Please help me Proposition 12.8. If gcd(n, a) == 1 and n|(a b) then n|b.Proof. Suppose that gcd(n, a) = 1 and n divides a b. By Bézout'sLemma, nx+ay = 1 for some x, y = Z. Multiplying both sides by b weget nxbaby b. Since n divides both terms on the left, it divides bas well.The following statement is known as Euclid's lemma (or Euclid'sfirst theorem). It appears as Proposition 30 in Book VII of Euclid'sElements, written c. 300 BC. Prove Euclid's Lemma. (Hint: Use Prop 12.8)

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Answered: Prove Euclid's Lemma. (Hint: Use Prop…

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Prove Euclid's Lemma. (Hint: Use Prop 12.8)

Advanced Engineering Mathematics

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ISBN:9780470458365

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Question

Please help me

Proposition 12.8. If gcd(n, a) =
= 1 and n|(a b) then n|b.
Proof. Suppose that gcd(n, a) = 1 and n divides a b. By Bézout's
Lemma, nx+ay = 1 for some x, y = Z. Multiplying both sides by b we
get nxbaby b. Since n divides both terms on the left, it divides b
as well.
The following statement is known as Euclid's lemma (or Euclid's
first theorem). It appears as Proposition 30 in Book VII of Euclid's
Elements, written c. 300 BC.

Prove Euclid's Lemma. (Hint: Use Prop 12.8)

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