Answer:
The cost function is [tex]C(x)=32x+130000[/tex].
The revenue function is [tex]R(x)=66x[/tex].
The profit function is [tex]P(x)=34x-130000[/tex].
Step-by-step explanation:
We have the following definitions:
The cost function is a mathematical formula that gives the total cost to produce a certain number of units. It consists of variable costs and fixed costs and is given by
[tex]C(x)=(fixed \:cost)+x\cdot (variable \:cost)[/tex]
If [tex]x[/tex] units are sold and the price per unit is [tex]p(x)[/tex], then the total revenue is
[tex]R(x)=x\cdot p(x)[/tex]
and [tex]R(x)[/tex] is called the revenue function.
If [tex]x[/tex] units are sold, then the total profit is
[tex]P(x)=R(x)-C(x)[/tex]
and [tex]P(x)[/tex] is called the profit function.
Applying the above definitions we get that:
We know that the company has fixed monthly costs of $130,000 and production costs on its product of $32 per unit.
Therefore,
The cost function is [tex]C(x)=32x+130000[/tex].
We know that the company sells its product for $66 per unit.
Therefore,
The revenue function is [tex]R(x)=66x[/tex].
The profit function is
[tex]P(x)=R(x)-C(x)\\P(x)=66x-(32x+130000)\\P(x)=34x-130000[/tex]
