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- 12 bytes (1 word) - 16:49, 13 November 2008
- ...of generators. Every group is isomorphic to a [[quotient group]] of some free group, so understanding the properties of free groups helps us understand the str ...}x</math>. The [[equivalence class]]es now form a group, and this is the free group on ''X''.2 KB (436 words) - 02:56, 15 November 2008
- 595 bytes (73 words) - 17:25, 13 November 2008
- 169 bytes (28 words) - 16:53, 13 November 2008
- | pagename = Free group | abc = Free group2 KB (229 words) - 16:49, 13 November 2008
- 910 bytes (146 words) - 16:55, 13 November 2008
Page text matches
- ...of generators. Every group is isomorphic to a [[quotient group]] of some free group, so understanding the properties of free groups helps us understand the str ...}x</math>. The [[equivalence class]]es now form a group, and this is the free group on ''X''.2 KB (436 words) - 02:56, 15 November 2008
- {{r|Free group}}1 KB (180 words) - 17:00, 11 January 2010
- {{r|Free group}}2 KB (247 words) - 17:28, 11 January 2010
- | pagename = Free group | abc = Free group2 KB (229 words) - 16:49, 13 November 2008
- {{rpl|Free group}}5 KB (628 words) - 04:35, 22 November 2023
- ...very group is [[group isomorphism|isomorphic]] to a quotient group of some free group, so understanding the properties of free groups helps us understand the str ...m [[Cayley's theorem]]), its isomorphic version as a quotient group of a [[free group]], or as a group of matrices over some field (as a [[group representation]]15 KB (2,535 words) - 20:29, 14 February 2010
- 5 KB (688 words) - 11:35, 2 February 2023
- 7 KB (940 words) - 04:31, 22 November 2023
- In this sentence: ''A free group is a group in which every element of the group is a unique product, or stri13 KB (2,191 words) - 21:34, 13 February 2009