Scaled Helicopter Mathematical Model and Hovering Controller

1. Scaled Helicopter Mathematical Model and Hovering Controller Brajtman Michal & Sharabani Yaki Supervisor : Dr. Rotstein Hector

2. Project Goals • Simulation using Matlab’s Simulink • Studying the small scale helicopter’s dynamics • Modeling the system • Regulator implementation

3. Studying the small scale helicopter’s dynamics. A universal model is hard to develop The dynamics of different types ofhelicopters differ

4. Options for modeling the system • Downscaling from full size helicopters • Identification by measurements • Decoupling

5. Helicopter’s Components

6. Yaw, Pitch and Roll

7. Symmetrical Airfoil

8. Coning & Flapping

9. Main Rotor Control

10. Axes Systems

11. ( ) + - + = + m u wq vr g sin X T & q X ( ) - + - f q = + v pw ru g sin cos Y T & m Y ( ) + - - f q = + m w pv qu g cos cos Z T & Z I - I + I - I - I = + p r qr ( ) pq L L & & xx xz zz yy xz A T I + I - I + - I = + 2 2 q pr ( ) ( p r ) M M & yy xx zz xz A T I - I + I - I + I = + r p pq ( ) qr N N & & xx xz yy xx xz A T j = + j q + j q p q sin tan r cos tan & & q = j - j q cos r sin y = j + j q ( q sin r cos ) / cos & Dynamics equations

12. Mathematical model

13. Simulink implementation

14. Results – open loop

15. Closed loop system

16. Closed loop – after tuning

17. Conclusions • The system and the controller (linear & nonlinear) were verified • A mathematical model was constructed • A full state feedback LQ controller was designed

18. THE END