Let A be the set of all natural numbers less than 100. How many subsets with...

1)Let the Universal Set, S, have 97 elements. A and B are subsets of S. Set...

1)Let the Universal Set, S, have 97 elements. A and B are subsets of S. Set A contains 45 elements and Set B contains 18 elements. If Sets A and B have 1 elements in common, how many elements are in A but not in B? 2)Let the Universal Set, S, have 178 elements. A and B are subsets of S. Set A contains 72 elements and Set B contains 95 elements. If Sets A and B have 39 elements...

Suppose that the set S has n elements and discuss the number of subsets of various...

Suppose that the set S has n elements and discuss the number of subsets of various sizes. (a) How many subsets of size 0 does S have? (b) How many subsets of size 1 does S have? (c) How many subsets of size 2 does S have? (d) How many subsets of size n does S have? (e) Clearly the total number of subsets of S must equal the sum of the number of subsets of size 0, of size...

Let S be a finite set and let P(S) denote the set of all subsets of...

Let S be a finite set and let P(S) denote the set of all subsets of S. Define a relation on P(S) by declaring that two subsets A and B are related if A and B have the same number of elements. (a) Prove that this is an equivalence relation. b) Determine the equivalence classes. c) Determine the number of elements in each equivalence class.

Let S = {0,1,2,3,4,...}, A = the set of natural numbers divisible by 2, and B...

Let S = {0,1,2,3,4,...}, A = the set of natural numbers divisible by 2, and B = the set of numbers divisible by 5. What is the set A intersection B? What is the set A union B? Please show your work.

Exercise 6.6. Let the inductive set be equal to all natural numbers, N. Prove the following...

Exercise 6.6. Let the inductive set be equal to all natural numbers, N. Prove the following propositions. (a) ∀n, 2n ≥ 1 + n. (b) ∀n, 4n − 1 is divisible by 3. (c) ∀n, 3n ≥ 1 + 2 n. (d) ∀n, 21 + 2 2 + ⋯ + 2 n = 2 n+1 − 2.

Let A be the set of all real numbers, and let R be the relation "less...

Let A be the set of all real numbers, and let R be the relation "less than." Determine whether or not the given relation R, on the set A, is reflexive, symmetric, antisymmetric, or transitive.

Let N2K be the set of the first 2k natural numbers. Prove that if we choose...

Let N2K be the set of the first 2k natural numbers. Prove that if we choose k + 1 numbers out of these 2k, there is at least one pair of numbers a, b for which a is divisible by b.

Let (a, b, c, d) be elements within N+ (all positive natural numbers). If a is...

Let (a, b, c, d) be elements within N+ (all positive natural numbers). If a is less than/equal to b, and c is less than/equal to d, then (a*c) is less than/equal to (b*d) with equality if and only if a=b and c=d. Proof?

If we let N stand for the set of all natural numbers, then we write 6N...

If we let N stand for the set of all natural numbers, then we write 6N for the set of natural numbers all multiplied by 6 (so 6N = {6, 12, 18, 24, . . . }). Show that the sets N and 6N have the same cardinality by describing an explicit one-to-one correspondence between the two sets.

Let D={0,1,2,3,4,5,6,7,8,9} be the set of digits. Let P(D) be the power set of D ,...

Let D={0,1,2,3,4,5,6,7,8,9} be the set of digits. Let P(D) be the power set of D , i.e. the set of all subsets of D . How many elements are there in P(D) ? Prove it! Which number is greater: the number of different subsets of D which contain the digit 7 or the number of different subsets of D which do not contain the digit 7? Explain why! Which number is greater: the number of different subsets of D which...