XXXXXXXXXXX XXXXXXXXX XXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXX SOLVE STEP BY STEP SOLVE STEP BY STEP PLEASE VVVVVV VVVVVVVVV

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answerhappygod
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XXXXXXXXXXX XXXXXXXXX XXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXX SOLVE STEP BY STEP SOLVE STEP BY STEP PLEASE VVVVVV VVVVVVVVV

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Xxxxxxxxxxx Xxxxxxxxx Xxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxx Solve Step By Step Solve Step By Step Please Vvvvvv Vvvvvvvvv 1
Xxxxxxxxxxx Xxxxxxxxx Xxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxxx Solve Step By Step Solve Step By Step Please Vvvvvv Vvvvvvvvv 1 (52.05 KiB) Viewed 23 times
XXXXXXXXXXX XXXXXXXXX XXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXXX SOLVE STEP BY STEP SOLVE STEP BY STEP PLEASE VVVVVV VVVVVVVVV vvvvvvvv vvvvy Let A be a commutative ring, Man A-module and I an ideal of A. It is known that the IM set of linear combinations of the form ami + ·an mn: with a; E I, M; E M € mi for all i = 1, ..., n, is a submodule of M Prove that if M = An, then M/IM = (A/IA)"
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