Difference between revisions of "AreEqual Command"
From GeoGebra Manual
(command syntax: changed [ ] into ( )) |
(IsTangent added) |
||
Line 7: | Line 7: | ||
{{Notes|1= | {{Notes|1= | ||
* <code><nowiki>AreEqual(Segment((1, 2), (3, 4)), Segment((3, 4), (1, 6)))</nowiki></code> is different from <code><nowiki>Segment((1, 2), (3, 4)) == Segment((3, 4), (1, 6))</nowiki></code> as the latter compares just the lengths | * <code><nowiki>AreEqual(Segment((1, 2), (3, 4)), Segment((3, 4), (1, 6)))</nowiki></code> is different from <code><nowiki>Segment((1, 2), (3, 4)) == Segment((3, 4), (1, 6))</nowiki></code> as the latter compares just the lengths | ||
− | *See also [[AreCollinear Command|AreCollinear]], [[AreConcyclic Command|AreConcyclic]], [[AreConcurrent Command|AreConcurrent]], [[AreCongruent Command|AreCongruent]], [[ArePerpendicular Command|ArePerpendicular]], [[AreParallel Command|AreParallel]] commands.}} | + | *See also [[AreCollinear Command|AreCollinear]], [[AreConcyclic Command|AreConcyclic]], [[AreConcurrent Command|AreConcurrent]], [[AreCongruent Command|AreCongruent]], [[ArePerpendicular Command|ArePerpendicular]], [[AreParallel Command|AreParallel]], [[IsTangent Command|IsTangent]] commands.}} |
Latest revision as of 21:42, 16 May 2018
- AreEqual( <Object>, <Object> )
- Decides if the objects are equal.
Normally this command computes the result numerically. This behavior can be changed by using the Prove command.
- Example:
AreEqual(Circle((0, 0),1),x^2+y^2=1)
yields true since the two circles have the same center and radius.
Notes:
AreEqual(Segment((1, 2), (3, 4)), Segment((3, 4), (1, 6)))
is different fromSegment((1, 2), (3, 4)) == Segment((3, 4), (1, 6))
as the latter compares just the lengths- See also AreCollinear, AreConcyclic, AreConcurrent, AreCongruent, ArePerpendicular, AreParallel, IsTangent commands.