Question

The demand function for specialty steel products is given, where p is in dollars and q is the number of units. p = 150 3 130 − q (a) Find the elasticity of demand as a function of the quantity demanded, q. η = (b) Find the point at which the demand is of unitary elasticity. q = Find intervals in which the demand is inelastic and in which it is elastic. (Enter your answers using interval notation.) inelastic elastic (c) Use information about elasticity in part (b) to decide where the revenue is increasing, and where it is decreasing. (Enter your answers using interval notation.) increasing decreasing Use information about elasticity in part (b) to decide where the revenue is maximized. q =

3. [0.5/3.25 Points] DETAILS PREVIOUS ANSWERS HARMATHAP12 11.5.011. The demand function for specialty steel products is given, where p is in dollars and is the number of units. p = 150 130 - (a) Find the elasticity of demand as a function of the quantity demanded, 9. (b) Find the point at which the demand is of unitary elasticity. 9 = Find intervals in which the demand is inelastic and in which it is elastic. (Enter your answers using interval notation.) inelastic elastic (c) Use information about elasticity in part (b) to decide where the revenue is increasing, and where it is decreasing. (Enter your an interval notation.) increasing decreasing Use information about elasticity in part (b) to decide where the revenue is maximized. 9 = 101.25 (d) Graph the revenue function R = pq, and use it to find where revenue is maximized. R 70 000 R 70 000 LLLLLL 60 000 60 000

Answer 1

Giren, Then, Iso 130-9 p= dp da d (i sokol 130-14 5-9) dq Then, dp ds - 150+ I (130-25 -50 (130-qJ/ 3 da dp and da 7=P Then, so (130-95% 9 ар 7= iso 3/130-9 Х 22 22 (120-2) 2 so (130-25% Since ntave 390-32 Then, no 2 195 (b) mal 390-32 =) 390-49 3 12=975 390-32 > P 3 197.572 in elastic - (390-32 ) el (975,00) 0 For elastic : - (290-32) 7) o, 97.5) because <1 a Revenue will be increased. Because, Descentage change in price is greater than, percentage change indemand. - The Prevenue But, when n71 Revenue will get & % Charge in price <%. change in demand. The revenue is max. at point where the elasticity of demand is unitary elastic as Calculated above, Hence, the revenue is maximised at /q=97.5

P.S: If you are having any doubt, please comment here, I will surely reply you.Please provide your valuable feedback by a thumbsup. Your thumbsup is a result of our efforts. Your LIKES are very important for me so please LIKE….Thanks in advance!
Please like my solution, its my sincere request, I am in really bad situation, your "upvote" helps me a lot.