Let `S(n)` denotes the number of ordered pairs `(x,y)` satisfying `1/x+1/y=1/n,AA ,n in N` , then find `S(10)` .

Let (S) denotes the number of ordered pairs (x,y) satisfying (1)/(x)+(1)/(y)=(1)/(n),x,y,n in N . Q. sum_(r=1)^(10)S(r) equals

lf is a differentiable function satisfying f(1/n)=0,AA n>=1,n in I , then

Let f(n) denotes the number of different ways, the positive integer n ca be expressed as the sum of the 1's and 2's. for example, f(4)=5. i.e., 4=1+1+1+1 =1+1+2=1+2+1=2+1+1=2+2 Q. The number of solutions of the equation f(n)=n , where n in N is

The number of ordered pairs (x, y) , when x, y in [ 0, 10] satisfying (sqrt(sin^(2)x- sinx + 1/2))*2^(sec^(2)y) le 1 is

The number of positive integers satisfying the inequality C(n+1,n-2) - C(n+1,n-1)<=100 is

The numbers 1,3,6,10,15,21,28"..." are called triangular numbers. Let t_(n) denote the n^(th) triangular number such that t_(n)=t_(n-1)+n,AA n ge 2 . The value of t_(50) is:

If S_n denotes the sum of n terms of a G.P. whose first term and common ratio are a and r respectively, then : S_1 +S_3+S_5+.....+S_(2n-1)= (an)/(1-r)-(ar(1-r^(2n)))/((1-r)^2 (1+r)) .

If (d)/(dx)[ x^(n+1)+c]=(n+1)x^(n) , then find int x^(n)dx .

Find the totoal number of distnct or dissimilar terms in the expansion of (x + y + z + w)^(n), n in N

The numbers 1,3,6,10,15,21,28"..." are called triangular numbers. Let t_(n) denote the n^(th) triangular number such that t_(n)=t_(n-1)+n,AA n ge 2 . If (m+1) is the n^(th) triangular number, then (n-m) is