The quantity of 72 that gives the maximum profit of 10268
Explanation:
The profit function p(q) is given by the difference between the revenue and the cost function,
P(q) = R(q) - C(q)
The revenue (in dollars) for selling q items is given by [tex]R(q)=348 q-2 q^{2}[/tex]
The costs (in dollars) of producing q items is given by C(q)= 100 + 60q
[tex]P(q)=348 q-2 q^{2}-(100+60 q)[/tex]
[tex]=348 q-2 q^{2}-100-60 q[/tex]
[tex]=-2 q^{2}+288 q-100[/tex]
The above profit function is a downward opening parabola. Its maximum value occurs,
[tex]\text { At } x=-\frac{b}{2 a}=-\frac{288}{2(-2)}=72[/tex]
Maximum value, [tex]p(72)=\left(-2 \times 72^{2}\right)+(288 \times 72)-100=-10368+20736-100=10268[/tex]
