1. Simple Harmonic Motion Sinusoidal curve and circular motion

2. A mass is oscillating on a spring Position in equal time intervals:

3. Model: oscillation coupled to a wheel spinning at constant rate

4. Vertical position versus time: Period T

5. Sinusoidal motion Time (s) Displacement (cm) Period T

6. Sine function: mathematically x y 2π2π π/2π3π/22π2π5π/23π3π7π/24π4π9π/25π5π 1 y=sin(x) y=cos(x)

7. Sine function: employed for oscillations x y π/2 π 3π/2 2π2π5π/2 3π3π 7π/24π4π 9π/2 5π5π 1 y=sin(x) Time t (s) Displacement y (m) T/2 T2T -A A y= A sin(ωt)

8. Sine function: employed for oscillations Time t (s) Displacement y (m) T/2 T2T -A A y= A sin(ωt) What do we need ? 1.Maximum displacement A 2.ωT = 2π 3.Initial condition

9. Sine function: employed for oscillations 1.Maximum displacement A 2.ωT = 2π 3.Initial condition y(t=0) Angular frequency in rad/s Amplitude A is the maximum distance from equilibrium Starting from equilibrium: y=A sin(ωt) Starting from A: y=A cos(ωt)

10. Example 1 - find y(t) y(cm) t(s) 5 10 15 30 Period? T=4 s Sine/cosine? Sine Amplitude? 15 cm Where is the mass after 12 seconds?

11. Example 2 – graph y(t) Amplitude? 3cm -3 3 y (cm) y(t=0)? -3cm Period? 2s 24 6 8 t(s) When will the mass be at +3cm? 1s, 3s, 5s, … When will the mass be at 0? 0.5s, 1.5s, 2.5s, 3.5 s …

12. Summary Harmonic oscillations are sinusoidal Motion is repeated with a period T Motion occurs between a positive and negative maximum value, named Amplitude Can be described by sine/cosine function y=A sin(ωt) or y=A cos(ωt) Angular frequency ω=2π/T