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26 Μαΐ 2020 · After cutting out the squares from the corners, the width of the open-top box will be 5-2x, and the length will be 7-2x. We’re being asked to maximize the volume of a box, so we’ll use the formula for the volume of a box, and substitute in the length, width, and height of the open-top box.
If $1200\ \mathrm{cm}^2$ of material is available to make a box with a square base and an open top, find the largest possible volume of the box. The quantity we want to optimize is the volume of the box. Let $V$ be the volume of the box. We want to find the maximum value of $V$.
30 Ιουλ 2024 · To find the volume of a box, simply multiply length, width, and height — and you're good to go! For example, if a box is 5×7×2 cm, then the volume of a box is 70 cubic centimeters. For dimensions that are relatively small whole numbers, calculating volume by hand is easy.
21 Μαρ 2023 · Find the maximum volume of an open top prism with an isosceles base, if the surface area is constant and length is 1. 2 A closed top box is to be made from piece of cardboard with a surface area of 526.
9 Απρ 2020 · If 900 square cm of material is available to make a box with a square base and open top, what is the largest possible volume? The answer is $2598$ cm $^3$ , but I don't know how one gets this answer.
Maximizing the Volume of a Box. An open-top box is to be made from a 24 24 in. by 36 36 in. piece of cardboard by removing a square from each corner of the box and folding up the flaps on each side. What size square should be cut out of each corner to get a box with the maximum volume?
21 Δεκ 2020 · The remaining flaps are folded to form an open-top box. Step 1: We are trying to maximize the volume of a box. Therefore, the problem is to maximize \(V\). Step 2: The volume of a box is \(V=L⋅W⋅H\), where \(L,W,\)and \(H\) are the length, width, and height, respectively.
