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Transcript
UNIT 4: GEOMETRY, ANGLES, AND SIMILAR TRIANGLES Final Exam Review TOPICS TO INCLUDE Vocabulary Angle Pair Relationships Triangle Sum Theorem Similar Triangles Midsegment of a Triangle VOCABULARY Congruent – Exactly the SAME SIZE Midpoint – The MIDDLE POINT of a segment Bisector – Cuts a segment or angle in HALF Parallel – 2 lines that never TOUCH Perpendicular – 2 lines that intersect at a 90° ANGLE Transversal – a line that intersects 2 PARALLEL LINES VOCABULARY Complementary Angles – 2 or more angles that add up to 90° Supplementary Angles – 2 or more angles that add up to 180° Linear Pair – 2 angles that are ADJACENT and add up to 180° Vertical Angles – 2 angles that are formed by an X. They are the angles that are OPPOSITE from each other ANGLE PAIR RELATIONSHIPS Corresponding Angles – 2 ANGLES THAT ARE IN THE SAME POSITION AT DIFFERENT INTERSECTIONS Corresponding Angles: 1 and 5 3 and 7 2 and 6 4 and 8 ANGLE PAIR RELATIONSHIPS Alternate Interior Angles – 2 ANGLES THAT ARE INSIDE THE PARALLEL LINES BUT ON OPPOSITE SIDES OF THE TRANSVERSAL Alternate Interior Angles: 3 and 6 4 and 5 ANGLE PAIR RELATIONSHIPS Alternate Exterior Angles – 2 ANGLES THAT ARE OUTSIDE THE PARALLEL LINES BUT ON OPPOSITE SIDES OF THE TRANSVERSAL Alternate Exterior Angles: 1 and 7 2 and 8 ANGLE PAIR RELATIONSHIPS Consecutive Interior Angles – 2 ANGLES THAT ARE INSIDE THE PARALLEL LINES AND ON THE SAME SIDE OF THE TRANSVERSAL Consecutive Interior Angles: 3 and 5 4 and 6 ANGLE PAIR RELATIONSHIPS Use the picture to determine if the angles are Supplementary, Vertical, Corresponding, Alternate Interior, Alternate Exterior, Consecutive, or No Relationship 1. Angles 1 and 3 2. Angles 3 and 5 3. Angles 2 and 8 4. Angles 1 and 6 5. Angles 4 and 5 6. Angles 5 and 6 ANGLE PAIR RELATIONSHIPS If 2 lines are parallel, Vertical Angles are CONGRUENT Corresponding Angles are CONGRUENT Alternate Interior Angles are CONGRUENT Alternate Exterior Angles are CONGRUENT Consecutive Angles are SUPPLEMENTARY, which means, add up the angles and set them equal to 180° ANGLE PAIR RELATIONSHIPS Now try these: 1. 2. TRIANGLE SUM THEOREM The 3 angles in a triangle always ADD UP TO 180° Example 24 + 88 + x = 180 112 + x = 180 x = 68° TRIANGLE SUM THEOREM You try: 1. 2. SIMILAR TRIANGLES There are 3 ways to prove that triangles are similar 1. ANGLE – ANGLE (AA) – Prove that 2 angles are CONGRUENT 2. SIDE – ANGLE – SIDE (SAS) – Prove the 2 sides and PROPORTIONAL and 1 angle is CONGRUENT 3. SIDE – SIDE – SIDE (SSS) – Prove that all 3 sides are PROPORTIONAL SIMILAR TRIANGLES Example 1. The triangles share an ANGLE at the top of the triangles 2. Set up the proportions 10 5 = 8 4 The proportions are equal! THE TRIANGLES ARE SIMILAR BY SAS and ∆𝑸𝑹𝑺~∆𝑸𝑻𝑾 SIMILAR TRIANGLES You Try 1. 2. Reason: ____________ Reason: _____________ ∆𝑫𝑨𝑹~∆______________ ∆𝑨𝑩𝑪~∆_______________ MIDSEGMENT OF A TRIANGLE THEOREM The Midsegment of a Triangle Theorem states that the misdsegment of a triangle is equal to HALF of the THIRD side BEFORE setting up an equation, MULTIPLY the midsegment by 2 and then solve. Example: 2(5X – 1) = 58 10X – 2 = 58 10X = 60 X=6 MIDSEGMENT OF A TRIANGLE THEOREM Now you try: ALL DONE
