define subset and proper set with example
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Answer:
A set A is a subset of another set B if all elements of the set A are elements of the set B. For example, if A is the set {♢,♡,♣,♠} and B is the set {♢,△,♡,♣,♠}, then A⊂B but B⊄A. ... Since B contains elements not in A, we can say that A is a proper subset of B.
A 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 A but 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.
Answer:
A proper subset of a set A is a subset of A that is not equal to A. ... 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.