7) There is no proper non-trivial maximal ideals in (Z2₁, because < > is a maximal ideal in Z2₁, ,0 ) IS (L , ) is a False statement
7) There is no proper non-trivial maximal ideals in (Z2₁, because < > is a maximal ideal in Z2₁, ,0 ) IS (L , ) is a False statement
Elements Of Modern Algebra
8th Edition
ISBN:9781285463230
Author:Gilbert, Linda, Jimmie
Publisher:Gilbert, Linda, Jimmie
Chapter8: Polynomials
Section8.4: Zeros Of A Polynomial
Problem 21E: Use Theorem to show that each of the following polynomials is irreducible over the field of...
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Question
pleaseeeeeee solve question 7
![1)
Z₁2/1
Z₁2/1
is a Field.
So if x is even
2) The map y: Z, -----→ Z₂ such that y(x) = {
1 if x is odd
is not a ring homomorphism because
3) Eisenstin Criteria for irreducibility Test Fails for f(x)=x+ 5x³-15x¹+ 15x³+25x² +5x+25
because
but for p=
,f(x) is irreducible using mod p-test.
4) In a ring R; The sum of two non-trivial idempotent elements is not always an
idempotent because in the ring.
idempotent
if we take
is not
"
5) There are more than two idempotent elements in the ring Z6Z6; here are some of
them (, ) , (, ) , ( , ) , (, )
6) There is a multiplicative inverse for (2x+3) in Z₁[x] because (ax+3b) (2x+3)=1_where
A =
and b =
7) There is no proper non-trivial maximal ideals in (Z2₁, , ) is a False statement
because < > is a maximal ideal in Z2₁,
,
)
8) If (1+x) is an idempotent in Z, then x is Always an idempotent is a False statement
because if x=
1+x is an idempotent element but x is not.
3
is not a Field Always because if we take the ideal I =
then](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F99bcfe6e-12ba-43b0-bdb4-9322452a0db3%2F90139375-7d28-4688-88d2-84f24137d544%2F4czqnpi_processed.jpeg&w=3840&q=75)
Transcribed Image Text:1)
Z₁2/1
Z₁2/1
is a Field.
So if x is even
2) The map y: Z, -----→ Z₂ such that y(x) = {
1 if x is odd
is not a ring homomorphism because
3) Eisenstin Criteria for irreducibility Test Fails for f(x)=x+ 5x³-15x¹+ 15x³+25x² +5x+25
because
but for p=
,f(x) is irreducible using mod p-test.
4) In a ring R; The sum of two non-trivial idempotent elements is not always an
idempotent because in the ring.
idempotent
if we take
is not
"
5) There are more than two idempotent elements in the ring Z6Z6; here are some of
them (, ) , (, ) , ( , ) , (, )
6) There is a multiplicative inverse for (2x+3) in Z₁[x] because (ax+3b) (2x+3)=1_where
A =
and b =
7) There is no proper non-trivial maximal ideals in (Z2₁, , ) is a False statement
because < > is a maximal ideal in Z2₁,
,
)
8) If (1+x) is an idempotent in Z, then x is Always an idempotent is a False statement
because if x=
1+x is an idempotent element but x is not.
3
is not a Field Always because if we take the ideal I =
then
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