Difference between revisions of "File:Ceva1.PNG"

Latest revision as of 20:16, 7 March 2014

Let ABC be a triangle, and let D, E, F be points on lines BC, CA, AB, respectively. Lines AD, BE, CF are concurrent if and only if

$\frac{BD}{DC} \cdot \frac{CE}{EA}\cdot \frac{AF}{FB} = 1,$

where lengths are directed. This also works for the reciprocal or each of the ratios, as the reciprocal of 1 is 1.

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	Date/Time	Thumbnail	Dimensions	User	Comment
current	10:26, 18 August 2006		344 × 186 (6 KB)	Joml88 (talk \| contribs)

The following page links to this file:

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+Let ABC be a triangle, and let D, E, F be points on lines BC, CA, AB, respectively. Lines AD, BE, CF are concurrent if and only if
+<math>\frac{BD}{DC} \cdot \frac{CE}{EA}\cdot \frac{AF}{FB} = 1,</math>
+where lengths are directed. This also works for the reciprocal or each of the ratios, as the reciprocal of 1 is 1.