Contemporary Abstract Algebra
9th Edition
ISBN: 9781305657960
Author: Joseph Gallian
Publisher: Cengage Learning
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Chapter 0, Problem 61E
Complete the proof of Theorem 0.7 by showing that ~is an equivalence relation on S.
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Chapter 0 Solutions
Contemporary Abstract Algebra
Ch. 0 - For n=5 , 8, 12, 20, and 25, find all positive...Ch. 0 - Determine a. gcd(2,10) lcm(2,10) b. gcd(20,8)...Ch. 0 - Determine 51 mod 13, 342 mod 85, 62 mod 15, 10 mod...Ch. 0 - Find integers s and t such that 1=7s+11t ? t. Show...Ch. 0 - Show that if a and b are positive integers, then...Ch. 0 - Suppose a and b are integers that divide the...Ch. 0 - If a and b are integers and n is a positive...Ch. 0 - Let d=gcd(a,b) . If a=da and b=db , show that...Ch. 0 - Let n be a fixed positive integer greater than 1....Ch. 0 - Let a and b be positive integers and let...
Ch. 0 - Let n and a be positive integers and let...Ch. 0 - Show that 5n+3and7n+4 are relatively prime for all...Ch. 0 - Suppose that m and n are relatively prime and r is...Ch. 0 - Let p, q, and r be primes other than 3. Show that...Ch. 0 - Prove that every prime greater than 3 can be...Ch. 0 - Determine 71000 mod 6 and 61001 mod 7.Ch. 0 - Let a, b, s, and t be integers. If a mod...Ch. 0 - Determine 8402 mod 5.Ch. 0 - Show that gcd(a,bc)=1 if and only if gcd(a,b)=1...Ch. 0 - Let p1,p2,...,pn be primes. Show that p1p2pn+1 is...Ch. 0 - Prove that there are infinitely many primes....Ch. 0 - Prob. 22ECh. 0 - Prob. 23ECh. 0 - For any complex numbers z1andz2 prove that...Ch. 0 - Give an “if and only if” statement that describes...Ch. 0 - For inputs of 0 and 1 and mod 2 arithmetic...Ch. 0 - For every positive integer n, prove that a set...Ch. 0 - Prove that 2n32n1 is always divisible by 17.Ch. 0 - Prove that there is some positive integer n such...Ch. 0 - (Generalized Euclid’s Lemma) If p is a prime and p...Ch. 0 - Prob. 31ECh. 0 - What is the largest bet that cannot be made with...Ch. 0 - Prove that the First Principle of Mathematical...Ch. 0 - The Fibonacci numbers are 1, 1, 2, 3, 5, 8, 13,...Ch. 0 - Prove by induction on n that for all positive...Ch. 0 - Suppose that there is a statement involving a...Ch. 0 - In the cut “As” from Songs in the Key of Life,...Ch. 0 - Prove that for every integer n, n3 mod 6=n mod 6.Ch. 0 - If it is 2:00 A.M. now, what time will it be 3736...Ch. 0 - Determine the check digit for a money order with...Ch. 0 - Suppose that in one of the noncheck positions of a...Ch. 0 - Suppose that a money order identification number...Ch. 0 - A transposition error involving distinct adjacent...Ch. 0 - Determine the check digit for the Avis rental car...Ch. 0 - Show that a substitution of a digit ai for the...Ch. 0 - Determine which transposition errors involving...Ch. 0 - Use the UPC scheme to determine the check digit...Ch. 0 - Explain why the check digit for a money order for...Ch. 0 - The 10-digit International Standard Book Number...Ch. 0 - Suppose that an ISBN-10 has a smudged entry where...Ch. 0 - Suppose three consecutive digits abc of an ISBN-10...Ch. 0 - Prob. 52ECh. 0 - Suppose the weighting vector for ISBN-10s were...Ch. 0 - Use the two-check-digit error-correction method...Ch. 0 - Suppose that an eight-digit number has two check...Ch. 0 - The state of Utah appends a ninth digit a9 to an...Ch. 0 - Complete the proof of Theorem 0.8.Ch. 0 - Let S be the set of real numbers. If a,bS , define...Ch. 0 - Let S be the set of integers. If a,bS , define aRb...Ch. 0 - Let S be the set of integers. If a,bS , define aRb...Ch. 0 - Complete the proof of Theorem 0.7 by showing that...Ch. 0 - Prove that 3, 5, and 7 are the only three...Ch. 0 - What is the last digit of 3100 ? What is the last...Ch. 0 - Prove that there are no rational numbers x and y...Ch. 0 - (Cancellation Property) Suppose , and are...
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- Prove Theorem 1.40: If is an equivalence relation on the nonempty set , then the distinct equivalence classes of form a partition of .arrow_forward23. Let be the equivalence relation on defined by if and only if there exists an element in such that .If , find , the equivalence class containing.arrow_forwardLabel each of the following statements as either true or false. Let R be a relation on a nonempty set A that is symmetric and transitive. Since R is symmetric xRy implies yRx. Since R is transitive xRy and yRx implies xRx. Hence R is alsoreflexive and thus an equivalence relation on A.arrow_forward
- In Exercises 610, a relation R is defined on the set Z of all integers. In each case, prove that R is an equivalence relation. Find the distinct equivalence classes of R and list at least four members of each. xRy if and only if x+3y is a multiple of 4.arrow_forwardLabel each of the following statements as either true or false. If R is an equivalence relation on a nonempty set A, then any two equivalence classes of R contain the same number of element.arrow_forwardLet R be the relation defined on the set of integers by aRb if and only if ab. Prove or disprove that R is an equivalence relation.arrow_forward
- True or False Label each of the following statements as either true or false. Let be an equivalence relation on a nonempty setand let and be in. If, then.arrow_forwardTrue or False Label each of the following statements as either true or false. If is an equivalence relation on a nonempty set, then the distinct equivalence classes of form a partition of.arrow_forwardIn Exercises , a relation is defined on the set of all integers. In each case, prove that is an equivalence relation. Find the distinct equivalence classes of and list at least four members of each. 10. if and only if .arrow_forward
- In Exercises , prove the statements concerning the relation on the set of all integers. 18. If and , then .arrow_forwardIn Exercises 610, a relation R is defined on the set Z of all integers, In each case, prove that R is an equivalence relation. Find the distinct equivalence classes of R and least four members of each. xRy if and only if x2+y2 is a multiple of 2.arrow_forward29. Suppose , , represents a partition of the nonempty set A. Define R on A by if and only if there is a subset such that . Prove that R is an equivalence relation on A and that the equivalence classes of R are the subsets .arrow_forward
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