Let H be a nonempty subset of Z. Suppose that the relation R defined on Z by a R b if a – be H is an equivalence relation. Verify the following. 1. 0 e H 2. If a E H, then -a e H. 3. If a, b e H, then a + b e H.

Let H be a nonempty subset of Z. Suppose that the relation R defined on Z by a R b if a – be H is an equivalence relation. Verify the following. 1. 0 e H 2. If a E H, then -a e H. 3. If a, b e H, then a + b e H.

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Let H be a nonempty subset of Z. Suppose that the relation R defined on Z by a Rb if a – b E H is an equivalence relation. Verify the following.
1.0 € H
2. If a E H, then -a e H.
3. If a, b e H, then a + be H.

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I know that in order to show an equivalence relation I need to check for (1) reflexivity, (2) Symmetry, and (3) transitivity. I just cant figure out how to prove those things for this problem. (Problem attached.)