Prove \ker\phi=<<1+\sqrt{-5},\ 2>>

osula9a

osula9a

Answered question

2022-01-13

Prove kerϕ=1+5, 2

Answer & Explanation

Philip Williams

Philip Williams

Beginner2022-01-14Added 39 answers

Step 1
Let
ϕ:Z[5]Z2
ϕ(p+q5)=[p+q]2
Want to prove
kerϕ=1+5, 2
So what
m=p+q5kerϕ[p+q]2=[0]2p+q2Z
Step 2
Only need to prove that every element
p+q5
from the kernel is in
1+5, 2.
Since p+q is even, pq is also even,
=2n for some integer n.
Then
p+q5=n×2+q(1+5) as desired.
William Appel

William Appel

Beginner2022-01-15Added 44 answers

Step 1
Clearly
ϕ(1+5)=0
and
ϕ(2)=0.
Hence
1+5, 2ker(ϕ)
Suppose
a+b5
is in kernal. Then
a+b=2k
for some k. If both a and b are even, then
a+b5=2(a2+b25)1+5, 2
If both are odd, then
a+5=1+5+(a1)+(b1)5
as
(a1)1+5, 2
and (b1) are even. In any case
ker(ϕ)1+5, 2
And the conclusion follows.

Do you have a similar question?

Recalculate according to your conditions!

New Questions in Abstract algebra

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?

Product

Company

Connect with us

Get Plainmath App

Plainmath Logo

E-mail us: [email protected]

Our Service is useful for:

Plainmath is a platform aimed to help users to understand how to solve math problems by providing accumulated knowledge on different topics and accessible examples.

2023 Plainmath. All rights reserved