Let n be a positive integer and define f(n)=1!+2!+3!+…+n!. Find polynomials P(x) and Q(x) such that f(n+2)=Q(n)f(n)+P(n)f(n+1) for all `n ge 1`.

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 be a function from the set of positive integers to the set of real number such that f(1)=1 and sum_(r=1)^(n)rf(r)=n(n+1)f(n), forall n ge 2 the value of 2126 f(1063) is ………….. .

f(x)=e^(-1/x),w h e r ex >0, Let for each positive integer n ,P_n be the polynomial such that (d^nf(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)]

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

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

Let N be the set of numbers and two functions f and g be defined as f,g:N to N such that f(n)={((n+1)/(2), ,"if n is odd"),((n)/(2),,"if n is even"):} and g(n)=n-(-1)^(n) . Then, fog is

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

Consider the function f defined on the set of all non-negative interger such that f(0) = 1, f(1) =0 and f(n) + f(n-1) = nf(n-1)+(n-1) f(n-2) for n ge 2 , then f(5) is equal to

Let x in(1,oo) and n be a positive integer greater than 1 . If f_n (x) =n/(1/log_2x+1/log_3x+...+1/log_nx) , then (n!)^(f_n (x)) equals to