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Abstract Algebra, rings, zero divisors, and cartesian product
The problem states: Let R and S be nonzero rings. Show that R x S contains zero divisors. I had to look up what a nonzero ring was. This means the ring contains at least one nonzero element. R x S is the Cartesian Product so if we have two rings R and S If r1 r2 belong to R and s1 s1...- jamestrodden
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- Abstract Abstract algebra Algebra Cartesian Product Rings Zero
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- Forum: Calculus and Beyond Homework Help