How to prove it
Shirali, Shailesh (2018) How to prove it. At Right Angles, 7 (2). pp. 95-100. ISSN 2582-1873
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Abstract
Euler’s formula for the area of a pedal triangle Given a triangle ABC and a point P in the plane of ABC (note that P does not have to lie within the triangle), the pedal triangle of P with respect to △ ABC is the triangle whose vertices are the feet of the perpendiculars drawn from P to the sides of ABC. See Figure 1. The pedal triangle relates in a natural way to the parent triangle, and we may wonder whether there is a convenient formula giving the area of the pedal triangle in terms of the parameters of the parent triangle. The great 18th-century mathematician Euler found just such a formula (given in Box 1). It is a compact and pleasing result, and it expresses the area of the pedal triangle in terms of the radius R of the circumcircle of △ ABC and the distance between P and the centre O of the circumcircle.
| Item Type: | Articles in APF Magazines |
|---|---|
| Authors: | Shirali, Shailesh |
| Document Language: | Language English |
| Uncontrolled Keywords: | Circle theorem, pedal triangle, power of a point, Euler, sine rule, extended sine rule, Wallace-Simson theorem |
| Subjects: | Natural Sciences > Mathematics |
| Divisions: | Azim Premji University - Bengaluru > University Publications > At Right Angles |
| Full Text Status: | Public |
| URI: | http://publications.azimpremjiuniversity.edu.in/id/eprint/1575 |
| Publisher URL: | http://apfstatic.s3.ap-south-1.amazonaws.com/s3fs-... |
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