5. Let R denote the set of real numbers. Which of the following subsets of R...
Consider the following functions, where I and J denote two subsets of the set R of real numbers. f: R→R x→1/√(x+1) f(I,J): I→J x→ f(x) (a) What is the domain of definition of f? (b Let y be an element of the codomain of f. Solve the equation f(x)=y in x. Note that you may have to consider different cases, depending on y. (c) What is the range of f? (d) Is f total, surjective, injective, bijective? (e) Find a...
1. Recall the definition of red, green, blue numbers. Let R denote the set of red numbers. Let G be the set of green numbers, and let B denote the set of blue numbers. Is R S G S B = Z. Here Z is the set of all intergers. Explain.
Question 1: Let R be the set of real numbers and let 2R be the set of all subsets of the real numbers. Prove that 2 cannot be in one-to-one correspondence with R. Proof: Suppose 2 is in one-to-one correspondence with R. Then by definition of one- to-one correspondence there is a 1-to-1 and onto function B:R 2. Therefore, for each x in R, ?(x) is a function from R to {0, 1]. Moreover, since ? is onto, for every...
Need help with 8 and 9 only please QUESTION6 Let R denote the set of positive real numbers. Consider the bijection f R R, where for everyxeR, x) 12. What is flos? o b._1 ?? od.1 QUESTION 7 Let R+ denote the set of positive real numbers. Consider the bijection g: R R+, where for every ? ? R, gw-22x+1. what is g-1(O? a. (00g2x-1)/2 C.0920x/2)-1
3. For the following question, we only consider subsets of the set R of real numbers. In particular, for any set of real numbers S, we have S-R- S For each of the following, write out the resulting set using set-builder notation in the style above i.e., by describing the range(s) of values) (b) GnH (d) GUH
Let R denote the ring of Gaussian integers, i.e., the set of all complex numbers a + bi with a, b ∈ Z. Define N : R → Z by N(a + bi) = a^2 + b^2. (i) For x,y ∈ R, prove that N(xy) = N(x)N(y). (ii) Use part (i) to prove that 1, −1, i, −i are the only units in R.
7. Let Ω denote the set of real numbers. Ω -(-00,00).
Let the universal set be R, the set of all real numbers, and let A {xE R I -3 sxs 0, B {xER -1< x 2}, and C xE R | 5<xs 7}. Find each of the following: (a) AUB {xR-3 < x2} s -3orx > 과 xs. (b) AnB xR-12 {*E찌-1 <xs마 frER< -1 orx {*ER|x s -1 or*> 아 (c) A {*ER-3 <x< 아} {*ER|-3 < 아} s-3 orx> 아 frER< 3 orx x s 0 (d) AUC...
Question 5 16 pts Let set A = {a,b,c} Which of the following are proper subsets of A? {a} a, b {a, b} {a,b,c} {d} Question 6 10 pts Let A = {ne Z | n = 6a + 4 for some integer a} Let B = {me Z m = 18b - 2 for some integer b} Prove or disprove that ASB Hint: follow the method used in Example 6.1.2 on page 338 of the text. HTML Editora B...
2. Let X be a continuous random variable. Let R be the set of all real numbers, let Z be the set of all integers, and let Q be the set of all rational numbers. Please calculate (1) P(X ? R), (2) P(X ? Z), and (3) P(X EQ)