Statement-1 : `lim_(x to 0) (sqrt(1 - cos 2x))/(x)` at (x = 0) .
Statement -2 :Right hand limit `!=` Left hand limit

Statement-1 : lim_(x to 0) (sqrt(1 - cos 2x))/(x) at (x = 0) does not exist. Statement -2 :Right hand limit != Left hand limit i) Statement - 1 is True, Statement-2 is True, Statement-2 is a correct explanation for statement-1 ii)Statement-1 is True, Statement-2 is True, Statement-2 is Not a correct explanation for statement-1 iii)Statement-1 is True, Statement-2 is False iv)Statement -1 is False, Statement-2 is True

lim_(x to 0) (1 - cos x)/(x sqrt(x^(2))

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

Evaluate the following limits : Lim_(x to 0) (1-cos 2x)/(x^(2))

Evaluate the following limits : Lim_(x to 0) (1- cos x)/(x^(2))

Statement -1 : lim_(xrarralpha) sqrt(1-cos 2(x-alpha))/(x-alpha) does not exist. Statement-2 : lim_(xrarr0) (|sin x|)/(x) does not exist.

Statement-1: lim_(xrarr oo) (cos (pi)/(x))^x=1 Statement-2: lim_(xrarr oo) -pi tan. (pi)/(x)=0

Evaluate the following limits : Lim_(x to 0) (1-cos 4x)/(x^(2))

Evaluate the following limits : Lim_(x to 0) (1 - cos 6x)/x^2

Evaluate the following limits : Lim_(x to 0) (sin 2x (1- cos 2x))/(x^(3))