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Bisectors in Triangles Concurrency of Perpendicular Bisector Theorem If the perpendicular bisectors PX, PY and PZ are concurrent at P, then PA = PC = PB.

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Presentation on theme: "Bisectors in Triangles Concurrency of Perpendicular Bisector Theorem If the perpendicular bisectors PX, PY and PZ are concurrent at P, then PA = PC = PB."— Presentation transcript:

1 Bisectors in Triangles Concurrency of Perpendicular Bisector Theorem If the perpendicular bisectors PX, PY and PZ are concurrent at P, then PA = PC = PB The point P is called the circumcenter of the triangle.

2 Proof P is on n, perpendicular to AB, so PA = PB P is on m, perpendicular to BC, so PB = PC Hence PA = PB = PC

3 The circle is circumscribed about the triangle.

4 The circumcenter may not always be inside the triangle.

5 Concurrency of Angle Bisector Theorem If the angle bisectors PA, PB and PC are concurrent at P, then PX = PY = PZ The point P is called the incenter of the triangle.

6 The circle is inscribed in the triangle.

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