File:Academ homothetic rectangles.svg

Size of this PNG preview of this SVG file: 600 × 600 pixels. Other resolutions: 240 × 240 pixels | 480 × 480 pixels | 768 × 768 pixels | 1,024 × 1,024 pixels | 2,048 × 2,048 pixels.

Original file ‎(SVG file, nominally 600 × 600 pixels, file size: 3 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

DescriptionAcadem homothetic rectangles.svg	English: When the duplication of a given rectangle preserves its shape, the ratio of its large dimension to the small one is a constant number in all the copies, equal to the original ratio. The largest rectangle of the drawing is similar to one or the other rectangle with stripes. From their width to their height, the coefficient of proportionality is: ${\tfrac {\,d\,}{c}}\,=\,{\tfrac {\,b\,}{a}}\,=\,{\tfrac {\,d\,+\,b\,}{c\,+\,a}}.\$ The value of each ratio Horizontally written within the image, at the top or the bottom, the value of each ratio determines the common shape of the three similar rectangles. If we define the shape of any rectangle by the ratio of its large dimension to its small one, we get a bijective correspondence between all the rectangular shapes and all the real numbers greater than or equal to 1. The ratio equals 1 if and only if the shape is square. The multiplicative inverses of all these ratios compose the interval of all the real numbers that are strictly positive and less than or equal to 1. The common diagonal of the similar rectangles divides each rectangle into two superposable triangles, with two different kinds of stripes. The four striped triangles and the two striped rectangles have a common vertex: the center of an homothetic transformation with a negative ratio $\,-k\ {\text{ or }}{\tfrac {\,-\,1\,}{k}},\$ that transforms one triangle and its stripes into another triangle with the same stripes, enlarged or reduced. Between the corresponding sides lengths of two homothetic triangles, the proportionality constant is the duplication scale, equal to a ratio obliquely written within the image: ${\tfrac {\,c\,}{a}}\,=\,k\ {\text{ or }}\ {\tfrac {\,a\,}{c}}\,=\,{\tfrac {1}{\,k\,}}.$ In the following proportion: $\,{\tfrac {\,a\,}{b}}\,=\,{\tfrac {c}{\,d\,}},\,$ $\,a{\text{ and }}d\$ are called the extremes, while b and c are the means, because a and d are the extreme terms of the list $\,(a,\ b,\ c,\ d\,),\$ while b and c are in the middle of the list. From any proportion, we get another proportion by inverting the extremes or the means. And the product of the extremes equals the product of the means. Each double arrow of the image indicates two inverted terms of the first proportion. From one half the surface of the largest rectangle, we get a plain gray rectangle either above or below the common diagonal of the similar rectangles, by removing two triangles with two different kinds of stripes. Above and below this diagonal, the areas of the two biggest triangles of the drawing are equal, because these triangles are superposable. Above and below the subtracted areas are equal for the same reason. Therefore the plain gray rectangles have the same area: a d = b c. Français : Quand la reproduction d’un rectangle donné conserve sa forme, le rapport de sa grande dimension à la petite est un nombre constant dans toutes les copies, égal au rapport d’origine. Le plus grand rectangle du dessin est semblable à l’un ou l’autre rectangle à rayures. De leur largeur à leur hauteur, le coefficient de proportionnalité est $\ {\tfrac {\,d\,}{c}}\,=\,{\tfrac {\,b\,}{a}}\,=\,{\tfrac {\,d\,+\,b\,}{c\,+\,a}}.\$ Inscrit à l’horizontale dans l’image, en haut ou en bas, la valeur de chaque rapport détermine la forme commune des trois rectangles semblables. Si on définit la forme d’un rectangle quelconque par le rapport de sa grande dimension à sa petite, on obtient une correspondance biunivoque entre toutes les formes rectangulaires et tous les nombres réels supérieurs ou égaux à 1. Le rapport est égal à 1 si et seulement si la forme est carrée. Les nombres inverses de tous ces rapports constituent l’intervalle de tous les nombres réels strictement positifs et inférieurs ou égaux à 1. La diagonale commune des rectangles semblables partage chaque rectangle en deux triangles superposables. Les quatre triangles à rayures et les deux rectangles à rayures ont un sommet commun : le centre d’une homothétie de rapport négatif $\,-k\ {\text{ ou }}{\tfrac {\,-\,1\,}{k}},\$ qui transforme un triangle et ses rayures en un autre triangle avec les mêmes rayures, agrandies ou réduites. Entre les longueurs des côtés correspondants de deux triangles homothétiques, le coefficient de proportionnalité est l'échelle de reproduction, égale à un rapport inscrit en oblique dans l'image: ${\tfrac {\,c\,}{a}}\,=\,k\ {\text{ ou }}\ {\tfrac {\,a\,}{c}}\,=\,{\tfrac {1}{\,k\,}}.$ Dans la proportion suivante : $\ {\tfrac {\,a\,}{b}}\,=\,{\tfrac {c}{\,d\,}},\$ les termes $\,a{\text{ et }}d\$ s’appellent les extrêmes, tandis que $\,b{\text{ et }}c\$ s’appellent les moyens, parce que $\,a{\text{ et }}d\$ sont les termes extrêmes de la liste $\,(a,\ b,\ c,\ d\,),\$ tandis que b et c sont au milieu de la liste. À partir de n’importe quelle proportion, on obtient une autre proportion en intervertissant les extrêmes ou les moyens. Et le produit des extrêmes est égal au produit des moyens. Dans l’image une double flèche indique une inversion de deux termes de la première proportion. À partir d’une moitié de la surface du plus grand rectangle du dessin, on obtient un rectangle gris uni soit au-dessus soit en dessous de la diagonale commune des rectangles semblables, en enlevant deux triangles qui ont deux sortes différentes de rayures. Au-dessus et en dessous de cette diagonale, les deux plus grands triangles du dessin ont des aires égales parce que ces triangles sont superposables. Au-dessus et en dessous les deux aires retranchées sont égales pour la même raison. Par conséquent, les rectangles gris uni ont la même superficie : a d = b c.
Date	20 June 2011
Source	Own work
Author	Baelde
Other versions
SVG development InfoField	The SVG code is valid. This /Baelde was created with a text editor.

Licensing

Baelde, the copyright holder of this work, hereby publishes it under the following license:

This file is licensed under the Creative Commons Attribution-Share Alike 3.0 Unported license.

Attribution: Baelde

You are free:

to share – to copy, distribute and transmit the work
to remix – to adapt the work

Under the following conditions:

attribution – You must give appropriate credit, provide a link to the license, and indicate if changes were made. You may do so in any reasonable manner, but not in any way that suggests the licensor endorses you or your use.
share alike – If you remix, transform, or build upon the material, you must distribute your contributions under the same or compatible license as the original.

File history

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

	Date/Time	Thumbnail	Dimensions	User	Comment
current	13:47, 15 September 2012		600 × 600 (3 KB)	wikimediacommons>Baelde	size 600 × 600, 'stroke-linejoin="bevel"' specified elsewhere for a better PNG conversion

File usage

There are no pages that use this file.

File:Academ homothetic rectangles.svg

Summary

Licensing

Captions

Items portrayed in this file

depicts

creator

some value

copyright status

copyrighted

copyright license

Creative Commons Attribution-ShareAlike 3.0 Unported

inception

20 June 2011

source of file

original creation by uploader

MIME type

image/svg+xml

checksum

3a75c5209f7ef4a6c680c032375ffc053128b986

data size

3,036 byte

height

600 pixel

width

600 pixel

File history

File usage

Navigation menu

File:Academ homothetic rectangles.svg

Summary

Licensing

Captions

Items portrayed in this file

some value

20 June 2011

image/svg+xml

3a75c5209f7ef4a6c680c032375ffc053128b986

3,036 byte

600 pixel

600 pixel

File history

File usage

Navigation menu

Search