HELP needed on HW Questions ASAP Discrete Mathematics: 11. E is the relation defin

ruigE

ruigE

Answered question

2021-08-11

HELP needed on HW Questions ASAP
Discrete Mathematics:
11. E is the relation defined on Z as follows: for all m,n,Z,mEn4(mn).
a) Prove that E is equivalence relation.
b) List five elements in [5].
c) Find a partition of set Z based on relation E.

Answer & Explanation

unett

unett

Skilled2021-08-12Added 119 answers

Step 1
Given a relation E on Z as follows: for m,n,Z,mEn4(mn).
Step 2
(a) To prove that E is an equivalence relation:
A relation is an equivalence relation if it is reflexive, symmetric and transitive.
i. Reflexive
Relation E is reflexive if mZ,mEm.
Here relation E is reflexive since 4|(mm)=4|0mZ,mEm.
Hence relation E is reflexive.
ii. Symmetric
Relation E is symmetric if mEnnEm.
If mEn4|mn=4|(nm)4(nm)nEm.
Thus, relation E is symmetric.
iii. Transitive
Relation E is transitive if mEn & nEpmEp.
Let mEn & nEp4|(mn) & 4|(np)
4|(mn)+(np)=4|mpmEp.
Thus, relation E is transitive.
E satisfies all the three conditions. Thus, it is an equivalence relation.

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