Mathematics, 08.02.2021 08:00 Miguel9825
A school typically sells 500 yearbooks in a year for 50$ each. The economics class does a project and discovers that they can sell 125 more yearbooks for every 5$ decrease in price. The revenue for yearbook sales is R(x)=(500+125x)(50-5x)
1: To maximize profit, what price should the school charge for the yearbooks?
Answer Choices:
35, 40, 45, and 50
2: What is the possible maximum revenue?
Answer Choices:
25000, 30625, and 43750
3: If the school attains the maximum revenue, how many yearbooks will they sell?
Answer Choices:
500, 625, 750 and 875
Answers: 3
Mathematics, 21.06.2019 17:00
Find dy/dx using implicit differentiation ln(20+e^xy)=y
Answers: 3
Mathematics, 21.06.2019 17:30
The manufacturer of a new product developed the following expression to predict the monthly profit, in thousands of dollars, from sales of the productwhen it is sold at a unit price of x dollars.-0.5x^2 + 22x - 224what is represented by the zero(s) of the expression? a.the profit when the unit price is equal to 0b.the unit price(s) when the profit is equal to 0c.the profit when the unit price is greatestd.the unit price(s) when profit is greatest
Answers: 3
Mathematics, 21.06.2019 20:30
What is the length of the segment, endpoints of which are intersections of parabolas y=x2? 11 4 x? 7 4 and y=? 7 8 x2+x+ 31 8 ?
Answers: 2
A school typically sells 500 yearbooks in a year for 50$ each. The economics class does a project an...
Mathematics, 26.02.2021 22:40
Chemistry, 26.02.2021 22:40
Mathematics, 26.02.2021 22:40
Social Studies, 26.02.2021 22:40
Physics, 26.02.2021 22:40
English, 26.02.2021 22:40
English, 26.02.2021 22:40
Mathematics, 26.02.2021 22:40
Mathematics, 26.02.2021 22:40
Advanced Placement (AP), 26.02.2021 22:40