Find the extreme values (absolute and local) of the function

Irvin Dukes

Irvin Dukes

Answered question

2021-12-10

Find the extreme values (absolute and local) of the function over its natural domain, and where they occur.
y=x4x

Answer & Explanation

Jim Hunt

Jim Hunt

Beginner2021-12-11Added 45 answers

Given,
y=x4x
The domain of given function is [0,).
Differentiating with respect to x, we get
dydx=1412x
=12x
Now critical points are the points at which first derivative is zero or not defined.
So to find critical points, solve the first derivative by equating it to zero. That is,
dydx=0
12x=0
2x=1
x=2
x=4
& also the first derivative is not defined at x=0.
Therefore critical values are x=0 & x=4.
Step 2
Now,
dydx<0 to the left of x=4 & dydx>0 to the right of x=4.
Therefore x=4 is the point of local minima & local minimum value is,
y=444
=4-8
=-4
Therefore local minimum and absolute minimum value is -4 occurs at x=4.

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