English: Diagram demonstrating cosets. Here G is the set , the integers mod 8 under addition. The subgroup H contains only 0 and 4, and is isomorphic to . There are four cosets of H: H itself, 1+H, 2+H, 3+H (written using additive notation since this is an additive group). Together they partition the entire group G into equal-size, non-overlapping sets. Produced in Inkscape.
This SVG image was uploaded in a graphics format such as GIF, PNG, JPEG, or SVG. However, it consists purely or largely of information which is better suited to representation in wikitext (possibly using MediaWiki's special syntax for tables, math, or music). This will make the information easier to edit, as well as make it accessible to users of screen readers and text-based browsers. If possible, please replace any inclusions of this image in articles (noted under the "File links" header) with properly formatted wikitext. After doing so, please consider nominating this image for deletion.
저작물에 본 권리증서를 첨부한 자는 법률에서 허용하는 범위 내에서 저작인접권 및 관련된 모든 권리들을 포함하여 저작권법에 따라 전 세계적으로 해당 저작물에 대해 자신이 갖는 일체의 권리를 포기함으로써 저작물을 퍼블릭 도메인으로 양도하였습니다. 저작권자의 허락을 구하지 않아도 이 저작물을 상업적인 목적을 포함하여 모든 목적으로 복제, 수정·변경, 배포, 공연·실연할 수 있습니다.
http://creativecommons.org/publicdomain/zero/1.0/deed.enCC0Creative Commons Zero, Public Domain Dedicationfalsefalse
{{Information |Description ={{en|1=Diagram demonstrating cosets. Here G is the set <math>\mathbb{Z}_8</math>, the integers mod 8 under addition. The subgroup H contains only 0 and 4, and is isomorphic to <math>\mathbb{Z}_2</math>. There are four cos...