can you help with part c please 2 Let m = R[x] be a polynomial with deg m > 1. Define a relation S, on R[x] by the rulethat (f,g) € S if and only if m is a factor of g - f.(a) Prove that S is an equivalence relation on R[x].(b) The division rule for polynomials implies that every equivalence class of Sm con-tains one polynomial with a special property. What is this property?(c) Write down a polynomial m € R[x] such that the set {ƒ € R[x] : ƒ(2) = 3} is anequivalence class of Sm. Give a brief justification (one or two sentences).

An equivalence relation is a binary relation on a set that satisfies three properties: reflexivity,…

Answered: 2 Let m & R[x] be a polynomial with deg…

Elements Of Modern Algebra

8th Edition

ISBN:9781285463230

Author:Gilbert, Linda, Jimmie

Publisher:Gilbert, Linda, Jimmie

Chapter1: Fundamentals

Section1.7: Relations

Problem 22E: A relation R on a nonempty set A is called asymmetric if, for x and y in A, xRy implies yRx. Which...

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A relation R on a nonempty set A is called asymmetric if, for x and y in A, xRy implies yRx. Which of the relations in Exercise 2 areasymmetric? In each of the following parts, a relation R is defined on the set of all integers. Determine in each case whether or not R is reflexive, symmetric, or transitive. Justify your answers. a. xRy if and only if x=2y. b. xRy if and only if x=y. c. xRy if and only if y=xk for some k in . d. xRy if and only if xy. e. xRy if and only if xy. f. xRy if and only if x=|y|. g. xRy if and only if |x||y+1|. h. xRy if and only if xy i. xRy if and only if xy j. xRy if and only if |xy|=1. k. xRy if and only if |xy|1.
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For any relation on the nonempty set, the inverse of is the relation defined by if and only if . Prove the following statements. is symmetric if and only if . is antisymmetric if and only if is a subset of . is asymmetric if and only if .
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Let x1, x2, y1, y2 be real numbers. The expression (x1, y1) ~ (x2, y2) means that x12 + y12 = x22 + y22. Prove that the relation ~ is an equivalence relation on R2.
2 Let me R[x] be a polynomial with deg m≥ 1. Define a relation Sm on R[x] by the rule that (f,g) ES if and only if m is a factor of g - f. (a) Prove that Sm is an equivalence relation on R[x]. (b) The division rule for polynomials implies that every equivalence class of Sm con- tains one polynomial with a special property. What is this property? (c) Write down a polynomial m € R[x] such that the set {fe R[x]: f(2)= 3} is an equivalence class of Sm. Give a brief justification (one or two sentences).
Let S denote the set of monic degree two polynomials, i.e., S {x + ax + b: a, b e R} The relation R on S defined by fRg if f(2) = g(2) is an equivalence relation. (You do not need to prove this claim.) a. For any polynomial f, let [f] denote the equivalence class of f. List three elements in [X^2 + x]. b. Prove that the equivalence class [x^2 + 1] is infinite.
Let a relation R on R2 be given by (x,y)R(x’,y’) provided that x-x’and y-y’ are integers. Prove that R is an equivalence relation.

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