2023 CMSC 150 Fall 2015 Section 7981 Assignment 1 due October 25 In this assignment | Assignment Collections

CMSC 150 Fall 2015 Section 7981 – Assignment 1, due October 25

In this assignment, N will denote the set of positive integers, Z the set of all integers, Q the set of all rational numbers, and R the set of all real numbers. After any problem statement, feel free to hit the Enter key as often as you need to make space for your answer.

Problem 1:  Let A = {3,5,7}, B={2,3}, C = {1,2,3,4,7}.  Compute the following sets:

            A Ç B =

AÈ B =

A – B =

B – C =

AÅ C =

A´ C =

Problem 2: Let D = {5, 2, {5,2}, {5, {2}}, {{a,b,c},{c,d,e}}} How many elements does D have?

Problem 3: A set E has 37 elements.  How many subsets does it have? (An answer correct to 5 significant digits will be acceptable.)

Problem 4: In 24×7 Section 1.4, the author states “The null set f is a proper subset of every set.” Is this correct or incorrect? Explain.

Problem 5: List the elements in the set { x ÎZ | x² – 7x + 5 = 0 }.

Problem 6: Let M = { y ÎQ | 0 < y <= 1, and y can be written as a fraction with a denominator not exceeding 6. } List all the elements of M.  How many elements are there in M?

Problem 7: How many elements are there in the set {{{{{{{3}}}}}}} ?

Problem 8: Let Ã(X) denote the power set of X. Find Ã({a, b, c, d}).

Problem 9: For each positive integer n, define the set A_n by A_n= {x ÎZ | n £ x £ 2n}

            a. What is the union of all sets A_n?

            b. What is the intersection of all sets A_n?

Problem 10: For every real number x, define B_x to be the open interval (-x,x).  Equivalently, B_x = {y Î R | |y| < x}.

            a. What is the union of all sets B_x?

            b. What is the intersection of all sets B_x?

Problem 11: Simplify each of the following algebraic expressions. All sets are assumed to be subsets of a universal set U.

            a. (A È B) Ç (C È A)

            b. (A Èf) Ç A

            c. (A È B) Ç (A Ç B)

            d. A È (U – A)