[[cos^(-1)(sin sqrt(1+x))+x^(x)]" with respect to "x" at "x=1" is "],[[" a."3/4," b."0],[" c."1/2," d."-1/2]]

The first derivative of the function [cos^(-1)(sin sqrt((1+x)/(2)))+x^(x)] with respect to x at x=1 is (a) 3/4( b) 0(c)1/2(d)-1/2

(cos x)/(sqrt(1+sin x))

(cos x)/(sqrt(1+sin x))

Derivative of sin^(-1) ((1)/(sqrt(x + 1))) with respect to x is

If f(x)=cos^(-1)(sin sqrt((1+x)/(2)))+x^(x) then at x=1,f'(x) is equal to

If f(x)=cos^(-1)(sin sqrt((1+x)/(2)))+x^(x) ,then at x=1,f'(x) is equal to

sin^(-1)x=cos^(-1)sqrt(1-x^(2))

Differentiate sin^(-1)x+cos^(-1)x with respect to x .

The first derivative of the function [cos^(-1)(sin sqrt((1+x)/(2)))+x^(x)] with respect to x at x=1 is

cos^(-1)sqrt(1-x)+sin^(-1)sqrt(1-x)=