What is the cardinality of the set ? = {? ∈ ℕ: 1 < ? 3...

Consider the subsets of a set with n elements that have a cardinality of n and...

Consider the subsets of a set with n elements that have a cardinality of n and n−1. Suppose one of these subsets is chosen at random. What is the expected value of the cardinality of this subset?

1. Use the roster method to describe the elements of the following set. x∈ℤ||x−3|<12 and x...

1. Use the roster method to describe the elements of the following set. x∈ℤ||x−3|<12 and x is a multiple of 3 2. Use the roster method to describe the elements of the following set. {n∈ℕ∣∣∣1n+6⩾6272 and n is a multiple of 5} 3. Determine the cardinality of the following sets. {x∈ℤ|−4⩽x⩽3}: {x∈ℕ|−4⩽x⩽3}: 4. Evaluate the following expressions. [Hint: start by factoring the polynomial.] ∣∣{x∈ℚ∣∣18x3+69x2+56x=0}∣∣= ∣∣{x∈(0,∞)∣∣18x3+69x2+56x=0}∣∣= ∣∣{x∈ℤ∣∣18x3+69x2+56x=0}∣∣= 5.  Evaluate the following expressions. [Hint: start by factoring the polynomial.] ∣∣{x∈ℝ∣∣x4+11x2+28=0}∣∣= ∣∣{x∈ℚ∣∣x4+11x2+28=0}∣∣= ∣∣{x∈ℕ∣∣x4+11x2+28=0}∣∣= 6....

Arrange the following cardinal numbers in order (some will have the same cardinality, and in those...

Arrange the following cardinal numbers in order (some will have the same cardinality, and in those cases you put an equal sign).. |{0,5}|, |[0,5]|, |{0,3,5}|, |ℝ-{3}|, |P ({0,5})|, ||P ((0,5))|, |(0,5)-{3}|, |ℝ-ℕ|

If the cardinality of A is 3, the cardinality of B is 5, A and B...

If the cardinality of A is 3, the cardinality of B is 5, A and B are not disjoint and A is a not subset of B, determine the lower and upper bound for the cardinality of A ∩ B .

Prove that the set of real numbers has the same cardinality as: (a) The set of...

Prove that the set of real numbers has the same cardinality as: (a) The set of positive real numbers. (b) The set of nonnegative real numbers.

Prove that the set of real numbers has the same cardinality as: (a) The set of...

Prove that the set of real numbers has the same cardinality as: (a) The set of positive real numbers. (b) The set of non-negative real numbers.

Prove that the cardinality of of 2Z (the set of even integers) is ℵ0.

Prove that the cardinality of of 2Z (the set of even integers) is ℵ0.

In this problem, we will explore how the cardinality of a subset S ⊆ X relates...

In this problem, we will explore how the cardinality of a subset S ⊆ X relates to the cardinality of a finite set X. (i) Explain why |S| ≤ |X| for every subset S ⊆ X when |X| = 1. (ii) Assume we know that if S ⊆ hni, then |S| ≤ n. Explain why we can show that if T ⊆ hn+ 1i, then |T| ≤ n + 1. (iii) Explain why parts (i) and (ii) imply that for...

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. a. Consider the definition of relation. If A is the set of even numbers and...

1. a. Consider the definition of relation. If A is the set of even numbers and ≡ is the subset of ordered pairs (a,b) where a<b in the usual sense, is ≡ a relation? Explain. b. Consider the definition of partition on the bottom of page 18. Theorem 2 says that the equivalence classes of an equivalence relation form a partition of the set. Consider the set ℕ with the equivalence relation ≡ defined by the rule: a≡b in ℕ...