Suppose we wish to create a closed box with volume 1 m3m3, as cheaply as possibl
ID: 2891302 • Letter: S
Question
Suppose we wish to create a closed box with volume 1 m3m3, as cheaply as possible. The material for the bottom and sides costs $10/m210/m2 and the material for the top costs $20/m220/m2. Which of the following is the correct cost function to be minimized (before using the constraint to eliminate a variable)?
Constrained Optimization Suppose we wish to create a closed bax with volume 1m3, as cheaply as possible. The material for the bottom and sides costs $10/m2 and the material for the top costs $20/m2. Which of the following is the correct cost function to be minimized (before using the constraint to eliminate a variable)? B 20a2+40ay O 30x2 4 O302+S0y O F None of the aboveExplanation / Answer
i think you mean box with square base
let the length of box =x , width of box =x , height of box =y
area of bottom =x2,area of top =x2,area of each of four sides =xy
cost of bottom =10x2,area of top =20x2,area of each of four sides =10xy
total cost =10x2+20x2+(4*10xy)
total cost =30x2+40xy
cost function is 30x2+40xy