and both intercept is a centralangleand angle is an inscribed
angle.
We draw the diameterof the circlethroughpoints and , and let andWe see that is isoscelesbecause and are radii of the circleand are thereforecongruent.Fromthis we can concludethatSimilarly, we can concludethatWe use the propertythat the sum of anglesinsidea triangleequals to find that:and.Then,andTherefore.
InscribedAngleCorollariesa-d
The theoremabovehas severalcorollaries,whichwill be left to the studentto prove.
a. Inscribedanglesinterceptingthe samearc are congruent
b. Oppositeanglesof an inscribedquadrilateralare supplementary
c. An angleinscribedin a semicircleis a right angle
d. An inscribedright angleinterceptsa semicircle
Hereare someexamplesthe makeuse of the theoremspresentedin this section.
Example 1
Find the anglemarkedin the circle.