Find the dimensions of the open rectangular box of maximum volume that can be made from a sheet of cardboard 29 in. by 16 in. by cutting congruent squares from the corners and folding up the sides. Then find the volume.

Question

Mathematics

Jarrett Mcdonald

11 May, 10:31

Find the dimensions of the open rectangular box of maximum volume that can be made from a sheet of cardboard 29 in. by 16 in. by cutting congruent squares from the corners and folding up the sides. Then find the volume.

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Answers (1)

Know the Answer?

Clare Chavez · Answer 1

height = 3.3 in

V = 694.848 in^3

Step-by-step explanation:

length of cardboard, l = 29 in

width of cardboard, w = 16 in

let the side of square is d.

so the length of box = 29 - 2y

width of box = 16 - 2y

height of box = y

Volume of box = length x width x height

V = (29 - 2y) x (16 - 2y) x y

V = 464 y - 90 y^2 + 4 y^3

dV / dy = 464 - 180 y + 12y^2

For maxima and minima, dV/dy = 0

12y^2 - 180 y + 464 = 0

By solving

y = 3.3 in, 11.7 in

Now find double differentiation

d²V/dy² = 24 y - 180

Put, y = 3.3 in, it is - 100.8

Put, y = 11.7 in, it is + 100.8

So for maximum volume, y = 3.3 in

And the value of maximum volume

V = 464 (3.3) - 90 (3.3 x 3.3) + 4 (3.3 x 3.3 x 3.3) = 1531.2 - 980.1 + 143.748

V = 694.848 in^3