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theorem:intersection_of_subgroups_is_a_subgroup
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Table of Contents
Intersection Of Subgroups Is A Subgroup
Theorem
If $G$ is a group, then the intersection of any collection of subgroups of $G$ is also subgroup.
Remarks
- None.
$\LaTeX$ version
- theorem.intersection_of_subgroups_is_a_subgroup.tex
%%%%% % DEPENDENCIES % None. %%%%% \begin{theorem} If $G$ is a group, then the intersection of any collection of subgroups of $G$ is also subgroup. \end{theorem}
External links
- Give links to external sources.
theorem
theorem/intersection_of_subgroups_is_a_subgroup.1377092627.txt.gz · Last modified: 2013/08/21 09:43 by joshuawiscons
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