The integer n for which `lim_(x rarr 0) ((cos x-1) ( cos x - e^x))/x^n` is a finite non-zero number is :

lim_(xrarr0)(e^(sinx)-1)/x

lim_(xrarr0)(1-cos(2x))/x^(2) = 0.

cos 3x + cos x -2 cos x =0

lim_(xrarr0)(e)^(e^x)/(e^x+1)=2e

Let f(x) is a function continuous for all x in R except at x = 0 such that f'(x) lt 0, AA x in (-oo, 0) and f'(x) gt 0, AA x in (0, oo) . If lim_(x rarr 0^(+)) f(x) = 3, lim_(x rarr 0^(-)) f(x) = 4 and f(0) = 5 , then the image of the point (0, 1) about the line, y.lim_(x rarr 0) f(cos^(3) x - cos^(2) x) = x. lim_(x rarr 0) f(sin^(2) x - sin^(3) x) , is

If alpha is the number of solution of |x|=log(x-[x]) , (where [.] denotes greatest integer function) and lim_(xto alpha)(xe^(ax)-bsinx)/(x^(3)) is finite, the value of (a-b) is

Differentiate the following with respect to x: x cos x + e^(x)

Number of solution (s) of the equations cos^(-1) ( cos x) = x^(2) is