Lecture 3: Period, Phase, Amplitude and Energy of SHM

Readings: Textbook pages 425-434

Equations of SHM

x = A cos(ω t + φ₀)
v = - A ω sin(ω t + φ₀)
a = -A ω² cos(ω t + φ₀)

Energy in SHM

We consider physical Harmonic Oscillator - mass m moving under the action of restoring force F_x = - k x . One can think spring and Hooke's law, but this is a general setup for Harmonic Oscillator

Physical system has energy, E . It is the sum of the kinetic and potential energy
E=K+U = ½ m v_x² + ½ k x²

Reminder about the potential energy: F_x = - d U(x)/dx . So, what is the potential U(x) ?

U(x) = - ∫ F dx = k ∫ x d x = ½ k x²

Compute E in SHM E = ½ m A²ω² sin²(φ) + ½ k A² cos²(φ) = ½ k A² [sin²(φ)+cos²(φ)]

Total energy of SHM is conserved ! E = ½ k A² = constant

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