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

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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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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ISBN:

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Erwin Kreyszig

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