Let `f(x) = {{:(a sin^(2n)x,"for",x ge 0 and n rarr oo),(b cos^(2m)x - 1,"for",x lt 0 and m rarr oo):}` then

Lt_(n rarr oo)(cos(x)/(n))^(n)

Let f(x)=lim_(n rarr oo)(sin x)^(2n)

If f(x)=sqrt((x-sin x)/(x+cos^(2)x)), then lim(x rarr oo)f(x) is , then

Let f(x) = {(x sin(1/x)+sin(1/x^2),; x!=0), (0,;x=0):}, then lim_(x rarr oo)f(x) is equal to

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

Let f(x) = underset(n rarr oo)("Lim")( 2x^(2n) sin""(1)/(x) +x)/(1+x^(2n)) then find underset( x rarr -oo)("Lim") f(x)

Sketch a possible graph of a function f that satisfies the following conditions : 1. f'(x) gt 0 on (-oo,1), f'(x) lt on (1,oo) 2. f'(x) gt 0 on (-oo,-2) and (2,oo), f'(x) lt 0 on (-2, 2) 3. {:(" "lim),(x rarr -oo):} f(x)=-2, {:(" "lim),(x rarr oo):} f(x)=0

Let x be an irrational,then lim_(m rarr oo)lim_(n rarr oo){cos(n!pi x)}^(2m) equals

Let f(x)=lim_(n rarr oo)(2x^(2n)sin\ 1/x+x)/(1+x^(2n)) then find (a) lim_(x rarr oo) x f(x) (b) lim_(x rarr 1) f(x)

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: