The differentiation of `a^x(a >0,a!=1)` with respect to `xi sa^x(log)_e adot` i.e. `d/(dx)(a^x)=a^x(log)_e a`

The differentiation of e^x with respect to xi se^xdot i.e. d/(dx)(e^x)=e^x

The differentiation of log_(a)x(a>0,a)*!=1 with respect to x is (1)/(x log_(a)a) i.e.(d)/(dx)(log_(a)x)=(1)/(x log_(a)a)

The differentiation of (log)_a x (a >0) with respect to x i.e. d/(dx)((log)_a x)= 1/(x(log)_e a)

Differentiate: (log x)^(x)+x^(log x) with respect to x:

Differentiate: (log x)^(x)+x^(log x) with respect to x.

Differentiate (e^(x)log x)/(x^(2)) with respect to x:

Differentiate (e^(x)+sin x)/(1+log x) with respect to x

Differentiate e^(x)log sqrt(x)tan x with respect to x

Differentiate (e^(3x))/(1+e^(x)) with respect to x