Evaluate `underset(ntooo)limcos(pisqrt(n^(2)+n))` when n is an integer.

Evaluate lim_(ntooo)(pin)^(2//n)

Evaluate sin{ n pi+(-1)^(n) (pi)/(4) , where n is an integer.

Evaluate underset(ntooo)limn^(-n^(2))[(n+2^(0))(n+2^(-1))(n+2^(-2))...(n+2^(-n+1))]^(n) .

Evaluate int_(0)^(infty)e^(-x) sin^(n) x dx, if n is an even integer.

Let f(x)=underset(ntooo)lim(1)/(((3)/(pi)tan^(-1)2x)^(2n)+5) . Then the set of values of x for which f(x)=0 is

If [x] denotes the greatest integer less than or equal to x, then evaluate underset(ntooo)lim(1)/(n^(2))([1.x]+[2.x]+[3.x]+...+[n.x]).

Evaluate int sinmx sin nx dx , where m and n are positive integers. What happens if m=n?

If 0 lt theta lt pi/2, x= underset(n=0)overset(oo)sum cos^(2n) theta, y= underset(n=0)overset(oo) sumsin^(2n) theta and z=underset(n=0)overset(oo)sum cos^(2n) theta* Sin^(2n) theta , then show xyz=xy+z .

Using Permutation or otherwise, prove that ((n^2)!)/((n!)^2) is an integer, where n is a positive integer.

underset (nto oo)("limit") {(1+1/n)(1+2/n)...(1+n/n)}^(1//n) is equal to :