Let $R$ be a commutative ring.
Let $Q$ be a primary ideal of $R$.
Let $I,J$ be ideals of $R$ such that $IJ\subset Q$.
How do I prove that $I\subset Q$ or $J^n\subset Q$ for some positive integer $n$?
2026-04-15 12:51:15.1776257475
How do I prove that primary ideals satisfy this property?
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