If m and n are positive integers more than or equal to 2, `mgtn`, then (mn)! is divisible by

For each positive integer n, let S_n =sum of all positive integers less than or equal on n. Then S_(51) equals

Prove by induction that if n is a positive integer not divisible by 3 , then 3^(2n)+3^(n)+1 is divisible by 13 .

If n is a positive integer, then prove that 81^n + 20 n - 1 is divisible by 100

If m and n are positive integers, then prove that the coefficients of x^(m) " and " x^(n) are equal in the expansion of (1+x)^(m+n)

If n is positive integer show that 9^n+7 is divisible 8

If n is a positive integer, then show tha 3^(2n+1)+2^(n+2) is divisible by 7 .

Prove that if xa n dy are odd positive integers, then x^2+y^2 is even but not divisible by 4.

If m , n are positive integers and m+nsqrt(2)=sqrt(41+24sqrt(2)) , then (m+n) is equal to (a) 5 (b) 6 (c) 7 (d) 8

If n is any positive integer , show that 2^(3n +3) -7n - 8 is divisible by 49 .

Find the number of positive integers greater than 6000 and less than 7000 which are divisible by 5, provided that no digit is to be repeated.