The relation R is an equivalence relation on the set A. Find the distinct equivalence classes of R. A={0,1,2,3,4}. R={(0,0),(0,4),(1,1),(1,3),(2,2),(3,1),(3,3),(4,0),(4,4)}

ridge041h

ridge041h

Answered question

2022-09-05

The relation R is an equivalence relation on the set A. Find the distinct equivalence classes of R.
A = { 0 , 1 , 2 , 3 , 4 }
R = { ( 0 , 0 ) , ( 0 , 4 ) , ( 1 , 1 ) , ( 1 , 3 ) , ( 2 , 2 ) , ( 3 , 1 ) , ( 3 , 3 ) , ( 4 , 0 ) , ( 4 , 4 ) }
Here is the solution:
[ 0 ] = { x A | x R 0 } = { 0 , 4 }
[ 1 ] = { x A | x R 1 } = { 1 , 3 }
[ 2 ] = { x A | x R 2 } = { 2 }
[ 3 ] = { x A | x R 3 } = { 1 , 3 }
[ 4 ] = { x A | x R 4 } = { 0 , 4 }
Note that [ 0 ] = [ 4 ] and [ 1 ] = [ 3 ]. Thus the distinct equivalence classes of the relation are {0,4}, {1,3}, and {2}.
My problem here is that I am not understanding the solution. I do not understand how it came up with an answer for each equivalence class of every element A. As in, how is {0,4} equal to { x A | x R 0 }, and how is that equal to [0]? I can understand that [ 0 ] = [ 4 ] since they both equal {0,4} but I'm not sure how to arrive at that answer.
I'm trying this problem:
A = { a , b , c , d }
R = { ( a , a ) , ( b , b ) , ( b , d ) , ( c , c ) , ( d , b ) , ( d , d ) }
However, I am lost because I do not understand how to arrive at answers for every element in A.

Answer & Explanation

Everett Melton

Everett Melton

Beginner2022-09-06Added 12 answers

Step 1
For the first problem 0 4 , 1 3 , 2 2 so you have 3 equivalence classes (note that R is an equivalence realation).
Step 2
For the second one
a a , b d , c c
Kenny Kramer

Kenny Kramer

Beginner2022-09-07Added 14 answers

Step 1
Firstly, you have to understand the definition of an equivalence relation. A relation is an equivalence relation if the following conditions are satisfied:
1. x A , x x ,
2. x , y A , x y y x ,
3. x , y , z A , x y , y z x z
Step 2
So given the information above (your example, I'll leave the exercise to you), since we have ( 0 , 0 ) , ( 0 , 4 ) , ( 4 , 4 ) R, we can conclude that 0 0 4 4, hence [ 0 ] = [ 4 ] = { 0 , 4 }.
Leave a comment if you are still uncertain.

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