Instructions: For every item given below, determine which kind of algebraic structure it is, and give at least one proof of why it is not of the higher structure (e.g. it is a semigroup but not a monoid because it doesn't have an identity element, etc.). Make a table like the one below. Put a check(/ ) if it satisfies the property, cross (X), otherwise. If it is a semigroup, show associativity by giving proof or examples. If it is a commutative semigroup, show commutativity by giving proof or examples. If it is a monoid, identify the identity element through computation. If it is a group, identify the inverse element through computation. If it is an abelian group, show commutativity by giving proof or examples. Explain how you arrived at your answers. Please note this notations: Z = set of integers, Q = set of rational numbers, R=set of real numbers, Z+ and Q+ = positive numbers, = positive numbers including zero 1. A = R, (a*b) = a+b 2. B=Z, (a*b) = a+b 3. C=Z+, (a*b) = (Imax(a,b)]/8) + 3 4. D= Q+, (a*b) = (a - b)/4 5. E=Z+, (a*b) = (a - b)/5 6. F=Q, (a*b) = ([max(a,b)]/b) - 9 7. G=Z+, (a*b) = |min(a,b)\/a 8. H= Q+, (a*b) = (a+b) + 10 9. I= set of all positive even integers, (a*b) = (a-b)/2 10. J= set of all positive odd integers, (a*b) = 2(a-b) + 1 *where is a dot product or multiplication *where is a dot product or multiplication *where - is subtraction *where .. is absolute value %3D No. Groupoid Semigroup Commutative Semigroup Monoid Group Abelian Group 1 5 7 10 2.
Instructions: For every item given below, determine which kind of algebraic structure it is, and give at least one proof of why it is not of the higher structure (e.g. it is a semigroup but not a monoid because it doesn't have an identity element, etc.). Make a table like the one below. Put a check(/ ) if it satisfies the property, cross (X), otherwise. If it is a semigroup, show associativity by giving proof or examples. If it is a commutative semigroup, show commutativity by giving proof or examples. If it is a monoid, identify the identity element through computation. If it is a group, identify the inverse element through computation. If it is an abelian group, show commutativity by giving proof or examples. Explain how you arrived at your answers. Please note this notations: Z = set of integers, Q = set of rational numbers, R=set of real numbers, Z+ and Q+ = positive numbers, = positive numbers including zero 1. A = R, (a*b) = a+b 2. B=Z, (a*b) = a+b 3. C=Z+, (a*b) = (Imax(a,b)]/8) + 3 4. D= Q+, (a*b) = (a - b)/4 5. E=Z+, (a*b) = (a - b)/5 6. F=Q, (a*b) = ([max(a,b)]/b) - 9 7. G=Z+, (a*b) = |min(a,b)\/a 8. H= Q+, (a*b) = (a+b) + 10 9. I= set of all positive even integers, (a*b) = (a-b)/2 10. J= set of all positive odd integers, (a*b) = 2(a-b) + 1 *where is a dot product or multiplication *where is a dot product or multiplication *where - is subtraction *where .. is absolute value %3D No. Groupoid Semigroup Commutative Semigroup Monoid Group Abelian Group 1 5 7 10 2.
Elements Of Modern Algebra
8th Edition
ISBN:9781285463230
Author:Gilbert, Linda, Jimmie
Publisher:Gilbert, Linda, Jimmie
Chapter1: Fundamentals
Section1.4: Binary Operations
Problem 6TFE: True or False
Label each of the following statements as either true or false.
6. Let . The empty set...
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