Suppose the price of land in a city is given by the function - 10(x - 2)² - 15(y − 1)² P(x,y) = 137 - where P(x,y) is th

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Suppose The Price Of Land In A City Is Given By The Function 10 X 2 15 Y 1 P X Y 137 Where P X Y Is Th 1 (18.24 KiB) Viewed 48 times

Suppose the price of land in a city is given by the function - 10(x - 2)² - 15(y − 1)² P(x,y) = 137 - where P(x,y) is the price of land at the point (x,y) in dollars per square metre and x and y are measured in kilometres. At what point within the city is the price of land highest? (¹) 0 (-1/2-1/2) o(++) O (2,2) O None of the other answers O (1,1) O (0,0) 0 (¹,1)