Let `n` be a positive integer with `f(n) = 1! + 2! + 3!+.........+n! and p(x),Q(x)` be polynomial in `x` such that `f(n+2)=P(n)f(n+1)+Q(n)f(n)` for all `n >= ,` Then

Let f:NrarrN in such that f(n+1)gtf(f(n)) for all n in N then

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

f(x)=e^(-(1)/(x)), where x>0, Let for each positive integer n,P_(n) be the polynomial such that (d^(n)f(x))/(dx^(n))=P_(n)((1)/(x))e^(-(1)/(x)) for all x>0. show that P_(n+1)(x)=x^(2)[P_(n)(x)-(d)/(dx)P_(n)(x)]

Let f be a function from be set of positive integers to the set of real numbers i.e. f: N to R , such that f(1)+2f(2)+3f(3)+……+nf(n)=n(n+1)f(n) form ge2 , then find the value of f(1994).

Let f : N rarr N be defined as f(x) = 2x for all x in N , then f is

If f(x) is a polynomial of degree n such that f(0)=0,f(x)=(1)/(2),...,f(n)=(n)/(n+1) then the value of f(n+1) is

Given f(1)=2 and f(n+1)=(f(n)-1)/(f(n)+1)AA n in N then

If f(x)=(a-x^(n))^((1)/(n)),a>0 and n in N, then prove that f(f(x))=x for all x.

Let f: N to N be defined by f(x) = x-(1)^(x) AA x in N , Then f is