Discrete Math Equivalence Relation. Let f be some function with domain S and range T. Define a relation R by xRy to mean f(x)=f(y). Prove that R is an equivalence relation. If 4 is a member of S, what are the members of [4] (the set of all elements equivalent to 4 under under this equivalence relation)?

puntdald8

puntdald8

Answered question

2022-09-07

Discrete Math Equivalence Relation
Let f be some function with domain S and range T. Define a relation R by xRy to mean f ( x ) = f ( y ). Prove that R is an equivalence relation. If 4 is a member of S, what are the members of [4] (the set of all elements equivalent to 4 under under this equivalence relation)?
I'm not sure what exactly this question is asking...what does "relation R by xRy" mean?

Answer & Explanation

Savanah Morton

Savanah Morton

Beginner2022-09-08Added 15 answers

Step 1
First for your second question, [ 4 ] = { x : f ( x ) = f ( 4 ) } = f 1 ( f ( 4 ) ),
Step 2
and for the first question, we have
f ( x ) = f ( x ) x x reflexive holds , f ( x ) = f ( y ) f ( y ) = f ( x ) x y y x symmetric holds , f ( x ) = f ( y ) , f ( y ) = f ( z ) f ( x ) = f ( z ) x y , y z x z  transitivity holds  R is an equivalence relation
shosautesseleol

shosautesseleol

Beginner2022-09-09Added 16 answers

Step 1
R is a relation, it means that you identify all the members of a set that fulfill a certain condition, in this particular case you are searching all the members in S that goes to the same element in T under the function f. And we define an equivalence relation iff the relation is:
- Reflexive: xRx (x is relationed with itself)
- Symmetry: If xRy then yRx (x is relationed with y and so y with x)
- Transitivity: If xRy and yRz then xRz (x relationed with y, y with z then x is relationed with z)
Step 2
So, getting back to this particular exercise, xRy if f ( x ) = f ( y ) with f some function such that: f : S T, we shall prove this conditions:
- It is reflexive 'cause f ( x ) = f ( x )
- We have that xRy or f ( x ) = f ( y ) but that implies that f ( y ) = f ( x ) and so yRx
- If xRy and yRz then f ( x ) = f ( y ) and f ( y ) = f ( z ) and again that implies that f ( x ) = f ( z ) and so xRz.
Therefore R is an equivalence relation.

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