To find out the extreme value of a function, we'll have to
calculate the first derivative of the function.
Let's find
the first derivative of the function
f(x):
f'(x)=( 4x^2-8x-18)'=(4x^2)'-(8x)'-(18)'
f'(x)=8x-8
Now we
have to calculate the equation of the first
derivative:
8x-8=0
We'll
divide by 8:
x-1 =
0
x=1
That means that the
function has an extreme point, for the critical value
x=1.
f(1) = 4*1^2 - 8*1 -
18
f(1) = 4 - 8 -
18
We'll combine like
terms:
f(1) =
-22
The extreme point of the function is a
minimum point whose coordinates are: (1 ; -22).
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