266 CHAPTER 8 GEOMETRY FOR AMERICANS
8.2. 17 Inscribed Right Triangles. Let AB be the diameter of a circle, and let C be an
arbitrary point on the circle. Then LBCA = 90°. Conversely, if AB is a diameter and
LBCA = 90°, then C must lie on the circle. (See left figure below.)
A I!------"TB
cB8.2.18 Cyclic Quadrilaterals. The quadrilateral ABCD is cyclic if its vertices lie on a
circle. The points A, B, C, D are called concyclic. (See right figure above.)
(a) A quadrilateral is cyclic if and only if a pair of opposite angles are supplementary.(b) Points A, B, C, Dare concyclic if and only if LACB = LADB.
With cyclic quadrilaterals you automatically get circles and pairs of equal angles "for
free." This extra structure often provides useful information. Get in the habit of locat
ing (or creating) cyclic quadrilaterals.Circles and Triangles
One can spend a lifetime exploring the interplay between circles and triangles. First
we shall look at the inscribed and circumscribed circles of a triangle.In the diagram below, triangle ABC is inscribed in circle n, since each vertex of
the triangle lies on this circle. We call n the circumscribed circle or circumcircleof triangle ABC. The center of n, or circumcenter, is 0, and the length OA is the
circumradius.
Likewise, circle 12 is inscribed in triangle ABC because it is tangent to each side of
the triangle. We call it the inscribed circle or incircle. The center of 12, the incenter,