volume = v = x^2 h
area = a = x^2 + 4 x h
h = 108/x^2
a = x^2 + 4 x (108/x^2)
a = x^2 + 432/x
da/dx = 0 = 2 x -432/x^2
432 = 2 x^3
x^3 = 216
x = 6
h = 108/36 = 3
An OPEN box has a square base and a volume of 108 cubic inches and is constructed from a tin sheet. Find the dimensions of the box, assuming a minimum amount of material is used in it's construction. HINT: the goal is to minimize the surface are of the OPEN box; this is the function that needs to be minimized. Express the function as a function of one variable using the fact that the volume is 108 cubic inches.
3 answers
061
X=6,y=6,h=3
1 answer