Difference between revisions of "Interval"

Revision as of 23:12, 16 August 2013

Definition

An interval is a range of values. The most common uses of an interval are for domain and range.

Symbols

If an interval has either $($ or $)$ in it, the values at the end are NOT included in the interval.

If an interval has either $[$ or $]$ in it, the values at the end ARE included. For example, the interval $x \in [2.5,7]$ refers to the inequality $2.5 \le x \le 7.$

If both endpoints are not included, then the interval is open. If both endpoints are included, then the interval is closed.

Note: The symbols $($ and $)$ are used with $-\infty$ and $\infty.$

Examples

$(2,3)$ means all real numbers between $2$ and $3,$ but not including $2$ or $3.$

$[-2,0)$ means all real numbers between $-2$ and $0,$ including $-2,$ but not including $0.$

$[5, \infty)$ means all real numbers greater than or equal to $5.$

@@ Line 5: / Line 5: @@
 == Symbols ==
-If an interval has either <math>(</math> or <math>)</math> in it, the values at the end are '''NOT''' included in the interval. For example, the interval <math>x \in (3,5)</math> refers to the inequality <math>3 < x < 5.</math>
+If an interval has either <math>(</math> or <math>)</math> in it, the values at the end are '''NOT''' included in the interval.
 If an interval has either <math>[</math> or <math>]</math> in it, the values at the end '''ARE''' included. For example, the interval <math>x \in [2.5,7]</math> refers to the inequality <math>2.5 \le x \le 7.</math>

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Difference between revisions of "Interval"

Revision as of 23:12, 16 August 2013

Definition

Symbols

Examples