Lecture 30

1. Lecture 30 • Review (the final is, to a large degree, cumulative) • ~50% refers to material in Ch. 1-12 • ~50% refers to material in Ch. 13,14,15 -- Chapter 13: Gravitation -- Chapter 14: Newtonian Fluids -- Chapter 15: Oscillatory Motion • Today we will review chapters 13-15 • 1st is short mention of resonance • Order Ch. 15 to 13

2. 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 today (except for medical emergency)

3. b/m small steady state amplitude b/m middling b large w  w  w0 Driven SHM with Resistance • Apply a sinusoidal force, F0 cos (wt), and now consider what A andb do, Not Zero!!!

4. Dramatic example of resonance • In 1940, a steady wind set up a torsional vibration in the Tacoma Narrows Bridge 

5. Dramatic example of resonance • Eventually it collapsed 

6. Mechanical Energy of the Spring-Mass System x(t) = A cos( t +  ) v(t) = -A sin( t +  ) a(t) = -2A cos( t +  ) & F(t)=ma(t) Kinetic energy: K = ½ mv2 = ½ m(A)2 sin2(t+f) Potential energy: U = ½ k x2 = ½ k A2 cos2(t + ) And w2 = k / m or k = m w2 K + U = constant

7. SHM x(t) = A cos( t +  ) v(t) = -A sin( t +  ) a(t) = -2A cos( t +  ) A : amplitude • : angular frequency • =2pf =2p/T  : phase constant xmax = A vmax = A amax = 2A

8. Recognizing the phase constant • An oscillation is described by x(t) =A cos(ωt+φ). Find φ for each of the following figures: Answers φ = 0 φ = π/2 x(t)= A cos (π) φ = π

9. Common SHMs

10. SHM: Friction with velocity dependent Drag force -bv b is the drag coefficient; soln is a damped exponential if

11. SHM: Friction with velocity dependent Drag force -bv If the maximum amplitude drop 50% in 10 seconds, what will the relative drop be in 30 more seconds?

12. Chapter 14 Fluids • Density ρ = m/V • Pressure P = F/A P1 atm = 1x105 N/m2 Force is normal to container surface • Pressure with Depth/Height P = P0 + ρgh • Gauge vs. Absolute pressure • Pascal’s Principle: Same depth  Same pressure • Buoyancy, force, B, is always upwards • B = ρfluid Vfluid displaced g (Archimedes’s Principle) • Flow Continuity: Q = v2A2 = v1A1 (volume / time or m3/s) Bernoulli’s eqn: P1+ ½ ρv12 + ρgh1 = P2+ ½ ρv22 + ρgh2

13. Example problem • A piece of iron (ρ=7.9x103 kg/m3) block weighs 1.0 N in air. How much does the scale read in water? • Solution: • In air T1 = mg = ρiromV g • In water: B+T2-mg = 0 T2 = mg-B = mg – ρwaterVg = mg – ( ρwater /ρiron ) ρiron Vg = mg (1-ρwater /ρiron ) = 0.87mg = 0.87 N

14. Another buoyancy problem • A spherical balloon is filled with air (rair 1.2 kg/m3). The radius of the balloon is 0.50 m and the wall thickness of the latex wall is 0.01 m (rlatex 103 kg/m3). The balloon is anchored to the bottom of stream which is flowing from left to right at 2.0 m/s. The massless string makes an angle of 30° from the stream bed. • What is the magnitude of the drag force on the balloon? Key physics: Equilbrium and buoyancy. SFx=0 & SFy=0

15. Another buoyancy problem • A spherical balloon is filled with air (rair 1.2 kg/m3). The radius of the balloon is 0.50 m and the wall thickness of the latex wall is 1.0 cm (rlatex 103 kg/m3). The balloon is anchored to the bottom of stream which is flowing from left to right at 2.0 m/s. The massless string makes an angle of 45° from the stream bed. • What is the magnitude of the drag force on the balloon? Key physics: Equilibrium and buoyancy. SFx=0 & SFy=0 SFx=-Tcosq + D = 0 SFy=-Tsinq + Fb - Wair = 0 Wair = rair V g= rair (4/3 pr3) g with r=0.49 m Fb= rwater V g= rwater (4/3 pr3) g Variation: What is the maximum wall thickness of a lead balloon filled with He? Fb D T Wair

16. Pascal’s Principle • Is PA = PB ? Answer: No! Same level, same pressure, only if same fluid density B A

17. Power from a river • Water in a river has a rectangular cross section which is 50 m wide and 5 m deep. The water is flowing at 1.5 m/s horizontally. A little bit downstream the water goes over a water fall 50 m high. How much power is potentially being generated in the fall? • W = Fd = mgh • Pavg= W / t = (m/t) gh • Q = Av and m/t = rwater Q (kg/m3 m3/s) • Pavg= rwater Av gh = 103 kg/m3 x 250 m2 x 1.5 m/s x 10 m/s2 x 50 m = 1.8x108 kg m2/s2/s = 180 MW

18. Chapter 13 Gravitation • Universal gravitation force • Always attractive • Proportional to the mass ( m1m2 ) • Inversely proportional to the square of the distance (1/r2) • Central force: orbits conserve angular momentum • Gravitational potential energy • Always negative • Proportional to the mass ( m1m2 ) • Inversely proportional to the distance (1/r) • Circular orbits: Dynamical quantities (v,E,K,U,F) involve radius • K(r) = - ½ U(r) • Employ conservation of angular momentum in elliptical orbits • No need to derive Kepler’s Laws (know the reasons for them) • Energy transfer when orbit radius changes(e.g. escape velocity)

19. Key equations • Newton’s Universal “Law” of Gravity Universal Gravitational Constant G = 6.673 x 10-11 Nm2 / kg2 The force points along the line connecting the two objects. On Earth, near sea level, it can be shown that gsurface ≈ 9.8 m/s2. • Gravitational potential energy “Zero” of potential energy defined to be at r = ∞, force  0 • At apogee and perigee:

20. Dynamics of Circular Orbits For a circular orbit: • Force on m: FG= GMm/r2 • Orbiting speed: v2 = GM/r (independent of m) • Kinetic energy: K = ½ mv2 = ½ GMm/r • Potential energy UG= - GMm/r • Notice UG = -2 K • Total Mech. Energy: • E = KE + UG = - ½ GMm/r

21. Changing orbit • A 200 kg satellite is launched into a circular orbit at height h= 200 km above the Earth’s surface. What is the minimum energy required to put it into the orbit ? (ignore Earth’s spin) (ME = 5.97x1024 kg, RE = 6.37x106 m, G = 6.67x10-11 Nm2/kg2) • Solution: Initial: h=0, ri = RE • Ei = Ki +Ui = 0 + (-GMEm/RE ) = -1.25x1010J • In orbit: h = 200 km, rf = RE + 200 km Ef = Kf + Uf = - ½ Uf+ Uf = ½ Uf = - ½ GMEm/(RE+200 km) = -6.06x109J DE = Ef – Ei = 6.4x109 J

22. Escaping Earth orbit • Exercise: suppose an object of mass m is projected vertically upwards from the Earth’s surface at an initial speed v, how high can it go ? (Ignore Earth’s rotation) implies infinite height

23. We hope everyone does well on Sunday Have a great summer!