`lim_(x to 0) (A "sin" x + B log (1 + x^(2)) + C (1 - cos x))/(x^(2)) = 2` then
Statement-1 : A = 1
Statement-2 : 2B + C = 4
Statement-3 A + B + C = 0

If lim_(x rarr0)(a+bx sin x+c cos x)/(x^(4))=2 then a=b=,c=

lim_(x rarr0)(sin x)/(x(1+cos x)) : (a)0 (b)1/2 (c)1 (d)-1

lim_(x rarr0)(sin^(-1)x)/(sin x) (A) 2 (B) 3 (C) 0 (D) 1

If lim_( x to 0) [1+x log (1+b^(2))]^(1/x) = 2b sin^(2) theta, b gt 0 and theta in ( - pi, pi] , then the value of theta is

Statement-1 : lim_(x to 0) (1 - cos x)/(x(2^(x) - 1)) = (1)/(2) log_(2) e . Statement : lim_(x to 0) ("sin" x)/(x) = 1 , lim_(x to 0) (a^(x) - 1)/(x) = log a, a gt 0

lim_(x rarr 0)(1-cos x)/(x log(1+x)) (a) \ \ \ 1 (b) \ \ \ 0 (c) -1 (d) \ \ \ 1/2

Statement 1. If sin^-1 x=cos^-1 x, then x= 1/sqrt(2) , Statement 2. sin^-1 x+cos^-1 x= pi/2, 1lexlarr1 (A) Both Statement 1 and Statement 2 are true and Statement 2 is the correct explanation of Statement 1 (B) Both Statement 1 and Statement 2 are true and Statement 2 is not the correct explanatioin of Statement 1 (C) Statement 1 is true but Statement 2 is false. (D) Statement 1 is false but Statement 2 is true

Let a= ( 2 sin x )/(1 + sin x + cos x ) and b = ( c )/(1+ sin x ) . Then a = b , if c= ?