5. Find the points at which the function f(x) = (x - 2)^3(x - 3)^2 has maxima and minima.
Answers
Answer:
Step-by-step explanation:
function local minimum and maximum
In a smoothly changing function a maximum or minimum is always where the function flattens out (except for a saddle point).
Where does it flatten out? Where the slope is zero.
Where is the slope zero? The Derivative tells us!
Let's dive right in with an example:
quadratic graph
Example: A ball is thrown in the air. Its height at any time t is given by:
h = 3 + 14t − 5t2
What is its maximum height?
Using derivatives we can find the slope of that function:
d/dth = 0 + 14 − 5(2t)
= 14 − 10t
(See below this example for how we found that derivative.)
quadratic graph
Now find when the slope is zero:
14 − 10t = 0
10t = 14
t = 14 / 10 = 1.4
The slope is zero at t = 1.4 seconds
And the height at that time is:
h = 3 + 14×1.4 − 5×1.42
h = 3 + 19.6 − 9.8 = 12.8
And so:
The maximum height is 12.8 m (at t = 1.4 s)