Transcript Slide 1
Everything oscillate even stars – but it takes some time – 1 oscillation per 70 million years Oscillations most solids are elastic - most material objects vibrate when given an impulse a boat at anchor at sea the human vocal chords an oscillating cantilever the Earth’s atmosphere after a large explosion. a mass at the end of the spring a tuning fork a pendulum the strings of a guitar or piano bridge can vibrate when heavy truck passes electromagnetic waves – light waves, radar, radio waves atoms vibrate within molecule molecules of the solid oscillate about their equilibrium positions atoms vibrate within molecule H 2O molecules of the solid oscillate about their equilibrium positions In a solid, the molecules are bond together as if they are connected by springs. The molecules are in random vibration and the temperature of the solid is a measure of the average kinetic energy of the molecules. The particles in a solid vibrate more when it is heated, and take up more room. cold hot What do all of them have in common? To make a mathematical model of oscillatory motion, we will analyze two different oscillations and see if there is any similarity. Analyzing two examples of oscillations: pendulum and a mass on a spring The pendulum - a closer look. The “restoring” force q L 𝐹𝑐𝑝 T T mg restoring force A O Everything cancels except for the red arrows Force 𝒎𝒈 𝒔𝒊𝒏 𝜽 is responsible for changing the speed Force 𝑭𝒄𝒑 acts as the centripetal force. It is responsible for changing the direction of velocity only. mg B To start the pendulum, you displace it from point O to point A and let it go! If no string – no tension - the mass falls down Tension in the string T forces it to move in a circle Resolve mg into components: 𝑚𝑔 cos 𝜃 𝑎𝑛𝑑 𝑚𝑔 sin 𝜃 At point O 𝒎𝒈 𝒔𝒊𝒏 𝜽 vanishes. There is no tangential acceleration that changes speed. Point O is translational equilibrium. On either side of point O, 𝒎𝒈 𝒔𝒊𝒏 𝜽 act to bring (restore) the pendulum back to point O. That’s why we call it “restoring” force. This is the force responsible for the motion of the pendulum. the role of the restoring force the restoring force is the key to understanding all systems that oscillate or repeat a motion over and over. the restoring force always points in just the right direction to bring the object back to translational equilibrium from A to O the restoring force accelerates the pendulum down from O to B it slows the pendulum down so that at point B it can turn around It is not constant force. It varies with the object’s distance from its equilibrium position; greater distance, greater force; zero distance, zero force – translational equilibrium position. notice that at the very bottom of the pendulum’s swing (at O ) the restoring force is ZERO, so what keeps it going? It is inertia!!! even though the restoring force is zero at the bottom of the pendulum swing, the ball is moving and since it has inertia it keeps moving to the left. as it moves from O to B, gravity slows it down (as it would any object that is moving up), until at B it momentarily comes to rest. let’s look at energy ME to start the pendulum, we move it from O to A. At point A it has only potential energy due to gravity (GPE) from A to O, its GPE is converted to kinetic energy, which is maximum at O (its speed is maximum at O) from O to B, it uses its kinetic energy to climb up the hill, converting its KE back to GPE at B it has just as much GPE as it did at A. springs amazing devices! To start the oscillations, you pull the mass and let it go! The spring force (result of intermolecular forces of the spring) always acts to restore the spring back to equilibrium. In doing so it pulls the mass toward the equilibrium. The greatest force is at the maximum distance. As the distance decreases, the force decreases. EPE is being converted into KE of the ball. Spring force is zero at equilibrium (unstretched) position. Once the mass passes equilibrium position (because of inertia) the spring force will act in opposite direction of the motion slowing down the mass. After the mass has come momentarily to rest, the spring pulls it back toward equilibrium and the process continues - oscillations. The spring force is restoring force. Energy in the spring oscillations a compressed or stretched spring has elastic potential energy ( = work done on it to stretch it or compress it) this elastic potential energy is what drives the system if you let the mass go, this elastic PE changes into KE. when the mass passes the equilibrium point, the KE goes back into PE if there is no friction the energy keeps sloshing back and forth but it never decreases Some terminology Cycle – one complete oscilation Equilibrium position – position where an object would rest if not disturbed. Displacement x, θ – displacement from equilibrium position. Amplitude x0, θ0 – the maximum displacement of an oscillating object from equilibrium. Period T – the time it takes an oscillating system to make one complete oscillation. (A O B O A ) Frequency f – the number of complete oscillations made by the system in one second. Frequency = 1/period f= 1 T (f) = 1/s = s-1 = 1 Hz (hertz) Example: A weight suspended from a spring is seen to bob up and down over a distance of 20 cm, twice each second. What is its frequency? Its period? Its amplitude? Frequency = 2 per second = 2 Hz Period = 1/frequency = ½ s Amplitude = 10cm Graphical treatment and math To analyse these oscillations further, we can plot graphs for these motions. You can plot a displacement – time graph by attaching a pen to a pendulum and moving paper beneath it at a constant velocity, or by shining the light on and oscillating spring. the shadow should look like this graph The shape of this displacement – time graph is cosine curve. The amplitude is x0 is initial displacement displacement x = x0 cos ωt where angular frequency is: ω = 2πf = 2π/T velocity is a slope (derivative) of displacement acceleration is a slope (derivative) of velocity x = x0 cos ωt v = - ω x0 sin ωt v = - v0 sin ωt a = - ω2 x0 cos ωt a = - a0 cos ωt a = – ω2 x x = x0 cos ωt v = - v0 sin ωt a = – ω2 x a = - a0 cos ωt F = – m ω2 x Formal definition of Simple Harmonic Motion – SHM. If the acceleration a of a system is directly proportional to its displacement x from its equilibrium position and is directed towards the equilibrium position, then the system will execute SHM. a = - ω2 x is the mathematical definition of SHM. Another definition: Whenever the force acting on a particle is linearly proportional to the displacement and directed toward equilibrium, the particle undergoes simple harmonic motion. Such a force is called a linear restoring force. Properties of SHM a = – ω2 x The negative sign indicates that the acceleration is directed towards equilibrium, as x is directed away from equilibrium. When x is max. or min. the velocity is zero, and acceleration and force are maximum in the direction opposite to displacement. When x = 0, object is at equilibrium position, a = 0, F = 0 and v is maximum. for any x, acceleration is a = – ω2 x and velocity is v = ± ω (x02 – x2)1/2 v = - ωx 0 sin ωt = - ωx 0 1-cos2ωt = - ωx 0 Period is CONSTANT and does NOT depend on amplitude. x2 1- 2 x0 common equations for SHM x = x0 cos ωt v = - v0 sin ωt v0 = ωx0 a = - a0 cos ωt a0 = ω2x0 a = – ω2 x v = ± ω (x02 – x2)1/2 A pendulum completes 20 cycles in 12s. What is (a) frequency? (b) the angular frequency? a. f = 20/12 s = 1.7 Hz b. ω = 2πf = 10.5 Hz QUESTION: A steel ball is dropped onto a concrete floor. Over and over again, it rebounds to its original height. Is this SHM? Look for equilibrium position in the middle and a force that is directed toward it from both sides of the equilibrium. If that force changes as the distance changes you found restoring force!!! 1. During the time when the ball is in the air, either falling down or rebounding up, the only force acting on the ball is its weight, which is constant. 2. There is no equilibrium position about which oscillations occur. Thus, the motion of the bouncing ball is not simple harmonic motion. The graph in next figure shows the variation with time t of the displacement x of a system executing SHM. Use the graph to determine the (i) period of oscillation (ii) amplitude of oscillation (iii) maximum speed(iv) the speed at t = 1.3 s (v) maximum acceleration (i) T = 2.0 s (ii) x0 = 8.0 cm (iii) v0 = ωx0 = (2π/2) (8.) = 25 cm s-1 (iv) v = −v0sinωt = −25sin (1.3π). 1.3π = 1.3 π × 1800 /π = 2340 v = −25sin (2340 ) = +20 cm s-1. Or we can solve using v = ω x 02 -x 2 from the graph at t = 1.3 s, x = − 4.8 cm , and ω = 2π/T = π s-1 v = π (8.0)2 -(4.8)2 = 20 cm s-1 (v) a0 = ω2x0 = π2 × 8.0 = 79 m s-2 Answer the same questions (a)(i) to (a)(iv) in the above example for the system oscillating with SHM as described by the graph in the next figure. Use the graph to determine the (i) period of oscillation (ii) amplitude of oscillation (iii) maximum speed(iv) the speed at t = 1.3 s (v) maximum acceleration Also state two values of t at which the magnitude of the velocity is a maximum and two values of t at which the magnitude of the acceleration is a maximum. (i) T = 2.4 s (ii) x0 = 6.2 cm (iii) v0 = 16 cm s-1 (iv) 42 cm s-2, 0 and 1.2 s, 0.6 s and 1.8 s Restoring force: F = - mg sin θ for small angles: sin θ ≈ θ Restoring force: F = - kx true for small x compared to length F = - mg θ F = - kx restoring force is proportional to displacement The negative sign indicates that the restoring force is directed towards equilibrium, as displacement (θ,x) is directed away from equilibrium. Period of oscillations for two simple harmonic oscillators Simple pendulum Mass-spring system m L period is independent T = 2π T=2π k g of amplitude period only depends on its length period does not depend on the mass period depends on the value of g e.g.. the same pendulum oscillates slower on the moon than on earth. the period gets smaller if a stronger spring (larger k) is used the period of oscillation is longer if a bigger mass (m) is used To find out more about Spring/Tension force – Hooke’s law Click on the spring – it will take you to the end of power point • Heavier kids can not swing faster. When walking, we allow our legs to swing with the help of gravity, like a pendulum. In the same way that a long pendulum has a greater period, a person with long legs tends to walk with a slower stride than a person with short legs. •This is most noticeable in long-legged animals such as giraffes, horses, and ostriches, which run with a slower gait than do short-legged animals such as dachshunds, hamsters and mice. Example: Is the time required to swing to and fro on a playground swing longer or shorter when you stand rather than sit? When you stand, the pendulum is effectively shorter, because the center of mass of the pendulum (you) is raised and closer to the pivot. So period is less – it takes a shorter time. Not every periodic motion produced by restoring force is SHM. Examples are: - Pendulum: if the amplitude is less then 150, period doesn’t depend either on amplitude, or on mass but only on length. - Spring: if the amplitude is small compared to the length of the spring, oscillations are SHM. Even if friction or air resistance decreases the amplitude, the period remains the same. Which one is SHM ? Why? Energy changes during simple harmonic motion velocity of a mass undergoing SHM is given by equation v = ± ω (x02 – x2)1/2 → KE = 1 mω2 x 02 -x 2 2 When x = 0, object is at equilibrium position, F = 0, a = 0, and v is maximum, therefore KE is maximum, and PE zero (EPE or GPE). KEmax = 1 mω2 x 02 2 Since no external work is done on the system, according to the law of conseravtion of energy mechanical energy is conserved. As the system oscillates there is a continual interchange between kinetic energy and potential energy such that the loss in kinetic energy equals the gain in potential energy and 1 mω2 x 02 2 Potential energy at any moment = total energy - KE 1 PE = mω2 x 2 2 ME = PE + KE = 1 mω2 x 02 cos2ωt 2 1 KE = mω02 x 02 sin2ωt 2 PE = At intermediate points, the energy is part kinetic and part potential ME = KE + PE. ME = 1 mω2 x 02 = const. for given oscillations 2 What is meant by damping? "to damp" is to decrease the amplitude of a wave When deriving equations for PE and KE for an oscillating system we assumed that no energy is lost. In real system there is always friction at the support and sometimes air resistance. The work the system has to do against these forces results in loss of energy as it oscillates. The amplitude of the oscillations gradually decreases with time. Oscillations, the amplitude of which decrease with time, are called damped oscillations, whereas the effect is called damping. Oscillating systems are subject to damping as it is impossible to completely remove friction. Because of this, oscillating systems are often classified by the degree of damping. Light damping If the opposing forces are small, the result is gradual loss in total energy.The oscillations are said to be lightly damped. The decay in amplitude is relatively slow and the pendulum will make quite a few oscillations before finally coming to rest. Example: spring in air would have a little damping due to air resistance. Frequency of damped harmonic motion You can see from the graph that the frequency does not change as the amplitude gets less. As the motion slows down, the distance travelled gets less, so the time for each cycle remains the same. Heavily damped oscillations The amplitude of the heavily damped oscillations decay very rapidly and the system quickly comes to rest. Such oscillations are said to be heavily damped. If the mass is suspended in water, the damping is greater, resulting in a more rapid energy loss. Critical damping Critical damping ccurs if the resistive force is so big that the system returns to its equilibrium position without passing through it. The mass comes to rest at its equilibrium position without oscillating. The friction forces acting are such that they prevent oscillations. This would be the case if the mass were suspended in a thicker liquid such as honey. Examples of damping Damper is a fluid. The more viscous a fluid is, the more resistant it is to flow. Damper in suspension system is oil. A car suspension system has many springs between the body and the wheels. Their purpose is to absorb shock caused by bumps in the road. The car is therefore an oscillating system that would oscillate up and down every time the car went over the bump. As this would be rather unpleasant for the passengers, the oscillations are damped by dampers (wrongly known as shock absorbers) The oscillations (vibrations) can produce undesirable and sometimes, dangerous effects. For example, when a ball strikes the strings of a tennis racquet, it sets the racquet vibrating and these vibrations will cause the player to lose some control over his or her shot. For this reason, some players fix a “damper” to the springs. If placed on the strings in the correct position, this has the effect of producing critically damped oscillations and as a result the struck tennis racquet moves smoothly back to equilibrium. In addition, vibrations caused by the impact of the ball with the strings of a racquet normally are transmitted through the handle of the racquet and the hand and wrist of the player to the forearm where it may cause a tennis elbow. Another example is one that involves vibrations that may be set up in buildings when there is an earthquake. For this reason, in regions prone to earthquakes, the foundations of some buildings are fitted with damping mechanisms. These mechanisms insure any oscillations set up in the building are critically damped. Natural frequency If the spring is pulled down and released it will oscillate. The frequency of this oscillation is called natural frequency. Definition: Natural frequency is the frequency an object will vibrate with after an external disturbance. All objects have a natural frequency or set of frequencies - at which they vibrate freely. These frequencies depend only on the system itself. The mass/spring system oscillates at a certain frequency determined by its mass, m and the spring stiffness constant, k A pendulum always oscillates at the same frequency (determined by length) when set in motion. More complicated systems, such as bridges, also vibrate with a fixed natural frequency. A glass and stone too. Your heart too. And spleen. Forced oscillations. If the support of the spring is oscillated, then the system will be forced to vibrate at another frequency. If a system is forced to oscillate at a frequency other than the natural frequency, this is called a forced oscillation. If the driving force force has the same frequency as the natural frequency, the resonance occur. Definition of phenomenon known as resonance: The increase in amplitude of oscillation of a system exposed to a periodic driving force with a frequency equal to the natural frequency of the system. free oscillation Mass oscillates at frequency f0 forced oscillation System driven at frequency f caused mass to oscillate resonance System driven at frequency f0 caused large amplitude oscillations. The resonance can result in a quite dramatic increase in amplitude that sometimes can be very unfortunate A lazy monkey gives a single push to a swing. The swing oscillates at its natural frequency. With no further pushes (no energy input), the oscillations of the swing will die out and the swing will eventually come to rest. This is an example of damped harmonic motion. A busy money, each time the swing returns to him, gives it another push. The amplitude of the swing gets larger and larger and if not careful he’ll end up with the swing doing the work on his face. Driving force has the same frequency as the natural frequency of the swing. Resonance occurs. Those of you who have siblings might have had an unpleasant knock down after being so good. Or you might have been on the swing. When you push a child on a swing you are using resonance to make the child go higher and higher. Using Resonance to shatter a Kidney stone. By tuning ultra sound waves to the natural frequency of a kidney stone, we can rely on resonance to pulverize the stone. Enrico Caruso's voice possessed a richness of sound that was said to be able to shatter a crystal goblet by singing a note of the right frequency at full voice. Sound waves emitted by the voice act as forced vibration on the glass. At resonance, the resulting vibration may be large enough in amplitude that the glass exceeds its elastic limit and breaks. First it was this Jaime Vendera glass-shattering vocal coach My dear parents, physics teacher NEVER told your student to try this. two tuning forks A structure such as bridge has natural frequency and can be set into resonance by an appropriate driving force. It has been reported that a railway train has collapsed because a nick in one of the wheels of a passing train set up a resonant vibration in the bridge. Marching soldiers break step when crossing the bridge to avoid the possibility of similar catastrophe. Resonant vibrations due to the wind turbulences that matched the natural frequency of the bridge destroyed Tacoma Narrows. yours – old one yours – new one mine Have you ever had a strange feeling while listening to loud music in a car (apart from that you are going deaf). Like something is shaking inside you. Some infrasound frequencies (the ones you can’t hear) can actually have the same frequency as natural frequency of some of yours internal organs. And yes, that’s what you are feeling. It’s shaking. How resonance works/ Energy • resonance is a way of pumping energy into a system to make it vibrate • in order to make it work the energy must be pumped in at a rate (frequency) that matches one of the natural frequencies that the system likes to vibrate at. • you pump energy into the child on the swing by pushing once per cycle • The result can be dramatic increase in amplitude that sometimes is very unfortunate Resonance curve - Forced frequency and amplitude What is of particular interest is when the forced frequency is close to and when it equals the natural frequency. We now look to see how the amplitude of an oscillating system varies with the frequency of the driving force (resonance curve). The graph shows the variation with frequency f of the driving force of the amplitude of three different systems to which the force is applied. The sharpness of the peak is affected by the amount of damping in the system. Each system has the same frequency of natural oscillation, f0 . They each have a different degree of damping. For the heavily damped system the amplitude stays very small but starts to increase as the frequency approaches f0 and reaches a maximum at f = f0; it then starts to fall away again with increasing frequency. For the medium damped system, as f approaches f0, the amplitude again starts to increase but at a greater rate than for the heavily damped system. The amplitude is again a maximum at f = f0 and is greater than that of the maximum of the heavily damped system. For the lightly damped system, again the amplitude starts to increase as f approaches f0, but at a very much greater rate than for the other two systems; the maximum value is also considerably larger and much more well-defined i.e. it is much easier to see that the maximum value is in fact at f = f0. Clearly this is when the amplitude is a maximum the system receives maximum energy input from the driver. The radio tuner When you tune your radio, you are adjusting an electric circuit so that it resonates with the signal of a particular frequency. If the resonance curve for the circuit were not sharp, you would be able to tune into the station over a wide range of frequencies,and would be likely to get interference from other stations. Spring/Tension force – Hooke’s law Holding one end and pulling the other produces a tension (spring) force in the spring. You’ll notice as you pull the spring, that the further you extend the spring, then the greater the force that you have to exert in order to extend it even further. As long as the spring is not streched beyond a certain extension, called elastic limit, the force is directly proportional to the extension. Beyond this point the proportionality is lost. If you stretch it more, the spring can become permanently deformed in such a way that when you stop pulling, the spring will not go back to its original length. Unstretched spring spring force 𝐹𝑎𝑝𝑝𝑙𝑖𝑒𝑑 Stretched spring Hooke’s Law: In the region of proportionality we can write 𝐹𝑠 = − 𝑘𝑥 L x x spring force Compressed spring 𝐹𝑠 𝐹𝑠 𝐹𝑎𝑝𝑝𝑙𝑖𝑒𝑑 𝐹𝑠 = 𝐹𝑜𝑟𝑐𝑒 𝑒𝑥𝑒𝑟𝑡𝑒𝑑 𝑏𝑦 𝑡ℎ𝑒 𝑠𝑝𝑟𝑖𝑛𝑔. 𝑆𝐼: 𝑁 𝑘 = 𝑆𝑝𝑟𝑖𝑛𝑔 𝑐𝑜𝑛𝑠𝑡𝑎𝑛𝑡. 𝑆𝐼: 𝑁/𝑚 k measures stiffness 𝑘 𝑙𝑎𝑟𝑔𝑒 ∙ 𝑠𝑡𝑖𝑓𝑓 𝑠𝑝𝑟𝑖𝑛𝑔 𝑘 𝑠𝑚𝑎𝑙𝑙 ∙ 𝑠𝑜𝑓𝑡 𝑠𝑝𝑟𝑖𝑛𝑔 𝑥 = 𝐷𝑖𝑠𝑝𝑙𝑎𝑐𝑒𝑚𝑒𝑛𝑡 𝑓𝑟𝑜𝑚 𝑒𝑞𝑢𝑖𝑙𝑖𝑏𝑟𝑖𝑢𝑚 𝑝𝑜𝑠𝑖𝑡𝑖𝑜𝑛. 𝑆𝐼: 𝑚 Graph of applied force vs. extension: slope is the spring constant k= F x Example: k = 20 N/m L = 10 cm How much force do you have to exert if you want to extend the spring for a. 1cm b. 2 cm c. 3 cm a. F = kx = (20 N/m)(0.01 m) = 0.2 N b. F = kx = (20 N/m)(0.02 m) = 0.4 N proportionality c. F = kx = (20 N/m)(0.03 m) = 0.6 N Note: The spring force has the same value, but it is in the opposite direction !!!!! Example: The graph shows how the length of a spring varies with applied force. i. State the value of the unstretched length of the spring. ii. Use data from the graph to plot another graph of force against extension and from this graph determine the spring constant. i. when the applied force is zero the length of the spring is 20 cm, therefore unstretched length is 20 cm. ii. F/N x/cm 5 6 10 12 k= F 5 10 = = = 0.83 N/cm = 83 N/m x 6 12 The work done by a non-constant applied force on a Hooke’s spring is found from the area under the graph F vs. x Work done by a force F = kx when extending a spring from extension x1 to x2 is: F – kx2 W kx1 x1 x2 extension Work done by a force F = kx when extending a spring from extension 0 to x is: W = ½ kx2 1 1 (kx2 x2 ) (kx1 x1 ) 2 2 1 W k ( x22 x12 ) 2 Energy, E In physics energy and work are very closed linked; in some senses they are the same thing. If an object has energy it can do a work. On the other hand the work done on an object is converted into energy. work done = change in energy W=∆E Elastic potential energy, EPE If some force stretches a spring by extension x, the work done by that force is ½ kx2. Since work is the transfer of energy, we say that the energy was transferred into the spring, and that work is now stored in stretched spring as elastic potential energy. EPE = ½ kx2 A spring can be stretched or compressed. The same mathematics holds for stretching as for compressing springs. Just imagine how much energy is stored in the springs of this scale. To continue with power point Click on the spring – it will take you where you left off