Let S be the set S= {a+bk: a,bƐ R}, where k is a formal symbol. Define addition and multiplication operations on S as follows: given elements x = a+ bk and y =c+dk in S, x+y:= (a+c)+ (b+d)k, xy:= (ac+...

(a) Prove both identity laws for S. Include a short explanation (one sentence is fine)
of how you know what the identity elements are.
(b) Prove that the multiplicative inverse law is false for S. [That is, don’t just write
down a counterexample; also prove that your counterexample is valid.]

Let S be the set<br>S= {a+bk: a,bƐ R},<br>where k is a formal symbol. Define addition and multiplication operations on S as<br>follows: given elements x = a+ bk and y =c+dk in S,<br>x+y:= (a+c)+ (b+d)k,<br>xy:= (ac+ bd)+ (ad + bc)k.<br>

Extracted text: Let S be the set S= {a+bk: a,bƐ R}, where k is a formal symbol. Define addition and multiplication operations on S as follows: given elements x = a+ bk and y =c+dk in S, x+y:= (a+c)+ (b+d)k, xy:= (ac+ bd)+ (ad + bc)k.

Jun 04, 2022

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Let S be the set S= {a+bk: a,bƐ R}, where k is a formal symbol. Define addition and multiplication operations on S as follows: given elements x = a+ bk and y =c+dk in S, x+y:= (a+c)+ (b+d)k, xy:= (ac+...

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