Prove ar disprove: \langle\mathbb{Z}_{4},\oplus_{4},0\rangle\cong\langle B_{2},+,00

Braxton Pugh

Braxton Pugh

Answered question

2021-08-19

Prove ar disprove:
Z4,4,0=B2,+,00
where (+) is the Boolean (bitwise) sum on B2

Answer & Explanation

Latisha Oneil

Latisha Oneil

Skilled2021-08-20Added 100 answers

Step 1
Z4={0, 1, 2, 3,}
B2={00, 10, 01, 11}
+012300123112302230133012
From the table:
The inverse of 0 is 0
The inverse of q is 2
The inverse of 1 is 3
+001001110000100111101000110101011100101111011000
From the table:
The inverse of 00 is 00
The inverse of 10 is 10
The inverse of 01 is 01
The inverse of 11 is 11
Step 2
Hence take any bi function from Z4 to B2
Doesn't rove the operation
There is no harmonic function from Z4 to B2 Therefore it is the bi junction
Z4 is not isomorphic to B2
Proof:
Let f:Z4B2 be any map
Now (1, 4, 1)=f(q)
f(1)+f(1)=00
f(1)+B2 it has self inverse
Case1
f(2)=00
Now (1, 4, 2)=f(3)
f(1)+f(2)=f(1)+00=f(1)
f(3)=f(1)
13
Case2
f(2)00
f(1)+f(1)+00
f(1)+f(1, 4, 1)f(1)+f(1)
f is not a homojunction
Therefore from case 1,2, there is no bijective homojunction from f:Z4B2
Hence it is not isotropic.

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