1. Geometrical Reasoning

2. Labelling angles When two lines meet at a point an angle is formed. An angle is a measure of the rotation of one of the line segments relative to the other. We label points using capital letters. A O C The angle can then be described as AOC or AÔC

3. Vertically opposite angles When two lines intersect, two pairs of vertically opposite angles are formed. a b c d a = c and b = d Vertically opposite angles are equal.

4. Angles on a straight line Angles on a line add up to 180 . a + b = 180° a b because there are 180° in a half turn.

5. Angles around a point Angles around a point add up to 360 . a + b + c + d = 360  a b c d because there are 360  in a full turn.

6. Complementary angles When two angles add up to 90° they are called complementary angles. a b a + b = 90° Angle a and angle b are complementary angles.

7. Supplementary angles When two angles add up to 180° they are called supplementary angles. a b a + b = 180° Angle a and angle b are supplementary angles.

8. Angles made with parallel lines When a straight line crosses two parallel lines eight angles are formed. a b c d e f g h Co – interior angles are supplementary X Y X + Y = 180 (co-interior)

9. dd hh a b c e f g Corresponding angles There are four pairs of corresponding angles, or F-angles. a b c e f g d = h because Corresponding angles are equal

10. ff dd Alternate angles There are two pairs of alternate angles, or Z-angles. d = f because Alternate angles are equal a b c e g h

11. Polygons A polygon is a 2-D shape made when line segments enclose a region. A B C D E The line segments are called sides. Each end point is called a vertex. We call more than one vertices. 2-D stands for two-dimensional. These two dimensions are length and width. A polygon has no thickness.

12. Sum of the interior angles in a polygon We’ve seen that a quadrilateral can be divided into two triangles … … and a pentagon can be divided into three triangles. How many triangles can a hexagon be divided into? A hexagon can be divided into four triangles.

13. Sum of the interior angles in a polygon The number of triangles that a polygon can be divided into is always two less than the number of sides. We can say that: A polygon with n sides can be divided into ( n – 2) triangles. The sum of the interior angles in a triangle is 180°. So: The sum of the interior angles in an n -sided polygon is ( n – 2) × 180°.

14. Interior angles in regular polygons A regular polygon has equal sides and equal angles. We can work out the size of the interior angles in a regular polygon as follows: Name of regular polygon Sum of the interior angles Size of each interior angle Equilateral triangle180°180° ÷ 3 =60° Square2 × 180° = 360°360° ÷ 4 =90° Regular pentagon3 × 180° = 540°540° ÷ 5 =108° Regular hexagon4 × 180° = 720°720° ÷ 6 =120°

15. The sum of exterior angles in a polygon For any polygon, the sum of the interior and exterior angles at each vertex is 180°. For n vertices, the sum of n interior and n exterior angles is n × 180° or 180 n °. The sum of the interior angles is ( n – 2) × 180°. We can write this algebraically as 180( n – 2)° = 180 n ° – 360°.

16. Now try these:

17. Answers: 1.72°2. 53°3. 54 ° 4. 26 ° 5. 60 ° 6. 20 ° 7. 52.9 ° 8. 63 ° 9 a. 10 ° 9 b. 35 °