The fish population in a certain part of the ocean (in thousands of fish) as a function of the water's temperature (in degrees celsius) is modeled by: p(x)=-2(x-9)^2+200p(x)=−2(x−9) 2 +200p, left parenthesis, x, right parenthesis, equals, minus, 2, left parenthesis, x, minus, 9, right parenthesis, start superscript, 2, end superscript, plus, 200 what is the maximum number of fish?

We have the following function:
p (x) = - 2 (x-9) ^ 2 +200
We derive to find the maximum of the function:
p '(x) = - 4 (x-9)
Rewriting:
p '(x) = - 4x + 36
We match zero:
-4x + 36 = 0
We clear x
x = 36/4
x = 9 degrees
The maximum population occurs when x = 9.
We evaluate the function for this value:
p (9) = - 2 * (9-9) ^ 2 +200
p (9) = 200
Answer:
The maximum number of fish is:
p (9) = 200

Answer Link

psm22415 psm22415 · Answer 2 · 2022-05-04T13:10:49+02:00

The maximum number of fish is 200.

What is differentiation?

Differentiation is the reverse of integration.

The given function is;

[tex]\rm p(x)=-2(x-9)^2+200[/tex]

The maximum number of fish is determined in the following steps given below.

[tex]\rm p(x)=-2(x-9)^2+200\\\\ p '(x) = - 4 (x-9)\\\\ p '(x) = - 4 x-36\\\\ p '(x) = 0\\\\-4x+36=0\\\\-4x=-36\\\\x=\dfrac{-36}{-4}\\\\x=9[/tex]

Substitute the value of x in the function

[tex]\rm p(9)=-2(9-9)^2+200\\\\p(9)=0+200\\\\ p(9)=200[/tex]

Hence, the maximum number of fish is 200.

To know more about differentiation click the link given below.

https://brainly.com/question/10115447

#SPJ3