Warm Up Given: Diagram as shown Prove: <1 congruent <3 Hint: Think of Supplementary Angles! 1.<ABC is a straight <1. Assumed 2.<1 is supp to < 22. If 2.

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Presentation transcript:

Warm Up Given: Diagram as shown Prove: <1 congruent <3 Hint: Think of Supplementary Angles! 1.<ABC is a straight <1. Assumed 2.<1 is supp to < 22. If 2 adjacent <s form a straight <, they are supp 3. <DBE is a straight <3. Same as 1 4. <2 is supp to <34. Same as 2 5. <1 congruent to <35. Supplements of the same < are congruent

2.8 Vertical Angles /academy123/html/bbapplet_wl- problem html

Opposite Rays: Two collinear rays that have a common endpoint and extend in different directions BAC Ray AB and ray AC are opposite rays.

BACD Ray BA and Ray CD are not opposite rays. VU XY Ray UV and Ray XY are not opposite rays. NO common end point.

Vertical Angles: when ever two lines intersect, two pairs of vertical angles are formed. You can assume Vertical Angles!

Def: Two angles are vertical angles if the rays forming the sides of one angle and the rays forming the sides of the other are opposite rays. A B E D C <1 &<2; <3 & <4 are vertical angles.

T18: Vertical angles are congruent Given: diagram Prove <5 congruent to <7 Hint: use supplementary angles

2.4 problem Therefore <5 <7

Given: <2 congruent to <3 Prove: <1 congruent to <

4 5 6 m<4 = 2x +5 m<5 = x + 30 Find the m<4 and m<6

Vertical angles are congruent so just set them equal to each other and solve for x. REMEMBER to plug x back in to find the angle. The measure of <6 = = 125