Difference between revisions of "Tour:No proper nontrivial subgroup implies cyclic of prime order"

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(New page: {{tour-regular| previous = Subgroup containment relation equals divisibility relation on generators| next = Exploration of cyclic groups| secnum = four}} {{quotation|'''WHAT YOU NEED TO DO...)
 
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{{quotation|'''WHAT YOU NEED TO DO''': Understand, thoroughly, the statement and proof of this theorem.}}
 
{{quotation|'''WHAT YOU NEED TO DO''': Understand, thoroughly, the statement and proof of this theorem.}}
{{#lst:No proper nontrivial subgroup implies cyclic of prime order|main}}
 
 
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previous = Subgroup containment relation equals divisibility relation on generators|
 
previous = Subgroup containment relation equals divisibility relation on generators|
 
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Revision as of 19:30, 8 September 2008


PREVIOUS: Subgroup containment relation equals divisibility relation on generators| UP: [[Tour:Introduction four ({{{target}}})|Introduction four ({{{target}}})]]| NEXT: Exploration of cyclic groups
[[Tour:General instructions ({{{target}}})|General instructions for the tour]] | [[Tour:Pedagogical notes ({{{target}}})|Pedagogical notes for the tour]] | [[Tour:Pedagogical notes four ({{{target}}})|Pedagogical notes for this part]]
WHAT YOU NEED TO DO: Understand, thoroughly, the statement and proof of this theorem.

PREVIOUS: Subgroup containment relation equals divisibility relation on generators| UP: [[Tour:Introduction four ({{{target}}})|Introduction four ({{{target}}})]]| NEXT: Exploration of cyclic groups