Find the derivatives of the functions defined as y=\cos(4e^{2x})

Chesley

Chesley

Answered question

2021-10-12

Find the derivatives of the functions defined as y=cos(4e2x)

Answer & Explanation

Obiajulu

Obiajulu

Skilled2021-10-13Added 98 answers

Step 1
Given information:
The function is y=cos(4e2x).
Concept used:
Chain rule of differentiation: ddx(p(q(x)))=p(x)q(x)
ddx(eax)=aeax
ddx(cosx)=sinx
Step 2
Now find the derivative of the function y=cos(4e2x) by the use of chain rule of differentiation.
ddx(cos(4e2x))=sin(4e2x)ddx(4e2x)
=sin(4e2x)8e2x
=8e2xsin(4e2x)
Answer: ddx(cos(4e2x))=8e2xsin(4e2x)

Do you have a similar question?

Recalculate according to your conditions!

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?