Determine whether R is reflexive, symmetric, antisymmetric, or transitive. Note:

Question

Determine whether R is reflexive, symmetric, antisymmetric, or transitive.

Note: you need not prove that R is an equivalence relation.

(a) Determine the partition of the set A below into equivalence classes of R(restricted to A).

1. Let v be a non-empty universal set, and let R be a binary relation on the set Pu defined by ARB Determine whether R is reflexive, symmetric, antisymmetric, or transitive. 2. A binary relation R is defined on the set F = {F: R right arrow R} as follows : (f,g) E R f = cg for some constant C E Q+ (Note: f = cg means f(x) = cg(x) for all x R.) Prove that R is an equivalence relation on F 3. An equivalence relation R is defined on the set R+ as follows: Note: you need not prove that R is an equivalence relation.(a) Determine the partition of the set A below into equivalence classes of R(restricted to A). (b) Give a geometric description of the equivalence class [ (1,-1) R on R^2

Explanation / Answer

1) Reflexive as AU A =A

2) Transitive as AUB =v means BUA = v

3) AU(BUC) =(AUB)UC

Hence transitive also

Thus equivalence relation

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f=cg where c is a scalar

When c=1, f=f hence reflexive

f=cg means g = f/c for c not equal to 0. hence symmetric

f=cg and g = c'h implies f = cc'h

Thus transitive, hence equivalence.

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