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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+ 190y+ 0.05xy-0.08x² -0.09y? Find P, (1400,1900) and P,(1400,1900), and interpret the results. C(x,y) =2x+2y+30,000 Px(1400,1900) = Choose the correct interpretation of P(1400,1900). O A. When selling 1,400 units of type A and 1,900 units of type B, the profit will increase approximately $9 per unit increase in production of type A. O B. Selling 1,400 units of type A and 1,900 units of type B will yield a profit of approximately $16. O C. Selling 1,400 units of type A and 1,900 units of type B will yield a profit of approximately $9. O D. When selling 1,400 units of type A and 1,900 units of type B, the profit will increase approximately $16 per unit increase in production of type A. Py(1400,1900) = Choose the correct interpretation of Py(1400,1900). O A. Selling 1,400 units of type A and 1,900 units of type B will yield a profit of approximately $59. O B. When selling 1,400 units of type A and 1,900 units of type B, the profit will decrease approximately $59 per unit increase in production of type B. OC. Selling 1,400 units of type A and 1,900 units of type B will yield a profit of approximately $84. O D. When selling 1,400 units of type A and 1,900 units of type B, the profit will decrease approximately $84 per unit increase in production of type B. Click to select your answer(s).