1. Polygons, Circles, and Angles

2. Classifying Polygons Polygon—closed figure with at least 3 sides Regular polygon—all sides and angles are congruent

3. Classifying Polygons cont… Triangles are classified by sides and angles – Sides Scalene Isosceles Equilateral – Angles Right Obtuse Acute

4. Classifying Angles cont… Quadrilaterals—4 sided figures – Trapezoid- 1 pair of parallel sides – Parallelogram- 2 pairs of parallel sides Rhombus- 4 congruent angles Rectangle- 2 sets of parallel sides and 4 congruent angles Square- all parallel sides and 4 congruent angles

5. Formula for measure of angles Finding total measure of angles in a polygon S = 180 (n – 2) N- number of sides S- measure of angles *the reason for 180 is because any figure can be divided into triangle

6. Circles Circle- set of all points that are the same distance from the center ∏= 3.14 Circumference –distance around a circle C = ∏d C = 2r∏

7. Circles cont… Radius ½ the diameter Diameter Chord

8. Making Circle Graphs Set up a proportion to find the measures of the central angles – The amount of degree in a circle is 360 – The sum of the all percents should equal 100 The percent amount goes over 100 The missing angle goes over 360

9. Making Circle Graphs cont… Ex: Monthly Budget – Recreation – 20% – Food- 25% – Clothes- 15% – Savings- 40%

10. Making Circle Graphs cont…

11. Making Circle Graphing cont… When the numbers aren’t in percents, add to find a total – Set up ratio as part to whole – Set up proportion to find the measures of the central angles Remember the missing angle is over 360 The other side of the proportion is the ratio

12. Making Circle Graphs cont… Ex: Kentucky’s National Parks (millions of people visited) Lincoln’s Birthplace – 0.3 Big South Fork – 0.4 Cumberland Gap – 1.3 Mammoth Cave – 1.8 Total =

13. Making Circle Graphs cont…

14. Angle Relationships Supplementary—add up to 180 Complementary—add up to 90

15. Angle Relationships cont… Adjacent angles—share a vertex and a side but have no interior points in common – supplementary or complementary 1 42 3

16. Angle Relationships cont… Vertical angles—formed by 2 intersecting lines and are opposite each other – Alternate interior—are vertical angles that are INSIDE the intersecting lines – Alternate exterior—are vertical angles that are OUTSIDE the intersecting lines 1 4 2 3

17. Angle Relationships cont… Transversal—line that intersects 2 other parallel lines in different points Corresponding angles—lie on the same side of the transversal line and alternate 1 2 3 4 5 6 7 8

18. Angle Relationships cont… line A 12 line B 3 4 5 6 7 8line C

19. Congruent Figures Congruent Figures—have the same size, shape, and their corresponding parts have equal measures – This is used to find missing amounts in diagrams

20. Congruent Figures cont… D 50 m 30 m B 40 m C E A

21. Identifying Congruent Triangles Side-Side-Side (SSS) Side-Angle-Side (SAS) Angle-Side-Angle (ASA)

22. Transformations Transformation—change of position or size of a figure 3 types – Translation – Reflection – Rotation

23. Transformations cont… Translation—slide – Same distance and direction for all points moved – Figure stays the same shape First translate each vertex of the figure Connect the image points The image is congruent to the original figure

24. Transformations cont… Translations cont… – To find the coordinates of a translated image, add or subtract the # of units moved from the coordinates of the original figure – Ex: (-4,3)  (-2,-1) – Ex: (3, -5)  (4,-3)

25. Transformations cont… Reflection—flips a figure over a line of symmetry – Line of symmetry—divides a figure into 2 congruent halves and is a mirror image of the other half Reflecting over the x-axis—changes the y numbers only Reflecting over the y-axis—changes the x numbers only Figures can also be reflected across any line in the plane

26. Transformations cont… Rotation—turn about a fixed point – Angle of rotation—angle that measures the amount of the rotation (90°, 180°, 270°, 360°) – Rotational symmetry—if you can rotate a figure 180° or less and match the original figure Divide 360 by the number of points in the figure