Ask Question
2 September, 10:44

The estimated monthly sales of mona lisa paint-by-number sets is given by the formula q = 97e-3p2 + p, where q is the demand in monthly sales and p is the retail price in hundreds of yen. (a) determine the price elasticity of demand e when the retail price is set at ¥400. e = interpret your answer. the demand is going by % per 1% increase in price at that price level. thus, a large price is advised. (b) at what price will revenue be a maximum? hundred yen (c) approximately how many paint-by-number sets will be sold per month at the price in part (b) ? (round your answer to the nearest integer.) 17 paint-by-number sets per month

+3
Answers (1)
  1. 2 September, 14:06
    0
    Answer: A. E = (dq/dp) * (p/q) = (99e*p - 6p^2 + p) / (99eâ’3p2 + p) = (198e - 22) / (99e - 10) B. max: pq=99ep - 3p^3 + p^2. FOC: dqp/dp = 99e - 9p^2 + 2p = 0. now solve this quad for p ... C. plug the answer for p that solves 99e - 9p^2 + 2p = 0 into q = 99eâ’3p2 + p.
Know the Answer?
Not Sure About the Answer?
Find an answer to your question ✅ “The estimated monthly sales of mona lisa paint-by-number sets is given by the formula q = 97e-3p2 + p, where q is the demand in monthly ...” in 📘 Business if you're in doubt about the correctness of the answers or there's no answer, then try to use the smart search and find answers to the similar questions.
Search for Other Answers