Draft:Mansion's theorem

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Submission declined on 13 June 2024 by Wikishovel (talk). This submission is not adequately supported by reliable sources. Reliable sources are required so that information can be verified. If you need help with referencing, please see Referencing for beginners and Citing sources. Declined by Wikishovel 10 days ago.

• Comment: We need more than one source. Qcne (talk) 16:00, 23 June 2024 (UTC)

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Mansion theorem: Incenter and excenter relations.

In Euclidean geometry, the Mension theorem is a theorem concerning the circumcircle, incenter, and excenters of a triangle.

The statement of the theorem

Let $I$ be the incenter, $I_a$ an excenter of $\triangle ABC$ aposite to $A$. The the intersecting point of $II_a$ and the circumcircle $M$ is the midpoint of the segment of $II_a$. Moreover, the points $I, I_a, B, C$ is on the circle with diameter $II_a$.

Proof

Consider a triangle $ABC$. Let $\Omega$ be the circumcircle of it. Let $I$ and $I_a$ be the incenter and the excenter aposite to $A$. Then by the property of the inscribed angle, $\angle IBM = \angle IBC+\angle CBM = \angle IBA + \angle CAI = \angle IBA + \angle IAB = \angle BIM$. Therefore $BM = IM$.

References

External Links

• [Mansion Theorem at Cut-the-Knot](https://www.cut-the-knot.org/m/Geometry/MansionTheorem.shtml)