Here is an equivalence relation R=\{(x,y)|x-y\} is an integer}. My question is: what is the equivalence class of 1 for this equivalence relation?

Avery Stewart

Avery Stewart

Answered question

2022-07-15

Here is an equivalence relation R = { ( x , y ) | x y } is an integer}
My question is: what is the equivalence class of 1 for this equivalence relation?
Can say indicate the equivalence class of 1 as [ ( 1 ) ] = { ( x , y ) , x y = }
I am confused about how to write the right hand side? can someone help me?

Answer & Explanation

esbalatzaj

esbalatzaj

Beginner2022-07-16Added 15 answers

Explanation:
The equivalence class of 1 is Z . Show that x 1 is an integer if and only if x is an integer.
Aphroditeoq

Aphroditeoq

Beginner2022-07-17Added 2 answers

Step 1
It seems like your equivalence relation is that x is related to y if x y Z .
Step 2
What numbers give integers if you subtract 1 from them? The integers, since they are closed under subtraction.

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