Answer :
The explanation for closure property of sets is as explained below.
How to interpret the closure property operation in sets?
A set is closed under addition if you can add any two numbers in the set and still have a number in the set as a result. A set is closed under (scalar) multiplication if you can multiply any two elements, and the result is still a number in the set.
For example, the set {1,−1} is closed under multiplication but not addition.
A set is closed under an operation if performance of that operation on members of the set always produces a member of that set. For example, the positive integers are closed under addition, but not under subtraction: is not a positive integer even though both 1 and 2 are positive integers.
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