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If set A and set B are two sets then A is a subset of B whose all members are also in set B.

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Q: What is a different from subset and proper subset?
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Why can a proper subset be a subset of itself?

Because every set is a subset of itself. A proper subset cannot, however, be a proper subset of itself.


What is the difference between a subset and a proper subset?

the difference between a subset and a proper subset


What are the ASCII codes for subset and proper subset?

Since ASCII ⊊ unicode, I don't know if there are ASCII codes for subset and proper subset. There are Unicode characters for subset and proper subset though: Subset: ⊂, ⊂, ⊂ Subset (or equal): ⊆, ⊆, ⊆ Proper subset: ⊊, ⊊,


Difference between subset and proper subset?

A subset of a set S can be S itself. A proper subset cannot.


Is a empty set a proper subset explain with reason?

An empty set is not a proper subset of an empty set.An empty set is not a proper subset of an empty set.An empty set is not a proper subset of an empty set.An empty set is not a proper subset of an empty set.


What is a proper subsets?

Proper subset definitionA proper subset of a set A is a subset of A that is not equal to A. In other words, if B is a proper subset of A, then all elements of B are in Abut A contains at least one element that is not in B.For example, if A={1,3,5} then B={1,5} is a proper subset of A. The set C={1,3,5} is a subset of A, but it is not a proper subset of A since C=A. The set D={1,4} is not even a subset of A, since 4 is not an element of A.


N When 'N' is a set of natural number Then what is the proper subset of this?

proper subset {1,2} improper subset {N}


Can a proper subset be a subset of itself?

yes


Give an example of a subset and proper subset?

give example of subset


Does every set have a proper subset?

No. The null set cannot have a proper subset. For any other set, the null set will be a proper subset. There will also be other proper subsets.


Why empty set is proper subset of every set?

It isn't. The empty set is a subset - but not a proper subset - of the empty set.


Can an empty set be a subset and a proper subset?

Yes.