Give two examples each of sets that a) are denumerable b) are not denumerable c) are...

Using the following theorem: If A and B are disjoint denumerable sets, then A ∪ B...

Using the following theorem: If A and B are disjoint denumerable sets, then A ∪ B is denumerable, prove the union of a finite pairwise disjoint family of denumerable sets {Ai :1,2,3,....,n} is denumerable

Given two sets A and B, the intersection of these sets, denoted A ∩ B, is...

Given two sets A and B, the intersection of these sets, denoted A ∩ B, is the set containing the elements that are in both A and B. That is, A ∩ B = {x : x ∈ A and x ∈ B}. Two sets A and B are disjoint if they have no elements in common. That is, if A ∩ B = ∅. Given two sets A and B, the union of these sets, denoted A ∪ B,...

For each of the following, give a specific example of sets that satisfy the stated conditions....

For each of the following, give a specific example of sets that satisfy the stated conditions. (a) A and B are infinite and |B −A| = 3. (b) A is infinite, U is infinite, and Ac is infinite. (c) A is infinite, U is infinite, and Ac is finite.

What does it mean for a set A to be compact in R? Give two examples...

What does it mean for a set A to be compact in R? Give two examples of compact sets.

If A and B are two finite sets. Prove that |A ∪ B| = |A| +...

If A and B are two finite sets. Prove that |A ∪ B| = |A| + |B| − |A ∩ B| is true.

Explain the nature of subsidiary ledgers, and give two specific examples. For each of these examples,...

Explain the nature of subsidiary ledgers, and give two specific examples. For each of these examples, explain (1) the unit of organization within this ledger, and (2) the usefulness of this ledger in business operations.

Let f : A → B and g : B → C. For each of the...

Let f : A → B and g : B → C. For each of the statements in this problem determine if the statement is true or false. No explanation is required. Just put a T or F to the left of each statement. a. g ◦ f : A → C b. If g ◦ f is onto C, then g is onto C. c. If g ◦ f is 1-1, then g is 1-1. d. Every subset of...

Determine whether each of these sets is finite, countably infinite, or uncountable. For those that are...

Determine whether each of these sets is finite, countably infinite, or uncountable. For those that are countably infinite, exhibit a one-to-one correspondence between the set of positive integers and that set. For those that are finite or uncountable, explain your reasoning. a. integers that are divisible by 7 or divisible by 10

Give a regular expression for each of the following sets: a) set of all string of...

Give a regular expression for each of the following sets: a) set of all string of 0s and 1s beginning with 0 and end with 1. b) set of all string of 0s and 1s having an odd number of 0s. d) set of all string of 0s and 1s containing at least one 0. e) set of all string of a's and b's where each a is followed by two b's. f) set of all string of 0s and...

Give 6 examples of various costs. Attending college involves incurring many costs. Give 6 examples of...

Give 6 examples of various costs. Attending college involves incurring many costs. Give 6 examples of a college cost from the following categories. Explain your reason for assigning each cost to the classification. Sunk cost Discretionary cost Committed cost Opportunity cost Differential cost Allocated cost Reply to one other student that you have not replied to before with an example of when one of their listed costs could be considered in a different classification and explain the rationale. Please include...