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 =
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The demand function for specialty steel products is given, where p is in dollars and q...
dont need multiple choicd just fill in the blank In this problem, p is in dollars and is the number of units. Suppose that the demand for a product is given by + ?)=3-1380 (a) Find the elasticity when - s. (Round your answer to two decimal places.) (b) Tell what type of elasticity this is. Demand is elastic Demand is inelastic. Demand is unitary. (c) How would a price increase affect revenue? An increase in price increases revenue. An...
Question 2: A monopolistic firm produces goods in a market where the demand function is P = 43 - 0.3Q and the corresponding total cost function is TC =0.0103 – 0.4Q2 +3Q (a) What can you say about the fixed costs of this firm? (b What can you say about the variable costs of this firm? (c) Find the (non-zero) output for which average cost is equal to marginal cost, and explain the significance of this value. (d Find the...
find the revenue equation, use calculus to find where the revenue is increasin and decreasing, sketch the graph of the revenue equation. 3. For the following function, I q = 20(10-p), 0 <p s 10 find the elasticity of demand function, regions of elastic, unitary, and inelastic demand. Your answers should involve both variables p and q. 4. The equations in problems 3 and 4 represent the same relationship between the supply and demand. The equation in problem 3 is...
The demand function of canned soda is linear Q=2000-500p, where Q is quantity in cans and p is price/can in dollars. 1) when p=1.5, what is the elasticity of demand? 2) what is the price at which the demand for soda has unitary elasticity? 3) suppose after the anti-sugar campaign, the demand function of soda becomes Q=2500-500p^2. at the price, you identified in (b), what is the elasticity of demand now given the new demand function? is it elastic or...
For the demand function q =D(P) = 340 - p, find the following. a) The elasticity b) The elasticity at p = 105, stating whether the demand is elastic, inelastic or has unit elasticity c) The value(s) of p for which total revenue is a maximum (assume that p is in dollars) a) Find the equation for elasticity E(p) = 0 b) Find the elasticity at the given price, stating whether the demand is elastic, inelastic or has unit elasticity....
In this problem, p is in dollars and q is the number of units. (a) Find the elasticity of the demand function 2p + 39 = 216 at the price p = 12. (b) How will a price increase affect total revenue? O Since the demand is elastic, an increase in price will decrease the total revenue. O Since the demand is unitary, there will be no change in the revenue with a price increase. Since the demand is elastic,...
2. Demand and supply equations for Good X is given as: Demand: P=6 - (1/50) Q and Supply: P= 1 + (1/100) Q [P: Price, Q: Quantity] i. Given the above information find the equilibrium price and quantity for Good X. ii. What is the point elasticity of demand at equilibrium? Is it elastic, inelastic or unitary elastic? iii. What is the point elasticity of supply at equilibrium? Is it elastic, inelastic or unitary elastic? iv. If the price increases...
For the demand function q = D(p) = /452 - p, find the following. a) The elasticity b) The elasticity at p= 107, stating whether the demand is elastic, inelastic or has unit elasticity c) The value(s) of p for which total revenue is a maximum (assume that p is in dollars)
For the demand function q = D(p) = 453 - p, find the following. a) The elasticity b) The elasticity at p = 118, stating whether the demand is elastic, inelastic or has unit elasticity c) The value(s) of p for which total revenue is a maximum (assume that p is in dollars) a) Find the equation for elasticity. E(p) =
3. Suppose the demand function for a firm's product is given by In Q 7-1.5 In P 2 In P, -0.5 In M +InA where P = $15, P, = $6, M $40,000, and A $350. a. Determine the own price elasticity of demand, and state whether demand is b. Determine the cross-price elasticity of demand between good X and good c. Determine the income elasticity of demand, and state whether good X is a d. Determine the own advertising...