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5.3Use Angle Bisectors of Triangles Theorem 5.5: Angle Bisector Theorem If a point is on the bisector of an angle, then it is equidistant from the two _______ of the angle. A C B D
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5.3Use Angle Bisectors of Triangles Theorem 5.6: Converse of the Angle Bisector Theorem If a point is in the interior of an angle and is equidistant from the sides of the angle, then it lies on the _________ of the angle. A C B D
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Because EC ____, ED _____, and EC = ED = 21, BE bisects CBD by the ____________________________ _________. 5.3Use Angle Bisectors of Triangles Example 1 Use the Angle Bisector Theorem Find the measure of CBE. B D C E 21 31 o Solution Converse of the Angle Bisector Theorem
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5.3Use Angle Bisectors of Triangles Example 2 Solve a real-world problem Web A spider’s position on its web relative to an approaching fly and the opposite sides of the web form congruent angles, as shown. Will the spider have to move farther to reach a fly toward the right edge or the left edge? F L R Solution The congruent angles tell you that the spider is on the _________ of LFR. bisector By the _________________________, the spider is equidistant from FL and FR. Angle Bisector Theorem So, the spider must move the ____________ to reach each edge. same distance
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From the Converse of the Angle Bisector Theorem, you know that P lies on the bisector of J if P is equidistant from the sides of J, so then _____ = _____. 5.3Use Angle Bisectors of Triangles Example 3 Use algebra to solve a problem Solution PK For what value of x does P lie on the bisector of J? K J P L x + 1 2x – 5 PL Set segment lengths equal. _____ = _____ ______ = _______ Substitute expressions for segment lengths. Solve for x. ______ = _______ Point P lies on the bisector of J when x = ____.
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5.3Use Angle Bisectors of Triangles Theorem 5.7: Concurrency of Angle Bisector of a Theorem The angle bisector of a triangle intersect at a point that is equidistant from the sides of the triangle. A B C P E D F
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5.3Use Angle Bisectors of Triangles Example 4 Use the concurrency of angle bisectors In the diagram, L is the incenter of FHJ. Find LK. I H K G F J L 12 15 By the Concurrency of Angle Bisectors of a Triangle Theorem, the incenter L is __________ from the sides of FHJ. equidistant So to find LK, you can find ___ in LHI. LI Use the Pythagorean Theorem. Pythagorean Theorem ___ = ________ Substitute known values. ___ = ________ Simplify. ___ = ____ Solve. Because ____ = LK, LK = _____. LI
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5.3Use Angle Bisectors of Triangles Checkpoint. In Exercise 1 and 2, find the value x. 1. xoxo 25 o Because the segments opposite the angles are perpendicular and congruent, by the Converse of the Angle Bisector Theorem, the ray bisects the angle. So, the angles are congruent, and
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5.3Use Angle Bisectors of Triangles Checkpoint. In Exercise 1 and 2, find the value x. By the Angle Bisector Theorem, the two segments are congruent. 2. 7x + 3 8x8x
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5.3Use Angle Bisectors of Triangles Checkpoint. In Exercise 1 and 2, find the value x. 3.Do you have enough information to conclude that AC bisects DAB? A C D B No,
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5.3Use Angle Bisectors of Triangles Checkpoint. In Exercise 1 and 2, find the value x. 3.In example 4, suppose you are not given HL or HI, but you are given that JL = 25 and JI = 20. Find LK. I H K G F J L 12 15 25 20
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5.3Use Angle Bisectors of Triangles Pg. 289, 5.3 #1-12
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