Difference between revisions of "Euler line"

Revision as of 20:27, 4 November 2006

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Let $ABC$ be a triangle, points $H, N, G, O, L$ as $\triangle ABC$ 's orthocenter, nine-point center, centroid, circumcenter, De Longchamps point respectively, then these points are collinear(regardless of $\triangle ABC$ 's shape). And the line passes through points $H, N, G, O, L$ is called as Euler line, which is named after Leonhard Euler.

An interesting property of distances between these points on the Euler line:

$OG:GN:NH\equiv2:1:3$

Construct an orthic triangle $\triangle H_A,H_B,H_C$ , then Euler lines of $\triangle AH_BH_C$ , $\triangle BH_CH_A$ , $\triangle CH_AH_B$ concur at $\triangle ABC$ 's nine-point center.

@@ Line 5: / Line 5: @@
 An interesting property of distances between these points on the Euler line:
 * <math>OG:GN:NH\equiv2:1:3</math>
+Construct an [[orthic triangle]]<math>\triangle H_A,H_B,H_C</math>, then Euler lines of <math>\triangle AH_BH_C</math>,<math>\triangle BH_CH_A</math>,<math>\triangle CH_AH_B</math> concur at <math>\triangle ABC</math>'s [[nine-point center]].

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Difference between revisions of "Euler line"

Revision as of 20:27, 4 November 2006