Question

A manufacturing unit currently operates at 80 percent of its capacity. The profit function for the unit at the optimum output, x, is given by p(x) = -0.1x^2 + 80x − 60.

If the function f(x) models the current capacity of the unit, the composite function giving the unit's current profit function is a.f(p(x))=-0.064x^2+6.4x-60
b.p(f(x))=-0.64x^2+0.64x-60
c.p(f(x))=-0.064x^2+64x-60
d.p(f(x))=-0.64x^2+6.4x-60
e.f(p(x))=-0.064x^2+64x-60
If the optimum output is 500 units, the current profit is $a.15,400 b.15,940 c.16,060 d.16,600

Answer 1

The correct answers are c. p(f(x)) = -.064x^2+64x-60

and b. 15,940.

Explanation:

This is correct on the test