Let X be a set of students, and Y be the set of science classes. We...

Let X be the set {1, 2, 3}. a)For each function f in the set of...

Let X be the set {1, 2, 3}. a)For each function f in the set of functions from X to X, consider the relation that is the symmetric closure of the function f'. Let us call the set of these symmetric closures Y. List at least two elements of Y. b) Suppose R is some partial order on X. What is the smallest possible cardinality R could have? What is the largest?

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 = {(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?

Problem 3 For two relations R1 and R2 on a set A, we define the composition...

Problem 3 For two relations R1 and R2 on a set A, we define the composition of R2 after R1 as R2°R1 = { (x, z) ∈ A×A | (∃ y)( (x, y) ∈ R1 ∧ (y, z) ∈ R2 )} Recall that the inverse of a relation R, denoted R -1, on a set A is defined as: R -1 = { (x, y) ∈ A×A | (y, x) ∈ R)} Suppose R = { (1, 1), (1, 2),...

If X, Y are topological spaces and f : X → Y we call the graph...

If X, Y are topological spaces and f : X → Y we call the graph of f the set Γf = {(x, f(x)); x ∈ X} which is a subset of X × Y. If X and Y are metric spaces and f is a continuous function prove that the graph of f is a closed set.

Let's say we have the following relation defined on the set {0, 1, 2, 3}: {...

Let's say we have the following relation defined on the set {0, 1, 2, 3}: { (0, 0), (0, 2), (2, 0), (2, 2), (2, 3), (3, 2), (3, 3) } - Please answer the following 3 questions about this relation. (The relation will be repeated for each question.) Is this relation a function? Why or why not? - What are the three properties that must be present in an equivalence relation? Please give the names of the three properties...

12. Let f(x, y) = c/x, 0 < y < x < 1 be the joint...

12. Let f(x, y) = c/x, 0 < y < x < 1 be the joint density function of X and Y . What is the value of c? a) 1; b) 2; c) 1/2; d) 2/3; e) 3/2. 13. In Problem 12, what is the marginal probability density function of X? a) x/2; b)1; c)1/x; d)x; e)2x. 14. In Problem 12, what is the marginal probability density function of Y ? a) ln y; b)−ln y; c)1; d)y; e)y2....

The grades of five students in mathematics and chemistry classes are: x = Mathematics 6 4...

The grades of five students in mathematics and chemistry classes are: x = Mathematics 6 4 8 5 3.5 y = Chemistry 6.5 4.5 7 5 4 Compute the correlation coefficient. (2 decimal places) Determine the regression line equation. (2 decimal places) Calculate the expected grade in chemistry for a student who has a 7.5 in mathematics. According to your model, if a student got a 7 in chemistry, what should the students mathematicsgrade have been? (nearest tenth)

Let fX,Y be the joint density function of the random variables X and Y which is...

Let fX,Y be the joint density function of the random variables X and Y which is equal to fX,Y (x, y) = { x + y if 0 < x, y < 1, 0 otherwise. } Compute the probability density function of X + Y . Referring to the problem above, compute the marginal probability density functions fX(x) and fY (y). Are the random variables X and Y independent?

In the following problems, set X represents the domain and Y is the set of values...

In the following problems, set X represents the domain and Y is the set of values that occur with a potential function, Confirm whether the function f can be defined according to the mapping Y. Set X consists of all the alumni of Anycollege University, set Y is each alumnus' alma mater. S X consists of the workers at Busy Firm, set Y is each worker's social security number Set X consists of all the people who have shared the...