![]() ![]() ![]() The measure of the chord AB is 14 units the segmentsĬE and DE have the measures of 8 and 5 units respectively. Problem 3 The chords AB and CD intersect at the point E inside the circle You get 8*| BE| = 6*4.Īs the last step, find the measure of the chord AB. (lesson The parts of chords that intersect inside a circle under the topic Circles and their properties of the section Geometry in this site). Now apply the Theorem on chords that intersect within a circle The segments CE and AE have the measures of 6 and 4 units.įirst, let us find the measure of the segment DE. The chord CD has the measure of 10 units. Problem 2 The chords AB and CD intersect at the point E within the circle The parts of chords that intersect inside a circle under the topicĬircles and their properties of the section Geometry in this site).Īccording to this Theorem, | AE|*| BE| = | CE|*| DE|. ![]() The measures of the three segments AE, CE and DEĪpply the Theorem on chords that intersect within a circle (lesson Problem 1 The chords AB and CD intersect at the point E within the circle The theoretical base for solving these problems is the lesson The parts of chords that intersect inside a circle under the topic Circles and their properties of the section Geometry in this site. In this lesson you will find some typical solved problems on chords intersecting within a circle. Solved problems on chords that intersect within a circle ![]()
0 Comments
Leave a Reply. |
AuthorWrite something about yourself. No need to be fancy, just an overview. ArchivesCategories |