A closed rectangular box with a volume of is to be made of three different materials. The cost of the material for the top and the bottom is $9 per sq. ft, the cost of the material for the front and the back is $8 per sq. ft. and the cost of the material for other two sides is $6 per sq. ft. Find the dimensions of the box (by two ways if possible) so that the cost of materials is minimized.
Answers
Answered by
0
Answer:
he is the same as the other people in a FEW months and the new Yorker is the same as it was a member
Answered by
0
Explanation:
The question statement is not complete as we are not given the final volume of the rectangular box based on which we need to chose the dimensions of each sides of the box.
However the cost effective solution would be to keep the dimension of two sides maximum whose rate is $6 per sqrft, then comes the front and back side and the least dimension should be of top and front side. In this way, we will get least cost of box
Similar questions