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Dynamic Geometry: Second Ajima-Malfatti Point, Tangent Circles, step-by-step. HTML5 Animation for Mobile Devices. Click the Next button below to start the step-by-step illustration.

The lines connecting the excenters A", B", and C" of a triangle ABC and corresponding circle-circle intersections in Malfatti's circles coincide in a point P called the second Ajima-Malfatti point. Malfatti Circles: Three circles packed inside a triangle such that each is tangent to the other two and to two sides of the triangle. Click the Next button below.


Static Geometry: Second Ajima-Malfatti Point, Tangent Circles

Ajima Malfatti Point Circles


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Last update Jun 30, 2016 by Antonio Gutierrez