7.10. Proportions with Angle Bisectors http://www.ck12.org
By definition,
−→
ACdivides^6 BADequally, so^6 BAC∼=^6 CAD. The proportional relationship isCDBC=ADAB.Theorem:If a ray bisects an angle of a triangle, then it divides the opposite side into segments that are proportional
to the lengths of the other two sides.
Example A
Findx.
Because the ray is the angle bisector it splits the opposite side in the same ratio as the sides. So, the proportion is:
9
x=
21
14
21 x= 126
x= 6Example B
Determine the value ofxthat would make the proportion true.
You can set up this proportion just like the previous example.
5
3
=
4 x+ 1
15
75 = 3 ( 4 x+ 1 )
75 = 12 x+ 3
72 = 12 x
6 =x