You defined x as the price, but did not use it as such
I will re-define x as the number of $1 increases
new price = (100+x)
number of rooms rented = 95-x
Revenue = R(x) = (100+x)(95-x)
= 9500 - 5x - x^2
R ' (x) = -5 - 2x
= 0 for a max of R(x)
2x=-5
x = -2.5
I will assume you want x to be a whole number, since you couldn't rent 92.5 rooms
so x = -3 or x = -2
if x = -3, rent = 97, number rented = 98
revenue = 97x98 = $9506
if x = -2, rent = 98, number rented = 97
revenue = 98x97 = $9506
So they should charge either $97$ or $98
A large hotel finds that it can rent 95 rooms when it charge $100 per room. For each $1 increase in room cost it rents one room less. (Likewise, for each $1 decrease in room cost it rents one room more) What price should it charge in order to maximize the revenue?
Well, revenue = total money taken in which = (price)(per room)
Let x = price
Revenue = x(190 - x) = -x^2 + 190x
x = -190 / 1(-1) = -190 / -1 = $190
See this is the answer Im coming up with but It doesnt look right, please help!
1 answer