Difference between revisions of "Circumcenter"
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By [[SAS Similarity]] <math>\triangle BFD\sim \triangle BAC</math>. Thus <math>\angle BFD = \angle BAC</math> making <math>FD || AC</math>. Since <math>EO\perp AC</math> and <math>AC\| FD, EO\perp FD</math> making <math>EH</math> an [[altitude]] of <math>DEF</math>. Likewise, <math>DG</math> and <math>FI</math> are also altitudes. Thus, the problem is reduced to proving that the altitudes of a triangle are concurrent. This can be done using Ceva's Theorem. | By [[SAS Similarity]] <math>\triangle BFD\sim \triangle BAC</math>. Thus <math>\angle BFD = \angle BAC</math> making <math>FD || AC</math>. Since <math>EO\perp AC</math> and <math>AC\| FD, EO\perp FD</math> making <math>EH</math> an [[altitude]] of <math>DEF</math>. Likewise, <math>DG</math> and <math>FI</math> are also altitudes. Thus, the problem is reduced to proving that the altitudes of a triangle are concurrent. This can be done using Ceva's Theorem. | ||
− | It is worth noting that the | + | It is worth noting that the existence of the circumcenter is a much more fundamentally important theorem than it might seem, since it implies that three [[point]]s determine a circle. |
[[Category:Geometry]] | [[Category:Geometry]] |
Revision as of 13:17, 4 August 2020
The circumcenter is the center of the circumcircle of a polygon. Only certain polygons can be circumscribed by a circle: all nondegenerate triangles have a circumcircle whose circumcenter is the intersection of the perpendicular bisectors of the sides of the triangle. Quadrilaterals which have circumcircles are called cyclic quadrilaterals. Also, every regular polygon is cyclic.
Proof that the perpendicular bisectors of a triangle are concurrent
First Proof
We consider a nondegenerate triangle . Since the triangle is nondegenerate, and lie on different lines and so their perpendicular bisectors are not parallel and thus intersect. Let be the intersection of these perpendicular bisectors. Since lies on the perpendicular bisector of , it is equidistant from and ; likewise, it is equidistant from and . Hence is equidistant from and ; hence also lies on the perpendicular bisector of (and is the circumcenter).
Second Proof
We start with a diagram:
One of the most common techniques for proving the concurrency of lines is Ceva's Theorem. However, there aren't any cevians in the diagram which would be needed for a direct application of Ceva's Theorem. Thus, we look for a way to make some by drawing in helpful lines. Drawing in and (i.e. the medial triangle of ) does the trick.
By SAS Similarity . Thus making . Since and making an altitude of . Likewise, and are also altitudes. Thus, the problem is reduced to proving that the altitudes of a triangle are concurrent. This can be done using Ceva's Theorem.
It is worth noting that the existence of the circumcenter is a much more fundamentally important theorem than it might seem, since it implies that three points determine a circle.