Derivative of e^2x*cos(2x)*x

Derivative of e^2x*cos(2x)*x. Simple step by step solution, to learn. Simple, and easy to understand, so dont hesitate to use it as a solution of your homework.

Below you can find the full step by step solution for you problem. We hope it will be very helpful for you and it will help you to understand the solving process.

If it's not what You are looking for type in the derivative calculator your own function and let us solve it.

Derivative of e^2x*cos(2x)*x:

(e^2*x*x*cos(2*x))'(e^2*x*x)'*cos(2*x)+e^2*x*x*(cos(2*x))'((e^2*x)'*x+e^2*x*(x)')*cos(2*x)+e^2*x*x*(cos(2*x))'(((e^2)'*x+e^2*(x)')*x+e^2*x*(x)')*cos(2*x)+e^2*x*x*(cos(2*x))'((0*x+e^2*(x)')*x+e^2*x*(x)')*cos(2*x)+e^2*x*x*(cos(2*x))'((0*x+e^2*1)*x+e^2*x*(x)')*cos(2*x)+e^2*x*x*(cos(2*x))'(e^2*x+e^2*x*(x)')*cos(2*x)+e^2*x*x*(cos(2*x))'(e^2*x+e^2*x*1)*cos(2*x)+e^2*x*x*(cos(2*x))'2*e^2*x*cos(2*x)+e^2*x*x*(cos(2*x))'2*e^2*x*cos(2*x)+e^2*x*x*-sin(2*x)*(2*x)'2*e^2*x*cos(2*x)+e^2*x*x*-sin(2*x)*((2)'*x+2*(x)')2*e^2*x*cos(2*x)+e^2*x*x*-sin(2*x)*(0*x+2*(x)')2*e^2*x*cos(2*x)+e^2*x*x*-sin(2*x)*(0*x+2*1)2*e^2*x*cos(2*x)+e^2*x*x*2*(-sin(2*x))2*e^2*x*cos(2*x)+e^2*x*x*-2*sin(2*x)2*e^2*x*cos(2*x)-(2*e^2*x^2*sin(2*x))`
The calculation above is a derivative of the function f (x)