Let N be the number of integer solutions of the equation `n_(1) + n_(2) + n_(3) + n_(4)= 17` when `n ge 1, n_(2) ge -1, n_(3) ge 3, n_(4) ge 0`. If `N= ""^(17)C_(K)`, then find K.

Let N be the number of integral solution of the equation x+y+z+w=15" where " x ge 0, y gt 5, z ge 2 and w ge 1 . Find the unit digit of N.

Find the integral solution for n_(1)n_(2)=2n_(1)-n_(2), " where " n_(1),n_(2) in "integer" .

Let f : N rarr R be a function such that f(1) + 2f(2) + 3f(3) + ....+nf(n)= n(n+1) f(n) , for n ge 2 and f(1) = 1 then

Let n and k be positive integers such that n gt (k(k+1))/2 . The number of solutions (x_(1),x_(2), . ..x_(k)),x_(1) ge 1, x_(2) ge 2,, . . .x_(k) ge k for all integers satisfying x_(1)+x_(2)+ . . .+x_(k)=n is:

For and odd integer n ge 1, n^(3) - (n - 1)^(3) + …… + (- 1)^(n-1) 1^(3)

f(1)=1, n ge 1 f(n+1)=2f(n)+1 then f(n)=

A function f:R to R is differernitable and satisfies the equation f((1)/(n)) =0 for all integers n ge 1 , then

Total number of 480 that are of the form 4n+2, n ge 0 , is equal to

If alpha,beta are the roots of the equation x^2-2x+4=0 , find alpha^(n)+beta^(n) for (a) n=3k, k in N

If n ge 1 is a positive integer, then prove that 3^(n) ge 2^(n) + n . 6^((n - 1)/(2))