Answer:
19 dollars
Step-by-step explanation:
First we have to find the line that goes trough the two points. And it has the form :
[tex]y=mx+b[/tex]
m is often called the slope.
Given the two points (66000, 16) and (51000, 21) we find m with this formula:
[tex]m=\frac{y_{2} -y_{1} }{x_{2} -x_{1} }\\m=\frac{21-16}{51000-66000} \\m=-\frac{5}{15000} \\m=-\frac{1}{3000}[/tex]
We pick the point (51000,21) and plug it into the equation of the line and we find b:
[tex]y= mx + b\\21=(-\frac{1}{3000} )(51000)+b\\21=-17+b\\21+17=b=38[/tex]
[tex]y= -\frac{1}{3000}x + 38\\[/tex]
Where x represents the quantity and y represents the price.
The revenue is price times quantity, since price is y and quantity is x, we get
[tex]y=-\frac{1}{3000} x+38\\y*x=x*(-\frac{1}{3000} x+38)\\yx=-\frac{1}{3000} x^2+38x\\R(x)=-\frac{1}{3000} x^2+38x[/tex]
[tex]R(x)=-\frac{1}{3000} x^2+38x\\R'(x)=-(2)\frac{1}{3000} x+38\\R'(x)=-\frac{2}{3000} x+38\\\\R'(x)=-\frac{1}{1500} x+38\\\\[/tex]
[tex]R'(x)=-\frac{1}{1500} x+38=0\\38=\frac{1}{1500} x\\38*1500=x=57000[/tex]
So the quantity that maximizes revenue is 57000,
[tex]y= -\frac{1}{3000}x + 38\\y= -\frac{1}{3000}(57000) + 38\\y= -19 + 38\\y=19[/tex]
