If a,b are elements of R(set of real numbers) and a<b, show that [a,b] is equivalent...

Show that the intervals (0,1) and (-1,1) are equivalent and show that (-1,1) is equivalent to...

Show that the intervals (0,1) and (-1,1) are equivalent and show that (-1,1) is equivalent to the set of real numbers

Let R be the relation on the set of real numbers such that xRy if and...

Let R be the relation on the set of real numbers such that xRy if and only if x and y are real numbers that differ by less than 1, that is, |x − y| < 1. Which of the following pair or pairs can be used as a counterexample to show this relation is not an equivalence relation? A) (1, 1) B) (1, 1.8), (1.8, 3) C) (1, 1), (3, 3) D) (1, 1), (1, 1.5)

Show (-1,1)~R (where R= set of real numbers) by f(x)= x/(1-|x|) Use this to show g(x)=x/(d-|x|)...

Show (-1,1)~R (where R= set of real numbers) by f(x)= x/(1-|x|) Use this to show g(x)=x/(d-|x|) is also a bijection (i.e. g: (-d,d)->R) Finally consider h(x)= x + (a+b)/2 and show it is a bijection where h: (-d,d)->(a,b) Conclude: R~(a,b)

2. Define a relation R on pairs of real numbers as follows: (a, b)R(c, d) iff...

2. Define a relation R on pairs of real numbers as follows: (a, b)R(c, d) iff either a < c or both a = c and b ≤ d. Is R a partial order? Why or why not? If R is a partial order, draw a diagram of some of its elements. 3. Define a relation R on integers as follows: mRn iff m + n is even. Is R a partial order? Why or why not? If R is...

Let R be a relation on set RxR of ordered pairs of real numbers such that...

Let R be a relation on set RxR of ordered pairs of real numbers such that (a,b)R(c,d) if a+d=b+c. Prove that R is an equivalence relation and find equivalence class [(0,b)]R

Exercise 1. For any RV X and real numbers a,b ∈ R, show that E[aX +b]=aE[X]+b....

Exercise 1. For any RV X and real numbers a,b ∈ R, show that E[aX +b]=aE[X]+b. (1) Exercise2. LetX beaRV.ShowthatVar(X)=E[X2]−E[X]2. Exercise 3 (Bernoulli RV). A RV X is a Bernoulli variable with (success) probability p ∈ [0,1] if it takes value 1 with probability p and 0 with probability 1−p. In this case we write X ∼ Bernoulli(p). ShowthatE(X)=p andVar(X)=p(1−p).

Define the 'closure' S of a set S of real numbers. State as many equivalent characterizations,...

Define the 'closure' S of a set S of real numbers. State as many equivalent characterizations, or results, about the closure S.

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 E⊆R (R: The set of all real numbers) Prove that E is sequentially compact if...

Let E⊆R (R: The set of all real numbers) Prove that E is sequentially compact if and only if E is compact

Let R*= R\ {0} be the set of nonzero real numbers. Let G= {2x2 matrix: row...

Let R*= R\ {0} be the set of nonzero real numbers. Let G= {2x2 matrix: row 1(a b) row 2 (0 a) | a in R*, b in R} (a) Prove that G is a subgroup of GL(2,R) (b) Prove that G is Abelian