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Transcript
WARM UP: SOLVE FOR X 15x+5⁰ 120⁰ 22x+4⁰ PERPENDICULAR TRANSVERSAL THEOREM “If two lines are parallel and a transversal is perpendicular to one line, then it is perpendicular to the other. Reason: Corresponding angles are congruent TRIANGLE EXTERIOR ANGLE THEOREM The exterior angle of a triangle equals the sum of the 2 remote interior angles. a=m+h Why??? h m a PROOF: Prove: m+h=a h Triangle angle sum theorem m+h+g=180 Defn. of supplementary g+a=180 Subtraction property g=180-a m+h+(180-a)=180 Substitution Subtraction property m+h-a=0 Addition property m+h=a m g a Fill in a missing angle in the picture. R P T L U A 48 42 O J 62 C K B TRIANGLE INTERIOR ANGLE SUM THEOREM (PROOF BOOK). PROVE THAT THE INTERIOR ANGLES IN A TRIANGLE HAVE A MEASURE SUM Construct segment PA so that OF 180. it is parallel to segment QZ Statements p q z Reasons 3.5 The Polygon Angle-Sum Theorem LEQ: HOW DO WE CLASSIFY POLYGONS AND FIND THEIR ANGLE MEASURE SUMS? WHAT IS A POLYGON? “a closed plane figure with at least three sides that are segments. Sides intersect only at their endpoints and no adjacent sides are collinear.” NAMING POLYGONS Name like naming planes (go in order clockwise or counterclockwise) Vertices are the letters at the points Sides are segments that form the polygon D H K B G M TWO MAIN TYPES OF POLYGONS Convex Concave “has no diagonal with points outside the polygon” “has at least one diagonal with points outside the polygon” CLASSIFY WHICH ARE CONCAVE AND WHICH ARE CONVEX convex Convex convex Concave Concave Concave Convex CLASSIFYING BY SIDES 3 sides: 4 sides: 5 sides: Triangle Quadrilateral Pentagon 8 sides: Octagon 9 sides: Nonagon 10 sides: Decagon 6 sides: Hexagon 11 sides: Undecagon 7 sides: Heptagon 12 sides: Dodecagon HWK: FINISH RIDDLE WKST (BACK) AND COPY TRIANGLE EXTERIOR ANGLE THM & VERTICAL ANGLES THM INTO PROOF BOOK INTERIOR ANGLES The angles “inside” a polygon. There is a special rule to find the sum of the interior angle measures. Can you figure it out? Get with a partner Pg. 159 Activity (top) Do all 8 sides (skip the quadrilateral portion) Diagonals cannot overlap or cross each other; connect only vertices Polygon Number of Sides Number of Triangles Formed Sum of interior angle measures POLYGON INTERIOR ANGLE-SUM THEOREM “The sum of the measures of the interior angles of an ngon is (n-2)180.” Ex.) Sum of angles in a triangle. Tri=3 sides (3-2)180=180 Ex.) Sum of the angles in a quadrilateral (4 sides). (4-2)180=360 Ex.) The sum of the interior angles in a 23-gon… SO WHY DOES IT WORK?? 180(n-2) n=number of sides 6 triangles, so 6(180) degrees…but we want 4(180). What’s going on?? According to the theorem, the interior angles should sum to 720 degrees. Why? Polygon Exterior Angle-Sum Theorem “The sum of the measures of the exterior angles of a polygon, one at each vertex, is 360.” PROOF OF EXTERIOR ANGLE-SUM What do you know about exterior angles? IN PROOF BOOK: UNDER POLYGON EXTERIOR ANGLE SUM THM: Prove that the sum of the exterior angles of an ngon is always 360. In an n-sided polygon, there are n vertices. Thus, we can construct n lines from each vertice. The sum of the measures of these is 180n because of n lines each 180 degrees in measure. The sum of the interior angles is 180(n-2) by the interior angle sum theorem. To calculate the sum of the exterior angles, we subtract the interior sum from the total measure of all angles. Thus we have 180n-(180(n-2)). Statements Reasons CLASS/HOMEWORK : p. 161-162: 1-25, 47-49, 56