5/ Let n E Z* be square free, that is, not divisible by the square of any prime integer. Let Z\/-n]= td + ib n|a, b e Z}. a. Show that the norm N, defined by N(a) = a? +nb? for a = a + ib /n, is a multiplicative norm on Z[-n]. b. Show that N(a) = 1 for a e Z[-n] if and only if a is a unit of Z[-n]. c. Show that every nonzero a e Z[/-n] that is not a unit has a factorization into irreducibles in Z[-n]. [Hint: Use part (b).] 1la hs 7} for sauare free n > 1. with N defined by N(@) =

5/ Let n E Z* be square free, that is, not divisible by the square of any prime integer. Let Z\/-n]= td + ib n|a, b e Z}. a. Show that the norm N, defined by N(a) = a? +nb? for a = a + ib /n, is a multiplicative norm on Z[-n]. b. Show that N(a) = 1 for a e Z[-n] if and only if a is a unit of Z[-n]. c. Show that every nonzero a e Z[/-n] that is not a unit has a factorization into irreducibles in Z[-n]. [Hint: Use part (b).] 1la hs 7} for sauare free n > 1. with N defined by N(@) =

Name: Number 16 (a) (b) and (c) ii. Z[i]/(1+i)iii. Z[i]/(1+2i)16. Let n E ZT
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Description: Number 16 (a) (b) and (c) ii. Z[i]/(1+i)iii. Z[i]/(1+2i)16. Let n E ZT be square free, that is, not divisible by the square of any prime integer. Let Z[/-n] = {d +ib n a, b e Z}.a. Show that the norm N, defined by N(a) = a² + nb² for a = a + ib/n,is

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter1: Fundamental Concepts Of Algebra

Section1.1: Real Numbers

Problem 35E

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Units and Measurements

Measurements and comparisons are the foundation of science and engineering. We, therefore, need rules that tell us how things are measured and compared. For these measurements and comparisons, we perform certain experiments, and we will need the experiments to set up the devices.

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Question

Number 16 (a) (b) and (c)

ii. Z[i]/(1+i)
iii. Z[i]/(1+2i)
16. Let n E ZT be square free, that is, not divisible by the square of any prime integer. Let Z[/-n] = {d +
ib n a, b e Z}.
a. Show that the norm N, defined by N(a) = a² + nb² for a = a + ib/n,is a multiplicative norm on Z[/-n].
b. Show that N(a) = 1 for a e Z[=n] if and only if a is a unit of Z[/-n].
c. Show that every nonzero a e Z[/-n] that is not a unit has a factorization into irreducibles in Z[/-n].
[Hint: Use part (b).]
1la hs 7} for square free n > 1, with N defined by N(@) =

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