<![CDATA[Centroid of a thin wire bent into a triangle]]>
https://help.geogebra.org/topic/centroid-of-a-thin-wire-bent-into-a-triangle
Wed, 23 Jan 2013 20:21:27 +0000Wed, 23 Jan 2013 06:44:16 +0000Zend_Feed<![CDATA[Well not exactly sure what you are asking but once you bend the thin wire and have a triangle there are 2 ways to find the centroid. 1. Intersection of vertex to side bisectors. 2. centroid x,y is average of x coordinates and y coordinates.]]>
https://help.geogebra.org/topic/centroid-of-a-thin-wire-bent-into-a-triangle#comment-126801
Wed, 23 Jan 2013 19:44:11 +0000<![CDATA[Hi, if you have triangle with vertices A,B,C and sides a,b,c you are looking for point Barycenter[{A,B,C},{b+c,a+c,a+b}]. The point you will obtain is X(10) in Kimberling's encyclopedia of triangle centers (warning: following link may be slow to load): http://faculty.evansville.e... and can be hence also obtained in GeoGebra as TriangleCenter[A,B,C,10] Both Barycenter and TriangleCenter commands are only supported in GeoGebra 4.2 and newer. Cheers, Zbynek]]>
https://help.geogebra.org/topic/centroid-of-a-thin-wire-bent-into-a-triangle#comment-126803
Wed, 23 Jan 2013 20:21:27 +0000