Difference between revisions of "AreCollinear Command"
From GeoGebra Manual
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Normally this command computes the result numerically. This behavior can be changed by using the [[Prove Command|Prove]] command. | Normally this command computes the result numerically. This behavior can be changed by using the [[Prove Command|Prove]] command. | ||
:{{example| 1=<div><code><nowiki>AreCollinear[(1, 2), (3, 4), (5, 6)]</nowiki></code> yields ''true'' since all the three points lying on the same line.</div>}} | :{{example| 1=<div><code><nowiki>AreCollinear[(1, 2), (3, 4), (5, 6)]</nowiki></code> yields ''true'' since all the three points lying on the same line.</div>}} | ||
− | {{Note| See also [[AreConcurrent Command|AreConcurrent]], [[AreConcyclic Command|AreConcyclic]], [[AreEqual Command|AreEqual]], [[ArePerpendicular Command|ArePerpendicular]], [[AreParallel Command|AreParallel]] commands.}} | + | {{Note| See also [[AreConcurrent Command|AreConcurrent]], [[AreConcyclic Command|AreConcyclic]], [[AreCongruent Command|AreCongruent]], [[AreEqual Command|AreEqual]], [[ArePerpendicular Command|ArePerpendicular]], [[AreParallel Command|AreParallel]] commands.}} |
Revision as of 09:44, 27 March 2017
- AreCollinear[ <Point>, <Point>, <Point> ]
- Decides if the points are collinear.
Normally this command computes the result numerically. This behavior can be changed by using the Prove command.
- Example:
AreCollinear[(1, 2), (3, 4), (5, 6)]
yields true since all the three points lying on the same line.
Note: See also AreConcurrent, AreConcyclic, AreCongruent, AreEqual, ArePerpendicular, AreParallel commands.