What is the maximum value that the graph of #y=-x^2+6x-8#?

1 Answer
georgef
Jul 3, 2016

You have to identify critical points first, and then check whether they are maxima or minima

Explanation:

If the first derivative of the function is #0# you have a critical point. So we have to solve #y' = -2x + 6 =0#. This gives #6=2x# and this gives #x=3# as a critical point. Now we can use the second derivative test to check for maximum or minimum. It not always works, but if it does it is easy.

If the second derivative at the critical point is positive, the point is a minimum, if it is negative the point is a maximum. In this case the second derivative is #-2#, so it is negative everywhere, and the point is a maximum. The function has a maximum in #x=3#, and the value of the function at #x=3# is #1#

Related questions
See all questions in Identifying Stationary Points (Critical Points) for a Function
Impact of this question
3998 views around the world
You can reuse this answer
Creative Commons License