Four hundred eighty dollars are available to fence in a rectangular garden. the fencing for the north and south sides of the garden costs $10 per foot and the fencing for the east and west sides costs $15 per foot. find the dimensions of the largest possible garden. (give exact answers.)
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Answer:
The rectangle will be its largest when the cost of the north/south fencing is equal to the cost of the east/west fencing, and both are half the total.The north and south dimensions will be ($480/2)/($10/ft)/2 = 12 ft.The east and west dimensions will be ($480/2)/($15/ft)/2 = 8 ft.The largest possible garden is 12 ft in the north-south direction by 8 ft in the east-west direction._____Let p represent the cost per foot in the x direction, and let q represent the cost per foot in the y direction. Then the total cost is... C = 2px + 2qyand the area is... A = xyIn terms of x, the area is... A = x(C -2px)/(2q)This describes a downward-opening parabola whose vertex is at x=C/(4p). That is, the value of x will be C/(4p) and the cost in the x-direction will be.. 2px = 2p(C/(4p)) = C/2
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