For n, ke Z, k0, we denote by A(n, k) the set of integers that are congruent to n modulo k: -2k+n, -k+n, n, k+n, 2k + n, A(n, k) = {... -3k+n, 3k+n, ...} CZ. We denote by T the collection of subsets U CZ with the property that: for every n EU, there exists a nonzero integer k such that A(n, k) CU. Please do the following: 1. prove that T is a topology on Z. 2. all the subsets A(n, k), with n,k € Z, k ‡ 0, are both open as well as closed in (Z, T).

For n, ke Z, k0, we denote by A(n, k) the set of integers that are congruent to n modulo k: -2k+n, -k+n, n, k+n, 2k + n, A(n, k) = {... -3k+n, 3k+n, ...} CZ. We denote by T the collection of subsets U CZ with the property that: for every n EU, there exists a nonzero integer k such that A(n, k) CU. Please do the following: 1. prove that T is a topology on Z. 2. all the subsets A(n, k), with n,k € Z, k ‡ 0, are both open as well as closed in (Z, T).

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter1: Fundamental Concepts Of Algebra

Section1.2: Exponents And Radicals

Problem 90E

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Question

Please prove the following step by step in detail

For n, k € Z, k ‡ 0, we denote by A(n, k) the set of integers that are congruent to n modulo k:
A(n, k) = {...
-k+n, n₂ k+n, 2k + n, 3k + n,
-3k +n,
-2k + n,
... } cz.
We denote by T the collection of subsets UC Z with the property that: for every n € U, there exists a
nonzero integer k such that A(n, k) CU. Please do the following:
1. prove that T is a topology on Z.
2. all the subsets A(n, k), with n, k = Z, k‡ 0, are both open as well as closed in (Z, T).
2

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