Suppose the labor cost (in dollars) for manufacturing a camera can be approximated by L(x,y)= =x²+²-3x-6y-2xy + 101 where x is the number of hours required by a skilled craftsperson and y is the number of hours required by a semiskilled person. Find values of x and y that minimize the labor cost. Find the minimum labor cost. Labor cost will be minimized when x = and y= The minimum labor cost is $. (Round to the nearest cent)

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Suppose the labor cost (in dollars) for manufacturing a camera can be approximated by L(x,y)=x+y²-3x-6y - 2xy + 101 ( Эх where x is the number of hours required by a skilled craftsperson and y is the number of hours required by a semiskilled person. Find values of x and y that minimize the labor cost. Find the minimum labor cost. d-a dent Labor cost will be minimized when x = The minimum labor cost is $ ulus unct x.y)= es lec he Ge 0) + fy e point =and y=0. (Round to the nearest cent) Q ... Next 4:05 AM 7/15/2022

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Suppose the labor cost (in dollars) for manufacturing a camera can be approximated by 3 el L(x,y) = where x is the number of hours required by a skilled craftsperson and y is the number of hours required by a semiskilled person. Find values of x and y that minimize the labor cost. Find the minimum labor cost. nd-a 9x udent 2 x² + y²-3x -6y - 2xy + 101 2 Labor cost will be minimized when x = and y=[ The minimum labor cost is $ (Round to the nearest cent) culus ( funct f(x.y)= ses › lec the Ge - x0) + fy the point H Q (... Next 4:05 AM 7/15/2022