Let R be a set with 2 laws of composition satisfying

September 28, 2025 Claire B 0 Comments

ring and kernel

i. Let R be a set with 2 laws of composition satisfying all
ring axioms except the comutative law for addition. Use the distributive law to
prove that the commutative law for addition holds, such that R is a ring.

ii. Find generator for the kernel of the map Z[x]->C
defined by x->sqrt(2)+sqrt(3).

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