Every derived set in a topological space is closed. Is it true or false?
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Yes, the statement is true
Step-by-step explanation:
All the derived sets in a topological space are closed. But we need to know what is a topological space and what are closed sets.
Topological space is defined as a space where subsets of a set along with neighborhood points exist.
A set is said to be closed if it contains all the limited points of that set.
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