Difference between revisions of "Subset"
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− | We say a [[set]] <math>A</math> is a '''subset''' of another set <math>B</math> if every element of <math>A</math> is also an element of <math>B</math>, and we denote this <math>A \sub B</math>. The empty set is a subset of every set, and every set is a subset of itself. The notation <math>A \subseteq B</math> emphasizes that <math>A</math> may be equal to <math>B</math>, while <math>\displaystyle A \subsetneq B</math> says that <math>A</math> is any subset of <math>B</math> other than <math>B</math> itself. | + | We say a [[set]] <math>A</math> is a '''subset''' of another set <math>B</math> if every element of <math>A</math> is also an element of <math>B</math>, and we denote this as <math>A \sub B</math>. The empty set is a subset of every set, and every set is a subset of itself. The notation <math>A \subseteq B</math> emphasizes that <math>A</math> may be equal to <math>B</math>, while <math>\displaystyle A \subsetneq B</math> says that <math>A</math> is any subset of <math>B</math> other than <math>B</math> itself. |
Revision as of 13:30, 6 July 2006
We say a set is a subset of another set if every element of is also an element of , and we denote this as $A \sub B$ (Error compiling LaTeX. Unknown error_msg). The empty set is a subset of every set, and every set is a subset of itself. The notation emphasizes that may be equal to , while says that is any subset of other than itself.
The following is a true statement:
$\emptyset \sub \{1, 2\} \sub \mathbb{N} \sub \mathbb{Z} \sub \mathbb{Q} \sub \mathbb{R} \sub \mathbb{C} \sub \mathbb{C}\, \cup\{\textrm{Groucho, Harpo, Chico}\} \supset \{1, 2, i, \textrm{Groucho}\}$ (Error compiling LaTeX. Unknown error_msg)