Answer:
- $1440 max revenus
- $12 for a ticket
Step-by-step explanation:
The quantity of tickets sold is presumed to be a linear function of the price. The revenue from sales will be the product of the number sold and their price.
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quantity
The quantity sold is reduced by 10 when the price goes up 1, so the slope of the quantity curve is -10/1 = -10. The given point on the quantity curve is (p, q) = (4, 200). Using these values in the point-slope equation of a line, we find ...
q -200 = -10(p -4)
q = -10(p -4) +200 . . . . . add 200
revenue
Then the revenue is ...
r(p) = pq
r(p) = p(-10(p -4) +200) = p(-10p +240)
r(p) = -10p(p -24) . . . . factored form
maximum
This equation describes a parabola with zeros at p=0 and p=24. The peak value of the revenue is on the axis of symmetry, halfway between the zeros. That is, the price p=12 will maximize revenue. At that price, the revenue is ...
r(12) = -10(12)(12 -24) = 10(144) = 1440
The maximum revenue is $1440 at a ticket price of $12.00.
