For `x in R, f(x) =|log_(e) 2-sinx| and g(x) = f(f(x)) ,` then

For x in R, f(x) = | log 2- sin x| and g(x) = f(f(x)) , then

If f(x)=|log_(e) x|,then

If f(x) = x log x and g(x) = 10^(x) , then g(f(2)) =

If f(x) =|log_(e)|x||, then f'(x) equals

If f(x)=log_x(lnx) then f'(x) at x=e is

If f(x)=log_(10)x and g(x)=e^(ln x) and h(x)=f [g(x)] , then find the value of h(10).

If f(x)=|log_(e)|x||," then "f'(x) equals

If f(x)=log_(e)x and g(x)=e^(x) , then prove that : f(g(x)}=g{f(x)}

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

Let f_(1) (x) and f_(2) (x) be twice differentiable functions where F(x)= f_(1) (x) + f_(2) (x) and G(x) = f_(1)(x) - f_(2)(x), AA x in R, f_(1) (0) = 2 and f_(2)(0)=1. "If" f'_(1)(x) = f_(2) (x) and f'_(2) (x) = f_(1) (x) , AA x in R then the number of solutions of the equation (F(x))^(2) =(9x^(4))/(G(x)) is...... .