Let $R$ be a ring with 1, and $I$ and $J$ be left ideasl of $R$ such that they are isomorphic as left $R$-modules. Is it true that the left ldeals $I^2$ and $J^2$ are isomorphic ? Thanks for any help!
2026-03-25 02:57:41.1774407461
Isomorphism between submodules as one-sided ideals
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