File:Open-top box.svg

From Department of Mathematics at UTSA
Jump to navigation Jump to search

Original file(SVG file, nominally 424 × 401 pixels, file size: 20 KB)

This file is from Wikimedia Commons and may be used by other projects. The description on its file description page there is shown below.

Summary

Description
English: Problem from Elements of the Differential and Integral Calculus:

It is desired to make an open-top box of greatest possible volume from a square piece of tin whose side is a, by cutting equal squares out of the corners and then folding up the tin to form the sides. What should be the length of a side of the squares cut out?

Date
Source Own work
Author Eviatar Bach
 
This W3C-unspecified vector image was created with Inkscape .

Licensing

I, the copyright holder of this work, hereby publish it under the following license:
Creative Commons CC-Zero This file is made available under the Creative Commons CC0 1.0 Universal Public Domain Dedication.
The person who associated a work with this deed has dedicated the work to the public domain by waiving all of their rights to the work worldwide under copyright law, including all related and neighboring rights, to the extent allowed by law. You can copy, modify, distribute and perform the work, even for commercial purposes, all without asking permission.

Captions

Add a one-line explanation of what this file represents

Items portrayed in this file

depicts

28 April 2012

File history

Click on a date/time to view the file as it appeared at that time.

Date/TimeThumbnailDimensionsUserComment
current02:39, 28 April 2012Thumbnail for version as of 02:39, 28 April 2012424 × 401 (20 KB)InverseHypercubeaccurate proportions

The following 2 pages use this file: