
The demand function for a product is p= 108 - 0.2x where p is the price...
A commodity has a demand function modeled by p = 280 − 0.4x, and a total cost function modeled by C = 80x + 120, where x is the number of units. (a) What price yields a maximum profit? (b) Find the average cost per unit when x = 50 and x = 650. (c) Determine when the demand is elastic, inelastic, and of unit elasticity. (d) Use differentials to approximate the change in revenue as sales increase from 210...
A commodity has a demand function modeled by p=280 -0.44, and a total cost function modeled by C-80g + 120, where is the member of units. ) What price yields a maximum profil? $24880 b) Find the average cost per unit when - 50. - inelastic x1 and of unit elasticity Determine when the demand is elastic (Une interval notations only, where applicable) Uwe differentials to approximate the change in revenue as sales increase from 210 units to 220 units....
Use differentials to approximate the change in profit corresponding to an increase in sales (or production) of one unit. Then compare this with the actual chang in profit. Function x-Value P=-0.2x2 + 200x - 80 X = 40 dp = dollars AP = dollars Need Help? Read it Watch Tak to a Tutor 4. [1/2 Points) DETAILS PREVIOUS ANSWERS LARAPCALC10 3.8.034. MY NOTES PRACTICE ANOTHER The revenue R for a company selling x units is R = 800x - 0.1x?...
The demand for a product can be approximated by q=D(p)=80e−0.01p, where p represents the price of the product, in dollars, and q is the quantity demanded. (a) Find the elasticity function: E(p)= (b) Evaluate the elasticity at 5. E(5)= (c) Should the unit price be raised slightly from 5 in order to increase revenue? ? yes no (d) Use the elasticity of demand to find the price pp which maximizes revenue for this product. p=p= Round to three decimal places as needed.
Just need help with 41!
41: A) What is the rate of change of price with respect to the quantity demanded when q=49? B) Interpret your answer. 37. Revenue The revenue from the sale of a product is R = 1500x + 3000(2x + 3)-1 - 1000 dollars where x is the number of units sold. Find the marginal revenue when 100 units are sold. Interpret your result. 38. Revenue The revenue from the sale of x units of a...
Use differentials to approximate the change in cost corresponding to an increase in sales (or production) of one unit. Then compare this with the actual change in cost. (Round your answers to two decimal places.) Function x-Value C = 0.075x2 + 6x + 7 X = 10 dollars dc = AC = dollars Need Help? Raadi Wis This to a Tutor 2. (-/2 Points] DETAILS LARAPCALC10 3.8.016. MY NOTES PRACTICE ANOTHER Use differentials to approximate the change in revenue corresponding...
The demand function for a Christmas music CD is given by q=D(p)=0.25(225−p2) where qq (measured in units of a hundred) is the quantity demanded per week and pp is the unit price in dollars. (a) Find the elasticity function E(p)= (b) Evaluate the elasticity at 10. E(10)= (c) Should the unit price be lowered slightly from 10 in order to increase revenue? ? yes no (d) Use the elasticity of demand to find the price which maximizes revenue for this product. p= dollars...
14) The demand equation for a monopolist's product is p = 200 - 0.989, where p is the price per unit (in dollars) of producing q units. If the total cost c (in dollars) of producing 8 units is given by c= 0.02q2 + 2q + 8000, find the level of production at which profit is maximized. 15) The demand function for a monopolist's product is p = 100 – 39, where p is the price per unit (in dollars)...
The supply equation for a certain brand of radio is given as follows where x is the quantity supplied and p is the unit price in dollars. p s(x) = 0.3vx + 10 Use differentials to approximate the change in price when the quantity supplied is increased from 16900 units to 17400. (Give your answer correct to the nearest cent.)
The supply equation for a certain brand of radio is given as follows where x is the quantity supplied and...
If, in a monopoly market, the demand function for a product is p = 140 − 0.10x and the revenue function is R = px, where x is the number of units sold and p is the price per unit, what price will maximize revenue?