Question 9 10 pts Let A be a nonempty set and let E be the empty family of subsets of A. What is the intersection of the family E? none of the other answers is correct А the empty set Question 10 10 pts Determine the number of odd 3-digit integers where the units and tens digits must be different 100 210 800 405 none of the other answers is correct
Question 9 10 pts Let A be a nonempty set and let E be the empty family of subsets of A. What is the intersection of the family E? none of the other answers is correct А the empty set Question 10 10 pts Determine the number of odd 3-digit integers where the units and tens digits must be different 100 210 800 O 405 none of the other answers is correct
Question 9: Let S be a set consisting of 19 two-digit integers. Thus, each element of S belongs to the set 10, 11,...,99) Use the Pigeonhole Principle to prove that this set S contains two distinct elements r and y, such that the sum of the two digits of r is equal to the sum of the two digits of y. Question 10: Let S be a set consisting of 9 people. Every person r in S has an age...
12. Definition : Let Λ be a non-empty set. If for each a є Л there is a set Aa, the collection (Aa : α Ε Λ is called an indexed collection of sets. The set A is called the index set. Traditionally Λ is often the natural numbers-you are probably pretty used to seeing sets indexed by the natural numbers but it can in fact be any other set! Here's the exercise: Let Л-R+ (meaning the positive real numbers,...
Question 1 1. [5 pts] Give a complete definition of lim f(x) = -oo if... 2. [25 pts] Give an example of each of the following, or state one or more theorems which show that such an example is impossible: a. A countable collection of nonempty closed proper subsets of R whose union is open. b. A nonempty bounded subset of R with no cluster points. c. A convergent sequence with two convergent subsequences with distinct limits. d. A function...
b and c please explian thx i post the question from the book Let 2 be a non-empty set. Let Fo be the collection of all subsets such that either A or AC is finite. (a) Show that Fo is a field. Define for E e Fo the set function P by ¡f E is finite, 0, if E is finite 1, if Ec is finite. P(h-10, (b) If is countably infinite, show P is finitely additive but not-additive. (c)...
(3) (10 points) Let H and K be non-empty subsets of a vector space V. The sum of H and K, written H + K, is the set of all vectors in V that can be written as the sum of two vectors, one in H and the other in K: that is H + K = {W EVw = u + v, for some u E H and v EK}. Show that if H and K are subspaces of...
Ignore any previously filled answers. Some are incorrect. Question 1 1 pts D Question 2 1 pts Let S = {a, {a)) Which of the following is not an element of Which of the following is true for all sets S and T? P (S). the power set of S? e (o, sa)) o {a, {a}} o {a) Question 4 1 pts Question 3 1 pts According to De Morgan's law.AU(BnC) If you need to prove that S is a...
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...
Let U ={a, b, c, d, e, f, g, h, i, j, k}. Let A={d, f, g, h, i, k}. Let B={a, d, f, g, h}. Let C={a, c, f. i, k} Determine (AUC) U ( AB). Choose the correct answer below and, if necessary, fill in the answer box in your choice. OA. (AUC) U(ANB)= } (Use a comma to separate answers as needed.) OB. (A'UC) U (ANB) is the empty set. LE This Question: 1 pt Let U={x|XEN...