Find`f'(x). if f(x) = e^x-logx-sinx`

Find f'(x) if f(x) =log(cose^x)

Find f'(x)" if "f(x)= (sin x)^(sin x) for all 0 lt x lt pi .

Find dy/dx if e^x=logy-sinx

The set of real values of x for which f(x)=(x)/(logx) is increasing is :

The function f(x) is defined by f(x) = (x+2)e^(-x) is

Find dy/dx if y=e^x/sinx

Find the interval for which f(x)=x-sinx is increasing or decreasing.

The set of real values of x for which f(x)=(x)/(Logx) is increasing is

If an antiderivative of f(x) is e^(x) and that of g(x) is cos x, then int f(x) . cos xdx + int g(x) . e^(x) dx