Bearcat Fans Clothing Store is planning for the upcoming basketball season. They

Question

Bearcat Fans Clothing Store is planning for the upcoming basketball season. They have 2 shirts that they will be selling that look like the warm-up shirts that the Men's Basketball Team will be wearing. They have an screen print shirt (S) and an embroidered shirt (E) that they will be selling. Demand for the two shirts depends on selling price of both shirts. The demand for these two shirts are are follows: (DS is demand for the screen print shirt, PS is the selling price for the screen print shirt, DE is demand for the embroidered shirt, PE is the selling price for the embroidered shirt):

DS = 150 - 10PS + 1.8PE

DE = 525 +3.4PS - 19PE

The store wishes to determine the selling price that maximizes revenue for these two shirts. Develop a nonlinear optimization model to determine the optimal selling prices.

The Mathematical Model for the problem is

Maximize PS*DS + PE*DE - Which could be written  PS*(150 - 10PS + 1.8PE )+ PE*(525 +3.4PS - 19PE)

Subject to: PS, PE, DS, DE >= 0

A. What is the optimal selling price for the screen print shirt? (round your answer to 2 decimal places)  

B. What is the optimal selling prices for the embroidered shirt? (round your answer to 2 decimal places)

C. What is the maximum revenue? (round your answer to 2 decimal places)  

Explanation / Answer

DS = Demand for the screen print shirt

PS = Selling price for the screen print shirt

DE = Demand for the embroidered shirt

PE = Selling price for the embroidered shirt

Here as per question

DS = 150 - 10PS + 1.8PE

DE = 525 +3.4PS - 19PE

We have to maximize

Total Revenue TR = PS * DS + PE * DE

TR = PS * (150 - 10PS + 1.8PE ) + PE*(525 +3.4PS - 19PE)  

TR = 150 PS - 10PS2 + 1.8 PE .PS + 525 PE + 3.4 PE.PS - 19 PE2

TR = - 10PS2 - 19 PE2 + 5.2 PE.PS + 150 PS + 525 PE

Subject to: PS, PE, DS, DE >= 0

TO find optimum price of screen print shirt and embroidered shirt.

so first we would differentiate it with PS to find optimum price of print shirt and differentiate it with PE to find optimum price of embroidered shirt

d(TR)/ d(PS) = -20 PS + 5.2 PE + 150 ...(i)

d(TR)/ d(PE) = -38 PE + 5.2 PS + 525 ..(ii)

so both values would be zero for optimum price of  print shirt and embroidered shirt.

-20PS + 5.2 PE + 150 = 0

-38 PE + 5.2 PS + 525 = 0

solving both equations simultaneously

PS = $11.50 , PE = $ 15.39

(a) SO Optimum price of Print shirt = $ 11.50

(b) Optimum Price of Emproided shirt = $ 15.39

(c) Tota revenue = - 10PS2 - 19 PE2 + 5.2 PE.PS + 150 PS + 525 PE

= - 10 * 11.502 - 19 * 15.392 + 5.2 * 11.50 * 15.39 + 150 * 11.50 + 525 * 15.39

= $ 4902.38

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