Difference between revisions of "AreCongruent Command"
From GeoGebra Manual
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:Decides if the objects are congruent. | :Decides if the objects are congruent. | ||
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= | + | :{{example| 1=<code><nowiki>AreCongruent(Circle((0, 0),1),x^2+y^2=1)</nowiki></code> and <code><nowiki>AreCongruent(Circle((1, 1),1),x^2+y^2=1)</nowiki></code> yield ''true'' since the two circles have the same radius.}} |
{{Note| See also [[AreEqual Command|AreEqual]], [[AreCollinear Command|AreCollinear]], [[AreConcyclic Command|AreConcyclic]], [[AreConcurrent Command|AreConcurrent]], [[ArePerpendicular Command|ArePerpendicular]], [[AreParallel Command|AreParallel]] commands.}} | {{Note| See also [[AreEqual Command|AreEqual]], [[AreCollinear Command|AreCollinear]], [[AreConcyclic Command|AreConcyclic]], [[AreConcurrent Command|AreConcurrent]], [[ArePerpendicular Command|ArePerpendicular]], [[AreParallel Command|AreParallel]] commands.}} | ||
Revision as of 09:55, 11 October 2017
- AreCongruent( <Object>, <Object> )
- Decides if the objects are congruent.
Normally this command computes the result numerically. This behavior can be changed by using the Prove command.
- Example:
AreCongruent(Circle((0, 0),1),x^2+y^2=1)andAreCongruent(Circle((1, 1),1),x^2+y^2=1)yield true since the two circles have the same radius.
Note: See also AreEqual, AreCollinear, AreConcyclic, AreConcurrent, ArePerpendicular, AreParallel commands.
