Show that the set of numbers 59 + 1 ± s for s ≤ 15 contains...

Show that: (i) any set of 46 distinct 2-digit numbers contains two distinct numbers which are...

Show that: (i) any set of 46 distinct 2-digit numbers contains two distinct numbers which are relatively prime. (ii) 46 is optimal, in the sense that there exists a set of 45 distinct 2-digit numbers so that no two distinct numbers are relatively prime.

Let S be the set of real numbers between 0 and 1, inclusive; i.e. S =...

Let S be the set of real numbers between 0 and 1, inclusive; i.e. S = [0, 1]. Let T be the set of real numbers between 1 and 3 inclusive (i.e. T = [1, 3]). Show that S and T have the same cardinality.

Consider the following set of numbers: [2, 59, 82, 47, 58, 2, 59, 58, 47, 82]....

Consider the following set of numbers: [2, 59, 82, 47, 58, 2, 59, 58, 47, 82]. What is the rank of 82?

15.) a) Show that the real numbers between 0 and 1 have the same cardinality as...

15.) a) Show that the real numbers between 0 and 1 have the same cardinality as the real numbers between 0 and pi/2. (Hint: Find a simple bijection from one set to the other.) b) Show that the real numbers between 0 and pi/2 have the same cardinality as all nonnegative real numbers. (Hint: What is a function whose graph goes from 0 to positive infinity as x goes from 0 to pi/2?) c) Use parts a and b to...

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.

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...

Let S be the set {(-1)^n +1 - (1/n): all n are natural numbers}. 1. find...

Let S be the set {(-1)^n +1 - (1/n): all n are natural numbers}. 1. find the infimum and the supremum of S, and prove that these are indeed the infimum and supremum. 2. find all the boundary points of the set S. Prove that each of these numbers is a boundary point. 3. Is the set S closed? Compact? give reasons. 4. Complete the sentence: Any nonempty compact set has a....

1. Answer the following questions and justify your answer. a. Given any set S of 6...

1. Answer the following questions and justify your answer. a. Given any set S of 6 natural numbers, must there be two numbers in S that have the same remainder when divided by 8? b. Given any set S of 10 natural numbers, must there be two numbers in S that have the same remainder when divided by 8? 
 c. Let S be a finite set of natural numbers. How big does S have to be at least so that...

Prove: Let S be a bounded set of real numbers and let a > 0. Define...

Prove: Let S be a bounded set of real numbers and let a > 0. Define aS = {as : s ∈ S}. Show that inf(aS) = a*inf(S).

Show that the numbers 1, 3, 3^2 , . . . , 3^15 and 0 for...

Show that the numbers 1, 3, 3^2 , . . . , 3^15 and 0 for a complete system of residues (mod 17). Do the numbers 1, 2, 2^2 , . . . , 2^15 and 0 constitute a complete system of residues (mod 17)?