Sets and functionsSubsets

The idea of set equality can be broken down into two separate relations: two sets are equal if the first set contains all the elements of the second set itself, and vice versa the sets' elements are listed in the same order.

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If we visualize a set as a potato and its elements as dots in the blob, then the subset relationship looks like this:

Here has elements, and has elements.

Two sets are equal if each is a subset of the otherthere is a set that each is a subset of.

The relationship between "⊂" and "=" has a real-number analogue: we can say that x=y if and only if x≤y and y≤xy≤xx≤y.

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Solution. We have , since the statement " is a positive even integer" impliesis implied by the statement " is one more than an odd number". In other words, implies that .

Likewise, we have , because " is one more than an positive odd integer" impliesis implied by " is a positive even integer".

Finally, we have , since F⊂E and E⊂F E⊂F F⊂E.