Answer:
[tex]\textsf{a)} \quad 35x-0.25x^2=300+15x[/tex]
b) x = 20, x = 60
c) 20 and 60
d) 40
e) 100,000 euros
Step-by-step explanation:
Given functions:
[tex]\begin{cases}R(x)=35x-0.25x^2 \\C(x)=300+15x \end{cases}[/tex]
where:
As the "break-even points" are the values of x for which the revenue is equal to the cost, an equation to find the break-even points in terms of x is:
[tex]35x-0.25x^2=300+15x[/tex]
Rewrite the equation found in part (a) so that only the constant is on the right side:
[tex]\implies -0.25x^2+20x=300[/tex]
Multiply everything by -4 so that the coefficient of x² is 1:
[tex]\implies x^2-80x=-1200[/tex]
Add the square of half the coefficient of x to both sides of the equation. This forms a perfect square trinomial on the left side:
[tex]\implies x^2-80x+\left(\dfrac{-80}{2}\right)^2=-1200+\left(\dfrac{-80}{2}\right)^2[/tex]
[tex]\implies x^2-80x+1600=-1200+1600[/tex]
[tex]\implies x^2-80x+1600=400[/tex]
Factor the perfect square trinomial on the left side:
[tex]\implies (x-40)^2=400[/tex]
Square root both sides:
[tex]\implies \sqrt{ (x-40)^2}=\sqrt{400}[/tex]
[tex]\implies x-40=\pm20[/tex]
Add 40 to both sides:
[tex]\implies x=40\pm20[/tex]
Therefore:
[tex]\implies x=20, 60[/tex]
The number of subscribers at which the newspaper sales break-even is 20 and 60.
[tex]\begin{aligned}\sf Profit & = \sf Revenue - Cost\\\implies P(x) & = R(x)-C(x)\\& = (35x-0.25x^2)-(300+15x)\\& = 35x-0.25x^2-300-15x\\& = -0.25x^2+20x-300\end{aligned}[/tex]
The number of subscribers that yields maximum profit will be the x-value of the vertex. The x-value of the vertex of the quadratic function P(x) is:
[tex]\implies x \sf =\dfrac{-b}{2a}=\dfrac{-20}{2(-0.25)}=\dfrac{-20}{-0.5}=40[/tex]
Therefore, 40 subscribers yield maximum profit.
To find the maximum profit, substitute the found value of x from part (d) into the function for profit P(x):
[tex]\begin{aligned}\implies P(40) & = -0.25(40)^2+20(40)-300\\& = -0.25(1600)+20(40)-300\\& = -400+800-300\\& = 400-300\\& = 100\end{aligned}[/tex]
Therefore, the maximum profit is €100,000.
