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- Subgroup_test abstract "In abstract algebra, the one-step subgroup test is a theorem that states that for any group, a nonempty subset of that group is itself a group if the inverse of any element in the subset multiplied with any other element in the subset is also in the subset. The two-step subgroup test is a similar theorem which requires the subset to be closed under the operation and taking of inverses.".
- Subgroup_test wikiPageID "10653301".
- Subgroup_test wikiPageRevisionID "592896363".
- Subgroup_test hasPhotoCollection Subgroup_test.
- Subgroup_test subject Category:Articles_containing_proofs.
- Subgroup_test subject Category:Theorems_in_group_theory.
- Subgroup_test type Abstraction100002137.
- Subgroup_test type Communication100033020.
- Subgroup_test type Message106598915.
- Subgroup_test type Proposition106750804.
- Subgroup_test type Statement106722453.
- Subgroup_test type Theorem106752293.
- Subgroup_test type TheoremsInAlgebra.
- Subgroup_test type TheoremsInGroupTheory.
- Subgroup_test comment "In abstract algebra, the one-step subgroup test is a theorem that states that for any group, a nonempty subset of that group is itself a group if the inverse of any element in the subset multiplied with any other element in the subset is also in the subset. The two-step subgroup test is a similar theorem which requires the subset to be closed under the operation and taking of inverses.".
- Subgroup_test label "Subgroup test".
- Subgroup_test sameAs m.02qlbbv.
- Subgroup_test sameAs Q7631155.
- Subgroup_test sameAs Q7631155.
- Subgroup_test sameAs Subgroup_test.
- Subgroup_test wasDerivedFrom Subgroup_test?oldid=592896363.
- Subgroup_test isPrimaryTopicOf Subgroup_test.