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Sarai Davenport

Sarai Davenport

Answered question

2022-06-23

Prove an equivalence relation: m R n 3 m 5 n is even
Let R be a relation on the integer set, where mRn iff 3 m 5 n is an even number. Prove that R is an equivalence relation. Find equivalence class [2].

Answer & Explanation

odmeravan5c

odmeravan5c

Beginner2022-06-24Added 20 answers

Explanation:
We have ( 3 m 5 n ) + ( 3 n 5 m ) = 2 m 2 n = 2 ( m + n ) which is even. So the first term of our sum is even if and only if the second term is.
Dale Tate

Dale Tate

Beginner2022-06-25Added 5 answers

Step 1
My suggestion would be to rephrase the definition first. A sum (difference) of two integers is even iff the two integers have the same parity, i.e. they are both odd or both even.
So 3 m 5 n is even if
- 3m and 5n are both odd, that is, m and n are both odd, or
- 3m and 5n are both even, that is, m and n are both even.
Step 2
With this reformulation, it should be straightforward to prove that R is an equivalence relation, and to determine the equivalence classes.

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