If m is positive integer then `-m^(3)` will be a

If n is a positive integer, then (sqrt(3)+1)^(2n)-(sqrt(3)-1)^(2n) is

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

(-2)^(31) is a positive integer.

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 m and n are positive integers and f(x) = int_1^x(t-a )^(2n) (t-b)^(2m+1) dt , a!=b , then

Let m be the smallest positive integer such that the coefficient of x^(2) in the expansion of (1+x)^(2)+(1+x)^(3) + "……." + (1+x)^(49) + (1+mx)^(50) is (3n+1) .^(51)C_(3) for some positive integer n, then the value of n is "_____" .

If m,n,r are positive integers such that r lt m,n, then ""^(m)C_(r)+""^(m)C_(r-1)""^(n)C_(1)+""^(m)C_(r-2)""^(n)C_(2)+...+ ""^(m)C_(1)""^(n)C_(r-1)+""^(n)C_(r) equals

Use Euclid's division lemma to show that the cube of any positive integer is of the form 9m, 9m + 1 or 9m + 8.

If the sum of m consecutive odd integers is m^(4) , then the first integer is

If one root of the equation lx^2+mx+n=0 is 9/2 (l, m and n are positive integers) and m/(4n)=l/m , then l+ n is equal to :