If for some real number `a, Lt_(x->0 ) (sin 2x +asin x) / x^3` exists, then the limits is equal to

If x is a real number and |x| lt 3 , then

If lim_(xrarr0)(sin2x-a sin x)/(((x)/(3))^(3))=L exists finitely, then the absolute value of L is equal to

Let n be the smallest natural number for which the limit lim_(x rarr0)(sin^(n)x)/(cos^(2)x(1-cos x)^(3)) exists,then tan ^(-1)(tan n) is equal to

Lt_(x rarr0)(x-sin x)/(x^(3))

Let x be a positive real number such that sin(arctan\ (x)/(2))=(x)/(3) . The value of (log_(5)x) is equal to

If lim_(xrarr0)(2a sin x-sin 2x)/(tan^(3)x) exists and is equal to 1, then the value of a is

If cos x + sin x = a (- (pi)/(2) lt x lt - (pi)/(4)) , then cos 2 x is equal to