Definition talk:Subset/Superset

In answer to:
 * "Please show the source of $T$ contains $S$. According to  Book:Paul R. Halmos/Naive Set Theory, $T$ contains $S$ means $S \in T$ rather than $T \supseteq S$'''."


 * "We shall say that a set $E$ is contained in a set $F$ or is a subset of $F$ if every element of $E$ is also an element of $F$." --prime mover (talk) 01:56, 24 July 2018 (EDT)


 * Thank you for your reply. However I found out that in, the use of contain sways between $\ni$ and $\supseteq$. So personally I still prefer to use contain for $\ni$ and include for $\supseteq$. Just as Book:Paul R. Halmos/Naive Set Theory writes and Element_(mathematics) explains. --DingChao (talk) 03:15, 24 July 2018 (EDT)


 * Whatever your preference, this website prefers to document all usages. As the usage of "contains" is not universally understood to mean "$\ni$", it remains appropriate for us to document this terminology. But I have amended the wording. --prime mover (talk) 04:40, 24 July 2018 (EDT)