Here's the question you clicked on:

55 members online
  • 0 replying
  • 0 viewing

S

  • 4 years ago

find the maximum or minimum relative point of the function : f(x)=(1-x)e^(2x) ?

  • This Question is Closed
  1. brainshot3
    • 4 years ago
    Best Response
    You've already chosen the best response.
    Medals 1

    Derivative set equal to zero. Take that answer and plug it into the original equation in order to get the y coordinate. Then plug what you got in for the derivative set to zero and plug it into the second derivative. If it is positive, then it is a min and if it is negative, then it is a max.

  2. S
    • 4 years ago
    Best Response
    You've already chosen the best response.
    Medals 0

    Just to make sure the derivative of e to the 2x is 2e to the 2x?

  3. brainshot3
    • 4 years ago
    Best Response
    You've already chosen the best response.
    Medals 1

    e always stays the same so the derivative of e^2x is 2e^2x. You always take the derivative of e^this * the original e^... equation.

  4. S
    • 4 years ago
    Best Response
    You've already chosen the best response.
    Medals 0

    ok, thank you so much!

  5. Not the answer you are looking for?
    Search for more explanations.

    • Attachments:

Ask your own question

Sign Up
Find more explanations on OpenStudy
Privacy Policy