For natural numbers x and y, define xRy if and only if x^2 + y is...

1. We define a relation C on the set of humans as xRy ⇐⇒ x and...

1. We define a relation C on the set of humans as xRy ⇐⇒ x and y were born in the same country Describe the equivalence class containing yourself as an element. 2. Let R be an equivalence relation with (x, y) ∈ R and (y, z) is not ∈ R (that is, y does not relate to z). Can you determine whether or not xRz? Why or why not?

Let R be the relation on the set of real numbers such that xRy if and...

Let R be the relation on the set of real numbers such that xRy if and only if x and y are real numbers that differ by less than 1, that is, |x − y| < 1. Which of the following pair or pairs can be used as a counterexample to show this relation is not an equivalence relation? A) (1, 1) B) (1, 1.8), (1.8, 3) C) (1, 1), (3, 3) D) (1, 1), (1, 1.5)

Prove that the relation R on the set of all people, defined by xRy if x...

Prove that the relation R on the set of all people, defined by xRy if x and y have the same first name is an equivalence relation.

Define the relation S on RxR by (x,y)S(a,b) if and only if x^2 + y^2= a^2...

Define the relation S on RxR by (x,y)S(a,b) if and only if x^2 + y^2= a^2 + b^2. a) Prove S in an equivalence relation b) compute [(0,0)], [(1,2)], and [(-3,4)]. c) Draw a picture in R^2 representing these three equivalence classes.

Consider the following relation on the set Z: xRy ? x2 + y is even. For...

Consider the following relation on the set Z: xRy ? x2 + y is even. For each question below, if your answer is "yes", then prove it, if your answer is "no", then show a counterexample. (i) Is R reflexive? (ii) Is R symmetric? (iii) Is R antisymmetric? (iv) Is R transitive? (v) Is R an equivalence relation? If it is, then describe the equivalence classes of R. How many equivalence classes are there?

4. Prove that {(x, y) ∈ R 2 ∶ x − y ∈ Q} is an...

4. Prove that {(x, y) ∈ R 2 ∶ x − y ∈ Q} is an equivalence relation on the set of real numbers, where Q denotes the set of rational numbers.

Using Discrete Math Let ρ be the relation on the set of natural numbers N given...

Using Discrete Math Let ρ be the relation on the set of natural numbers N given by: for all x, y ∈ N, xρy if and only if x + y is even. Show that ρ is an equivalence relation and determine the equivalence classes.

Define a relation ? over the set of nonzero rational numbers as ??? if and only...

Define a relation ? over the set of nonzero rational numbers as ??? if and only if ??>0. Is R an equivalence relation?

Let R = {(x, y) | x − y is an integer} be a relation on...

Let R = {(x, y) | x − y is an integer} be a relation on the set Q of rational numbers. a) [6 marks] Prove that R is an equivalence relation on Q. b) [2 marks] What is the equivalence class of 0? c) [2 marks] What is the equivalence class of 1/2?

Let A = {1,2,3,4,5,6,7,8,9,10} define the equivalence relation R on A as follows : For all...

Let A = {1,2,3,4,5,6,7,8,9,10} define the equivalence relation R on A as follows : For all x,y A, xRy <=> 3|(x-y) . Find the distinct equivalence classes of R(discrete math)