p is the price per unit in dollars and q is the number of units. If...

In this problem, p is the price per unit in dollars and q is the number...

In this problem, p is the price per unit in dollars and q is the number of units. If the weekly demand function is p = 120 − q and the supply function before taxation is p = 8 + 6q, what tax per item will maximize the total revenue? $____ /item

In this problem, p is the price per unit in dollars and q is the number...

In this problem, p is the price per unit in dollars and q is the number of units. If the weekly demand function is p = 120 − q and the supply function before taxation is p = 12 + 5q, what tax per item will maximize the total revenue?

In this problem, p is the price per unit in dollars and q is the number...

In this problem, p is the price per unit in dollars and q is the number of units. If the demand and supply functions for a product are p = 840 ? 2q and p = 100 + 0.5q, respectively, find the tax per unit t that will maximize the tax revenue T.

In this problem, p is the price per unit in dollars and q is the number...

In this problem, p is the price per unit in dollars and q is the number of units. If the demand and supply functions of a product are p = 5000 − 20q − 0.7q2 and p = 500 + 10q + 0.3q2, respectively, find the tax per unit t that will maximize the tax revenue T. T= $/Item

In this problem, p is the price per unit in dollars and q is the number...

In this problem, p is the price per unit in dollars and q is the number of units. If the demand and supply functions of a product are p = 6500 − 5q − 0.7q2 and p = 500 + 10q + 0.3q2, respectively, find the tax per unit t that will maximize the tax revenue T. t = $ /item

The price per unit of a product is p dollars and the number of units of...

The price per unit of a product is p dollars and the number of units of the product is denoted by q. The supply function for a product is given by (20,000/q)+15, and the demand for the productis given by p=(120+q)/4. Is the supply function a linear function or a shifted reciprocal function? Is the demand function a shifted linear function or a shifted reciprocal function?

Suppose the demand and supply functions for a product are P= 2800-8q-1/3q^2 and p = 400+2q,...

Suppose the demand and supply functions for a product are P= 2800-8q-1/3q^2 and p = 400+2q, respectively, where p is in dollars and q is the number of units. Find q that will maximize the tax revenue

In this problem, p, price, is in dollars and x is the number of units. The...

In this problem, p, price, is in dollars and x is the number of units. The demand function for a product is p = 206 − x2. If the equilibrium price is $10 per unit, what is the consumer's surplus? (Round your answer to two decimal places.) In this problem, p is in dollars and x is the number of units. The demand function for a certain product is p = 81 − x2 and the supply function is p...

JMC manufacturers sells 500 units per week at 29 dollars per unit. If the price is...

JMC manufacturers sells 500 units per week at 29 dollars per unit. If the price is reduced by one dollar, 20 more units will be sold. In addition, the cost function for JMC Manufacturers is also given by ?(?) = 40? + 10000 a. To maximize the revenue, find the following: I. [2 marks]. The number of units sold number of units sold. II. [2 marks]. The maximum revenue. b. [2 marks]. Find the value of x that maximizes the...

The short term demand for a product can be approximated by q = D(p) = 18...

The short term demand for a product can be approximated by q = D(p) = 18 − 2 √p where p represents the price of the product, in dollars per unit, and q is the number of units demanded. Determine the elasticity function. Use the elasticity of demand to determine if the current price of $50 should be raised or lowered to maximize total revenue.