n-1) is divisible by x+y if n is

Show that (1+x)^(n) - nx-1 is divisible by x^(2) for n gt N

For every integer n>=1,(3^(2^(n))-1) is divisible by

We define a function f on the integers f(x) = x//10 , if x is divisible by 10, f(x) = x + 1 , if x is not divisible by 10. If A_(0) = 1994 and A_(n+1) = f(A_(n)) . What is the smallest n such that A_(n) = 2 ?