Nature of Roots

1. Nature of Roots

2. Nature of Roots Quadratic Equation: ax2 + bx + c = 0 ; a 0 Discriminant =  = b2 – 4ac  > 0 Two unequal real roots  = 0 One double real root (Two equal real roots)  < 0 No real roots Note:   0 Real roots

3. Transformation of a graph

4. Translation The original graph is y = f(x) . Let h, k > 0 .

5. Translation Examples

6. Reflection The original graph is y = f(x) .

7. Reflection Examples

8. Enlargement and Reduction The original graph is y = f(x) .

9. Enlargement and Reduction Examples

10. Trigonometric Functions

11. 30 2 2 60 1 Trigonometric Functions of Special Angles (I) 1 45 1

12. 0 (0, 1) cos 1 1 (1, 0) (1, 0) 0 (0, 1) undefined 1 tan 0 0 sin 0 0 undefined 1 Trigonometric Functions of Special Angles (II)

13. A S T C Trigonometric Functions of General Angles (I) II I III IV

14. Trigonometric Functions of General Angles (II)

15. Nets of a cube

16. Nets of a cube Two nets are identical if one can be obtained from the other from rotation (turn it round) or/and reflection (turn it over). An example of identical nets.

17. Nets of a cube There are a total of 11 different nets of a cube as shown.

18. Planes of Reflection

19. Planes of Reflection of a Cube

20. Planes of Reflection of a Regular Tetrahedron

21. Axes of Rotation

22. order of rotational symmetry = 4 order of rotational symmetry = 3 Axes of Rotation of a Cube order of rotational symmetry = 2

23. order of rotational symmetry = 2 Axes of Rotation of a Regular Tetrahedron order of rotational symmetry = 3

24. Compare Slopes of Different Lines

25. undefined slope m7 > 1 m6 = 1 ( = 45) 0 < m5 < 1 x m4 = 0 1 < m3 < 0 m2 = 1 ( = 135) m1 < 1 m1 < m2 < m3 < m4 < m5 < m6 < m7