A firm produces two types of calculators each week, x of type A and y of type B. The weekly revenue and cost functions (in dollars) are as follows. R(x.y) 140x+ 170y + 0.05xy-0.04x-0.07y? Find P(1400,1700) and P,(1400,1700), and interpret the results. C(x,y) = 9x + 3y+ 20,000 P(1400,1700) = Choose the corect interpretation of P(1400,1700). O A. When selling 1,400 units of type A and 1,700 units of type B, the profit will increase approximately $104 per unit increase in production of type A. O B. Selling 1,400 units of type A and 1,700 units of type B will yield a profit of approximately $104. OC. Selling 1,400 units of type A and 1,700 units of type B will yield a profit of approximately $89. O D. When selling 1,400 units of type A and 1,700 units of type B, the profit will increase approximately $89 per unit increase in production of type A. Py(1400,1700) = Choose the correct interpretation of Py(1400,1700). O A. When selling 1,400 units of type A and 1,700 units of type B, the profit will decrease approximately $1 per unit increase in production of type B. O B. Selling 1,400 units of type A and 1,700 units of type B will yield a profit of approximately $14. OC. When selling 1,400 units of type A and 1,700 units of type B, the profit will decrease approximately $14 per unit increase in production of type B. OD. Selling 1,400 units of type A and 1,700 units of type B will yield a profit of approximately $1.
A firm produces two types of calculators each week, x of type A and y of type B. The weekly revenue and cost functions (in dollars) are as follows. R(x.y) 140x+ 170y + 0.05xy-0.04x-0.07y? Find P(1400,1700) and P,(1400,1700), and interpret the results. C(x,y) = 9x + 3y+ 20,000 P(1400,1700) = Choose the corect interpretation of P(1400,1700). O A. When selling 1,400 units of type A and 1,700 units of type B, the profit will increase approximately $104 per unit increase in production of type A. O B. Selling 1,400 units of type A and 1,700 units of type B will yield a profit of approximately $104. OC. Selling 1,400 units of type A and 1,700 units of type B will yield a profit of approximately $89. O D. When selling 1,400 units of type A and 1,700 units of type B, the profit will increase approximately $89 per unit increase in production of type A. Py(1400,1700) = Choose the correct interpretation of Py(1400,1700). O A. When selling 1,400 units of type A and 1,700 units of type B, the profit will decrease approximately $1 per unit increase in production of type B. O B. Selling 1,400 units of type A and 1,700 units of type B will yield a profit of approximately $14. OC. When selling 1,400 units of type A and 1,700 units of type B, the profit will decrease approximately $14 per unit increase in production of type B. OD. Selling 1,400 units of type A and 1,700 units of type B will yield a profit of approximately $1.
Chapter5: Exponential And Logarithmic Functions
Section: Chapter Questions
Problem 39CT: The population P (in millions) of Texas from 2001 through 2014 can be approximated by the model...
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![A firm produces two types of calculators each week, x of type A and y of type B. The weekly revenue and cost functions (in dollars) are as follows.
R(x.y) = 140x+ 170y+0.05xy-0.04x2-0.07y?
Find P(1400,1700) and P,(1400,1700), and interpret the results.
C(x,y) = 9x+3y + 20,000
P(1400,1700) =
Choose the correct interpretation of P(1400,1700).
O A. When selling 1,400 units of type A and 1,700 units of type B, the profit will increase approximately $104 per unit increase in production of type A.
O B. Selling 1,400 units of type A and 1,700 units of type B will yield a profit of approximately $104.
O C. Selling 1,400 units of type A and 1,700 units of type B will yield a profit of approximately $89.
O D. When selling 1,400 units of type A and 1,700 units of type B, the profit will increase approximately $89 per unit increase in production of type A.
Py(1400,1700) =]
Choose the correct interpretation of Py(1400,1700).
O A. When selling 1,400 units of type A and 1,700 units of type B, the profit will decrease approximately $1 per unit increase in production of type B.
O B. Selling 1,400 units of type A and 1,700 units of type B will yield a profit of approximately $14.
C. When selling 1,400 units of type A and 1,700 units of type B, the profit will decrease approximately $14 per unit increase in production of type B.
O D. Selling 1,400 units of type A and 1,700 units of type B will yield a profit of approximately $1.
Click to select your answer(s).](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F154e534f-21f3-46ca-b7cc-ee47efd09a39%2F37282202-e613-43c7-9e48-407923acc0ac%2Fhkiih78_processed.jpeg&w=3840&q=75)
Transcribed Image Text:A firm produces two types of calculators each week, x of type A and y of type B. The weekly revenue and cost functions (in dollars) are as follows.
R(x.y) = 140x+ 170y+0.05xy-0.04x2-0.07y?
Find P(1400,1700) and P,(1400,1700), and interpret the results.
C(x,y) = 9x+3y + 20,000
P(1400,1700) =
Choose the correct interpretation of P(1400,1700).
O A. When selling 1,400 units of type A and 1,700 units of type B, the profit will increase approximately $104 per unit increase in production of type A.
O B. Selling 1,400 units of type A and 1,700 units of type B will yield a profit of approximately $104.
O C. Selling 1,400 units of type A and 1,700 units of type B will yield a profit of approximately $89.
O D. When selling 1,400 units of type A and 1,700 units of type B, the profit will increase approximately $89 per unit increase in production of type A.
Py(1400,1700) =]
Choose the correct interpretation of Py(1400,1700).
O A. When selling 1,400 units of type A and 1,700 units of type B, the profit will decrease approximately $1 per unit increase in production of type B.
O B. Selling 1,400 units of type A and 1,700 units of type B will yield a profit of approximately $14.
C. When selling 1,400 units of type A and 1,700 units of type B, the profit will decrease approximately $14 per unit increase in production of type B.
O D. Selling 1,400 units of type A and 1,700 units of type B will yield a profit of approximately $1.
Click to select your answer(s).
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