Let R be the relation defined on Z (integers): a R b iff a + b...

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Question

Let R be the relation defined on Z (integers): a R b iff a + b...

Let R be the relation defined on Z (integers): a R b iff a + b is even. Suppose that 'even' is replaced by 'odd' . Which of the properties reflexive, symmetric and transitive does R possess?

Group of answer choices

Reflexive, Symmetric and Transitive

Symmetric

Symmetric and Reflexive

Symmetric and Transitive

None of the above

math Statistics-And-Probability

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Answer 1

Answer #1

The solution to this problem is given by

Solution Given is even abfz And a r b = atb) Now even is changed to odel New Relation becomes arba atb is oder il Reflexivity

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Answer 2

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Let R be the relation defined on Z (integers): a R b iff a + b...

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