Statement 1 `lim_(mtooo)lim_(n tooo){sin^(2m)n!pin}=0m, n epsilonN`,when x is rational.
Statement 2 When `n to oo` and x is rational`n!x` is integer.

If f(x)=lim_(m rarr oo)lim_(n rarr oo)cos^(2m)n!pi x then the range of f(x) is

lim_(n tooo)1/n^2 (1+2+…+n) is equal to

Let f(x)=lim_(n to oo) sinx/(1+(2 sin x)^(2n)) then f is discontinuous at

lim_(n to oo) (n^(p) sin^(2)(n!))/(n +1) , 0 lt p lt 1 , is equal to-

The area of the triangle having vertices (-2,1),(2,1) and lim_(m rarr oo)lim_(n rarr oo)cos^(2m)(n!pi x);x is rational,lim_(m rarr oo)lim_(n rarr oo)cos^(2m)(n!pi x); where x is irrational) is:

lim_(n rarr oo)2^(n)sin(a)/(2^(n))

Evaluate the limit: (lim_(n rarr oo)cos(pi sqrt(n^(2)+n)) when n is an integer

lim_(n to oo) 1/n =0 , lim_( n to oo) 1/n^2

(2) lim_(n rarr0) (n!sin x)/(n)

Statement [lim_ (n rarr oo) a_ (n)] = lim_ (n rarr oo) [a_ (n).] Denotes the greatestinteger function. Statement II lim_ (n rarr oo) a_ (n) = 3