= 1) Let X be any set. Show that T topology). Also show that T = P(X) as the discrete topology on X). {0, X} is a topology on X (called the trivial (the power set of X) is a topology on X (known Definition: A topology on a set X is a collection T of subsets of X having the following properties. (1) Both the empty set and X itself are elements of T. (2) The union of an arbitrary collection of elements of T is an element of T. (3) The intersection of a finite number of elements of T is an element of T. A set X with a specified topology T is called a topological space. The subsets of X that are members of are called the open sets of the topological space.

Elements Of Modern Algebra
8th Edition
ISBN:9781285463230
Author:Gilbert, Linda, Jimmie
Publisher:Gilbert, Linda, Jimmie
Chapter1: Fundamentals
Section1.3: Properties Of Composite Mappings (optional)
Problem 9E: Find mappings f,g and h of a set A into itself such that fg=hg and fh. Find mappings f,g and h of a...
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1) Let X be any set. Show that T
topology). Also show that T = P(X)
as the discrete topology on X).
{0, X} is a topology on X (called the trivial
(the power set of X) is a topology on X (known
Transcribed Image Text:= 1) Let X be any set. Show that T topology). Also show that T = P(X) as the discrete topology on X). {0, X} is a topology on X (called the trivial (the power set of X) is a topology on X (known
Definition: A topology on a set X is a collection T of subsets of X having the following
properties.
(1) Both the empty set and X itself are elements of T.
(2) The union of an arbitrary collection of elements of T is an element of T.
(3) The intersection of a finite number of elements of T is an element of T.
A set X with a specified topology T is called a topological space. The subsets of X that are
members of are called the open sets of the topological space.
Transcribed Image Text:Definition: A topology on a set X is a collection T of subsets of X having the following properties. (1) Both the empty set and X itself are elements of T. (2) The union of an arbitrary collection of elements of T is an element of T. (3) The intersection of a finite number of elements of T is an element of T. A set X with a specified topology T is called a topological space. The subsets of X that are members of are called the open sets of the topological space.
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