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Lecture 29. Goals Describe oscillatory motion in a simple pendulum Describe oscillatory motion with torques Introduce damping in SHM Discuss resonance. Final Exam Details. Sunday, May 13th 10:05am-12:05pm in 125 Ag Hall & quiet room Format: Closed book
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Lecture 29 • Goals • Describe oscillatory motion in a simple pendulum • Describe oscillatory motion with torques • Introduce damping in SHM • Discuss resonance
Final Exam Details • Sunday, May 13th 10:05am-12:05pm in 125 Ag Hall & quiet room • Format: • Closed book • Up to 4 8½x1 sheets, hand written only • Approximately 50% from Chapters 13-15 and 50% 1-12 • Bring a calculator • Special needs/ conflicts: All requests for alternative test arrangements should be made by Thursday May10th (except for medical emergency)
Mechanical Energy of the Spring-Mass System x(t) = A cos( t + ) v(t) = -A sin( t + ) a(t) = -2A cos( t + ) Kinetic energy is always K = ½ mv2 = ½ m(A)2 sin2(t+f) Potential energy of a spring is, U = ½ k x2 = ½ k A2 cos2(t + ) And w2 = k / m or k = m w2 K + U = constant
SHM is a close as Lake Mendota… So can you estimate the characteristic frequency for a bobbing in the water? If you have equilibrium and there is a linear restoring force, then yes with w = (k / m)½ y0 F mg B
SHM is a close as Lake Mendota… Deeper than y0 means and a net force of A linear restoring force with k = rwAg and boat mass m = Ay0rwso w = (g / y0)½ Lighter boats bob more quickly than heavy ones (if the same size) y mg FB
The shaker cart • You stand inside a small cart attached to a heavy-duty spring, the spring is compressed and released, and you shake back and forth, attempting to maintain your balance. Note that there is also a sandbag in the cart with you. • At the instant you pass through the equilibrium position of the spring, you drop the sandbag out of the cart onto the ground. • What effect does jettisoning the sandbag at the equilibrium position have on the amplitude of your oscillation? A. It increases the amplitude. B. It decreases the amplitude. C. It has no effect on the amplitude. Hint: At equilibrium, both the cart and the bag are moving at their maximum speed.
The shaker cart • Instead of dropping the sandbag as you pass through equilibrium, you decide to drop the sandbag when the cart is at its maximum distance from equilibrium. • What effect does jettisoning the sandbag at the cart’s maximum distance from equilibrium have on the amplitude of your oscillation? A. It increases the amplitude. B. It decreases the amplitude. C. It has no effect on the amplitude. Hint: At maximum displacement there is no kinetic energy.
The shaker cart • What effect does jettisoning the sandbag at the cart’s maximum displacement from equilibrium have on the maximum speed of the cart? A. It increases the maximum speed. B. It decreases the maximum speed. C. It has no effect on the maximum speed. Hint: At maximum displacement there is no kinetic energy.
L sin q L y T x mg The Pendulum (using torque) • A pendulum is made by suspending a mass m at the end of a string of length L. Find the frequency of oscillation for small displacements. Stz = Iaz = -mg sin(q) L Stz≈ mL2az≈ -mg q L L (d2q /dt2) = -g q compare to max = -kx d2q /dt2 = (-g/L) q withq(t)= q0 cos( wt + f ) andw =(g/L)½ z
z y L x T m mg The Pendulum • A pendulum is made by suspending a mass m at the end of a string of length L. Find the frequency of oscillation for small displacements. If q small then sin(q) q 0° tan 0.00 = sin 0.00 = 0.00 5° tan 0.09 = sin 0.09 = 0.09 10° tan 0.17 = sin 0.17 = 0.17 15° tan 0.26 = 0.27 sin 0.26 = 0.26
Exercise Simple Harmonic Motion • You aresitting on a swing. A friend gives you a small push and you start swinging back & forth with period T1. • Suppose you were standing on the swing rather than sitting. When given a small push you start swinging back & forth with period T2. Which of the following is true recalling that w = (g/L)½ (A)T1 = T2 (B)T1 > T2 (C) T1 < T2
A Rod Pendulum • A pendulum is made by suspending a thin rod of length L and mass M at one end. Find the frequency of oscillation for small displacements. S tz = I a= -| r x F | = (L/2) mg sin(q) Irod at end = mL2/3 - mL2/3 a L/2 mg q -1/3 L d2q/dt2 = ½ g q z T x CM L mg
wire I Torsion Pendulum • Consider an object suspended by a wire attached at its CM. The wire defines the rotation axis, and the moment of inertia I about this axis is known. • The wire acts like a “rotational spring”. • When the object is rotated, the wire is twisted. This produces a torque that opposes the rotation. • Torque is proportional to the angular displacement: = - kwherek is the torsion constant • w = (k/I)½
R R R R Exercise Period • All of the following torsional pendulum bobs have the same mass and radius with w = (k/I)½ • Which pendulum rotates the slowest (i.e. has the longest period) if the wires are identical? (A) (B) (D) (C)
What about Friction?A velocity dependent drag force (A model) We can guess at a new solution. and now w02 ≡k / m Note With,
What about Friction? A damped exponential if
Variations in the damping Small damping time constant (m/b) Low friction coefficient, b << 2m Moderate damping time constant (m/b) Moderate friction coefficient (b < 2m)
Damped Simple Harmonic Motion • A downward shift in the angular frequency • There are three mathematically distinct regimes underdamped overdamped critically damped
Driven SHM with Resistance • Apply a sinusoidal force, F0 cos (wt), and now consider what A andb do, Not Zero!!! b/m small steady state amplitude b/m middling b large w w w0
For Thursday • Review for final!
