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.
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لقد وَضَعَ صاحب حقوق التَّأليف والنَّشر هذا العملَ في النَّطاق العامّ من خلال تنازُلِه عن حقوق العمل كُلِّها في أنحاء العالم جميعها تحت قانون حقوق التَّأليف والنَّشر، ويشمل ذلك الحقوق المُتَّصِلة بها والمُجاورة لها برمتها بما يتوافق مع ما يُحدده القانون. يمكنك نسخ وتعديل وتوزيع وإعادة إِنتاج العمل، بما في ذلك لأغراضٍ تجاريَّةٍ، دون حاجةٍ لطلب مُوافَقة صاحب حقوق العمل.
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...