Answer:
[tex]p(x)=16x-25[/tex]
C is the correct option.
Step-by-step explanation:
We have been given that
[tex]r(x)=20x\\c(x)=4x+25[/tex]
The profit is the difference of revenue and cost function.
Mathematically, we can write profit function as
[tex]p(x)=(r-c)x[/tex]
We know that [tex](f-g)(x)=f(x)-g(x)[/tex]. Thus, we have
[tex]p(x)=r(x)-c(x)[/tex]
Plugging, the r(x) and c(x) functions
[tex]p(x)=20x-(4x+25)[/tex]
Distribute negative over the parenthesis
[tex]p(x)=20x-4x-25[/tex]
Combine the like terms. 20x-4x = 16x
[tex]p(x)=16x-25[/tex]
C is the correct option.
Answer:
C. p(x) = 16x - 25
Step-by-step explanation:
1. First define the equation that describes the profit Luisa earns, that is the revenue for mowing minus the Luisa´s cost for gas and the mower rental. So the equation is:
p(x) = (r – c)(x) (Eq.1)
2. Write the equations for the revenue for mowing and the cost for gas and the mower rental:
- Equation for the revenue for mowing:
r(x) = 20x (Eq.2)
- Equation for the cost for gas and the mower rental:
c(x) = 4x + 25 (Eq.3)
3. Replace the equations Eq. 2 and Eq. 3 in Eq. 1:
p(x) = (r – c)(x)
p(x) = 20x - (4x + 25)
p(x) = 20x - 4x - 25
p(x) = 16x - 25
