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The query [[Proves property satisfaction of::Powering-invariant subgroup]] was answered by the SMWSQLStore3 in 0.0080 seconds.

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C-closed implies powering-invariant, Characteristic subgroup of abelian group implies powering-invariant, Derived subgroup not is powering-invariant, Divisibility-closed implies powering-invariant, Endomorphism image implies powering-invariant, Every normal subgroup satisfies the quotient-to-subgroup powering-invariance implication, Finite implies powering-invariant, Finite index implies powering-invariant, Powering-invariance is centralizer-closed, Powering-invariance is strongly intersection-closed, Powering-invariance is transitive

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