For `n epsilon N` let `x_(n)` be defined as `(1+1/n)^((n+x_(n)))=e` then `lim_(nto oo)(2x_(n))` equals…..

evaluate lim_(n->oo)((e^n)/pi)^(1/ n)

If the arithmetic mean of the product of all pairs of positive integers whose sum is n is A_n then lim_(n->oo) n^2/(A_n) equals to

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

Let a sequence {a_(n)} be defined by a_(n)=(1)/(n+1)+(1)/(n+2)+(1)/(n+3)+"....."(1)/(3n) , then

Let f: N -> R and g : N -> R be two functions and f(1)=0.8, g(1)=0.6 , f(n+1)=f(n)cos(g(n))-g(n)sin(g(n)) and g (n+1)=f(n) sin(g(n))+g(n) cos(g(n)) for n>=1 . lim_(n->oo) f(n) is equal to

Consider the identity function I_(N) : N rarr N defined as I_(N) (x) = x,AAx in N . Show that although I_(N) is onto but I_N + I_(N) :N rarr N defined as (I_(N) +I_(N))(x) = I_(N)(x) +I_(N) (x) = x+x=2x is not onto.

Prove that the coefficient of x^n in the expansion of (1+x)^(2n) is twice the coefficient of x^n in the expansion of (1+x)^(2n-1) .

Let S_(n),n=1,2,3,"…" be the sum of infinite geometric series, whose first term is n and the common ratio is (1)/(n+1) . Evaluate lim_(n to oo)(S_(1)S_(n)+S_(2)S_(n-1)+S_(3)S_(n-2)+"..."+S_(n)S_(1))/(S_(1)^(2)+S_(2)^(2)+"......"+S_(n)^(2)) .

The coefficient of x^(m) and x^n in the expansion of (1+x)^(m+n) are ...........