# Ambivalence is direct product-closed

From Groupprops

This article gives the statement, and possibly proof, of a group property (i.e., ambivalent group) satisfying a group metaproperty (i.e., direct product-closed group property)

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## Statement

### Statement with symbols

Suppose is an indexing set and , is a collection of ambivalent groups. Let be the external direct product of the s. Then, is also an ambivalent group.