Download
1 / 56
570 likes | 577 Views
Waves – Chapter 14. Transverse Wave Pulse. A wave is a disturbance that propagates from one place to another. The easiest type of wave to visualize is a transverse wave, where the displacement of the medium is perpendicular to the direction of motion of the wave.
E N D
Transverse Wave Pulse A wave is a disturbance that propagates from one place to another. The easiest type of wave to visualize is a transverse wave, where the displacement of the medium is perpendicular to the direction of motion of the wave. Very cool explanations and animations (Dan Russel, Kettering): http://paws.kettering.edu/~drussell/demos.html
Transverse Harmonic Wave Time = 0 Time = T
Transverse Harmonic Wave Wavelength λ: distance over which wave repeats Period T: time for one wavelength to pass a given point Frequency f: Speed v :
a wiggle, in space Each point in SHM Together: a wiggle moving with time Harmonic Wave Functions Since the wave has the same pattern at x + λas it does at x, at any moment in time the wave must be of the form: Since the wave has the same pattern at t=0 as it does at t=T, at fixed position the wave must also be of the form: Together, the wave equation:
Harmonic Wave Functions at fixed x, y travels in simple harmonic motion with period T at fixed t, changes with x with wavelength λ This implies that the position of the peak changes with time as:
t t + Δt Out to Sea a)1 second b) 2 seconds c) 4 seconds d) 8 seconds e) 16 seconds A boat is moored in a fixed location, and waves make it move up and down. If the spacing between wave crests is 20 m and the speed of the waves is 5 m/s, how long does it take the boat to go from the top of a crest to the bottom of a trough ?
t t + Δt Out to Sea a)1 second b) 2 seconds c) 4 seconds d) 8 seconds e) 16 seconds A boat is moored in a fixed location, and waves make it move up and down. If the spacing between wave crests is 20 m and the speed of the waves is 5 m/s, how long does it take the boat to go from the top of a crest to the bottom of a trough ? We know thatv = f λ = λ / T, hence T = λ / v. Ifλ = 20 mandv = 5 m/s, thenT = 4 secs. The time to go from a crest to a trough is onlyT/2 (half aperiod), so it takes2 secs!!
Types of Waves In a longitudinal wave, the displacement is along the direction of wave motion.
Sound Waves Sound waves are longitudinal waves, similar to the waves on a Slinky: Here, the wave is a series of compressions and stretches.
Speed of Wave on a String The speed of a wave is determined by the properties of the material through which is propagates • For a string, the wave speed is determined by: • the tension in the string, and • the mass per unit length of the string. As the tension in the string increases, the speed of waves on the string increases. A larger mass per unit length results in a slower wave speed.
Speed of Wave on a String speed of a wave on a string: The speed increases when the tension increases, and when the mass per length decreases.
Wave Reflection When a wave reaches the end of a string, it will be reflected. If the end is fixed, the reflected wave will be inverted. If the end of the string is free to move transversely, the wave will be reflected without inversion.
Waves of any shape can be decomposed into harmonic waves with different frequencies. In mathematics this is called Fourier decomposition. So once you understand harmonic waves, you can analyze any wave.
Sound Waves In a sound wave, the density and pressure of the air (or other medium carrying the sound) are the quantities that oscillate.
Speed of Sound The speed of sound is different in different materials; in general, the stiffer a material is, the faster sound travels through it... the denser a material, the slower sound travels through it.
Sound Waves “Sound waves” generally means mechanical compression waves, and can have any frequency. The human ear can hear sound between about 20 Hz and 20,000 Hz. Sounds with frequencies greater than 20,000 Hz are called ultrasonic; sounds with frequencies less than 20 Hz are called infrasonic. Ultrasonic waves are familiar from medical applications; elephants and whales communicate, in part, by infrasonic waves.
Sound Bite I a)the frequency f b) the wavelength c) the speed of the wave d) both f and e) both vwave and When a sound wave passes from air into water, what properties of the wave will change?
Wave speed must change (different medium). Frequency does not change (determined by the source). Now,v = fand becausevhas changed andfisconstant then must also change. Sound Bite I a)the frequency f b) the wavelength c) the speed of the wave d) both f and e) both vwave and When a sound wave passes from air into water, what properties of the wave will change? Follow-up: Does the wave speed increase or decrease in water?
Sound Intensity The intensity of a sound is the amount of energy that passes through a given area in a given time.
Sound Intensity II a)about the same distance b) about 3 miles c) about 10 miles d) about 30 miles e) about 100 miles You hear a fire truck with a certain intensity, and you are about 1 mile away. Another person hears the same fire truck with an intensity that is about 10 times less. Roughly, how far is the other person from the fire truck?
Sound Intensity II a)about the same distance b) about 3 miles c) about 10 miles d) about 30 miles e) about 100 miles You hear a fire truck with a certain intensity, and you are about 1 mile away. Another person hears the same fire truck with an intensity that is about 10 times less. Roughly, how far is the other person from the fire truck? Remember that intensity drops with theinverse square of the distance, so if intensity drops by a factor of 10, the other person must be ~10 farther away, which is about a factor of 3.
The Doppler Effect The Doppler effect is the change in pitch of a sound when the source and observer are moving with respect to each other. When an observer moves toward a source, the wave speed appears to be higher. Since the wavelength is fixed, the frequency appears to be higher as well.
The distance between peaks is the wavelength The Doppler Effect, moving Observer (stationary) (moving) The time between peaks is: Since the distance between peaks is the same: The new observed frequency f’ is: If the observer were moving away from the source, only the sign of the observer’s speed would change
The Doppler Effect, moving Source The Doppler effect from a moving source can be analyzed similarly. Now it is the wavelength that appears to change: In one period, how far does the wave move? So how far apart are the peaks?
The Doppler Effect, moving Source Given the speed of sound, this new wavelength corresponds to a specific frequency: minus for source moving toward observer plus for source moving away from observer
The Doppler Effect These results can be combined for the case where both observer and source are moving:
The Doppler Effect The Doppler shift for a moving source compared to that for for a moving observer. The two are similar for low speeds but then diverge. If the source moves faster then the speed of sound, a sonic boom is created. What if the observer is moving away at the speed of sound? What if the source is moving away at the speed of sound?
Under the right conditions, the shock wavefront as a jet goes supersonic will condense water vapor and become visible
Doppler effect can measure velocity. Doppler radar showing the “hook echo” characteristic of tornado formation. Doppler blood flow meter
Here a Doppler ultrasound measurement is used to verify sufficient umbilical blood flow in early pregnancy
Doppler Effect You are heading toward an island in a speedboat and you see your friend standing on the shore, at the base of a cliff. You sound the boat’s horn to alert your friend of your arrival. If the horn has a rest frequency of f0, what frequency does your friend hear ? a) lower than f0 b) equal to f0 c) higher than f0
Doppler Effect You are heading toward an island in a speedboat and you see your friend standing on the shore, at the base of a cliff. You sound the boat’s horn to alert your friend of your arrival. If the horn has a rest frequency of f0, what frequency does your friend hear ? a) lower than f0 b) equal to f0 c) higher than f0 Due to theapproach of the sourcetoward the stationaryobserver, thefrequency is shifted higher.
Doppler Effect In the previous question, the horn had a rest frequency of f0, and we found that your friend heard a higher frequency f1 due to the Doppler shift. The sound from the boat hits the cliff behind your friend and returns to you as an echo. What is the frequency of the echo that you hear? a) lower than f0 b) equal to f0 c) higher than f0 but lower than f1 d) equal to f1 e) higher than f1
Doppler Effect In the previous question, the horn had a rest frequency of f0, and we found that your friend heard a higher frequency f1 due to the Doppler shift. The sound from the boat hits the cliff behind your friend and returns to you as an echo. What is the frequency of the echo that you hear? a) lower than f0 b) equal to f0 c) higher than f0 but lower than f1 d) equal to f1 e) higher than f1 The sound wave bouncing off the cliff has the same frequency f1 as the one hitting the cliff (what your friend hears). For the echo,you are now a moving observer approaching the sound waveof frequency f1 so you will hear aneven higher frequency.
Superposition and Interference Waves of small amplitude traveling through the same medium combine, or superpose, by simple addition. If two pulses combine to give a larger pulse, this is constructive interference (left). If they combine to give a smaller pulse, this is destructive interference (right). constructive destructive
constructive destructive Two waves with distance to the source different by whole integer wavelengths Nλ Two waves with distance to the source different by half-integer wavelengths Nλ
Two-dimensional waves exhibit interference as well. This is an example of an interference pattern. A: Constructive B: Destructive
Superposition and Interference If the sources are in phase, points where the distance to the sources differs by an equal number of wavelengths will interfere constructively; in between the interference will be destructive.
Constructive: l = n : , 2 , 3 .... Destructive: l = (n+1/2) : /2, 3 /2, 5 /2...
L A B Interference Speakers A and B emit sound waves of = 1 m, which interfere constructively at a donkey located far away (say, 200 m). What happens to the sound intensity if speaker A is moved back 2.5 m? a)intensity increases b) intensity stays the same c) intensity goes to zero d) impossible to tell
L A B Interference a)intensity increases b) intensity stays the same c) intensity goes to zero d) impossible to tell Speakers A and B emit sound waves of = 1 m, which interfere constructively at a donkey located far away (say, 200 m). What happens to the sound intensity if speaker A is moved back 2.5 m? If= 1 m, then a shift of2.5 mcorresponds to2.5 , which puts the two wavesout of phase, leading todestructive interference. The sound intensity will therefore go to zero. Follow-up: What if you move speaker A back by 4 m?
Standing Waves A standing wave is fixed in location, but oscillates with time. These waves are found on strings with both ends fixed, or vibrating columns of air, such as in a musical instrument. The fundamental, or lowest, frequency on a fixed string has a wavelengthtwice the length of the string. Higher frequencies are called harmonics.
First Harmonic Second Harmonic Third Harmonic Standing Waves on a String Points on the string which never move are called nodes; those which have the maximum movement are called antinodes. There must be an integral number of half-wavelengths on the string (must have nodes at the fixed ends). This means that only certain frequencies (for fixed tension, mass density, and length) are possible.
First Harmonic Second Harmonic Third Harmonic
Musical Strings Musical instruments are usually designed so that the variation in tension between the different strings is small; this helps prevent warping and other damage. A guitar has strings that are all the same length, but the density varies. In a piano, the strings vary in both length and density. This gives the sound box of a grand piano its characteristic shape.
a b Standing Waves I a)is zero everywhere b) is positive everywhere c) is negative everywhere d) depends on the position along the string A string is clamped at both ends and plucked so it vibrates in a standing mode between two extreme positions a and b. Let upward motion correspond to positive velocities. When the string is in position b, the instantaneous velocity of points on the string:
Standing Waves I a)is zero everywhere b) is positive everywhere c) is negative everywhere d) depends on the position along the string A string is clamped at both ends and plucked so it vibrates in a standing mode between two extreme positions a and b. Let upward motion correspond to positive velocities. When the string is in position b, the instantaneous velocity of points on the string: • Observe two points: • Just before b • Just after b Both points change direction before and after b, so at b all points must have zero velocity. Every point in in SHM, with the amplitude fixed for each position
Standing Waves in Air Tubes Standing waves can also be excited in columns of air, such as soda bottles, woodwind instruments, or organ pipes. A sealed end must be at a NODE (N), an open end must be an ANTINODE (A).
