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Physics Section 12.3 Apply the properties of sound resonance Recall: A standing wave is the result of the superposition of a wave and its reflection from.

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Presentation on theme: "Physics Section 12.3 Apply the properties of sound resonance Recall: A standing wave is the result of the superposition of a wave and its reflection from."— Presentation transcript:

1 Physics Section 12.3 Apply the properties of sound resonance Recall: A standing wave is the result of the superposition of a wave and its reflection from a fixed termination.

2 A taut string can vibrate many different ways. When a string vibrates as a whole, it vibrates at its fundamental frequency. The length of the string is ½ the wavelength. Harmonics are whole number multiples of the fundamental frequency.

3 Examples of harmonic frequencies: fundamental (1 st )harmonic 100 Hz 2 nd harmonic200 Hz 3 rd harmonic300 Hz 4 th harmonic400 Hz Harmonic frequencies generated by a string f n = n v_ n = harmonic number 2L v = speed of wave on string (m/s) L = length of string (m) f n = frequency of the harmonic (Hz)

4 example What is the fundamental frequency of a string that is.50 m long when the wave travels at a speed of 65 m/s? What is the frequency of the 6 th harmonic?

5 Standing waves can be created in a column of air in a tube. There are two types of air columns. Harmonic frequencies generated by an open tube f n = n v_ n = harmonic number 2L v = speed of wave in air (m/s) L = length of open tube (m) f n = frequency of the harmonic (Hz)

6 example The speed of sound in an open tube is 340 m/s. The length of the tube is.40 m. Find the frequencies of the 1 st three harmonics.

7 Closed tube harmonics Harmonic frequencies generated by an closed tube f n = n v_ n = harmonic number 4L v = speed of wave in air (m/s) L = length of closed tube (m) f n = frequency of the harmonic (Hz)

8 examples Find the length of a closed tube whose 3 rd harmonic is 1200 Hz when the sound speed is 340 m/s. At what lengths will a sound with a frequency of 512 Hz resonate?

9 The number and mixture of harmonics present in a sound is referred to as the spectrum of the sound. The listener detects harmonics as the quality or timbre of the sound. Recall: frequency determines the pitch of a sound…musical scales consist of 12 notes, each at a given frequency. The frequency of the 13 th note is double the frequency of the 1 st note. Frequency A 100 Hz Frequency B 200 Hz (one octave higher than A) Frequency C400 Hz (two octaves higher than A) Frequency D800 Hz (three octaves higher than A) A sound with a frequency that is twice another sound is one octave higher in frequency.

10 An other feature of superposed waves is called beats. Consider two waves of slightly different frequencies superposed. Beats are the periodic variation in the amplitude of a wave that is the superposition of two waves with slightly different frequencies. The number of beats per second is equal to the difference between the frequencies.

11 example Two waves of frequencies 8 Hz and 10 Hz are superposed. Find the number of beats per second.

12 An oscilloscope is a device that can be used to analyze any electrical output. If a microphone is attached to an oscilloscope, sound waves can be analyzed. The Oscilloscope What is an oscilloscope, what can you do with it, and how does it work? This section answers these fundamental questions. The oscilloscope is basically a graph-displaying device - it draws a graph of an electrical signal. In most applications the graph shows how signals change over time: the vertical (Y) axis represents voltage and the horizontal (X) axis represents time. The intensity or brightness of the display is sometimes called the Z axis. (See Figure 1.) This simple graph can tell you many things about a signal. Here are a few: You can determine the time and voltage values of a signal. You can calculate the frequency of an oscillating signal. You can see the "moving parts" of a circuit represented by the signal. You can tell if a malfunctioning component is distorting the signal. You can find out how much of a signal is direct current (DC) or alternating current (AC). You can tell how much of the signal is noise and whether the noise is changing with time.

13 What Can You Do With It? Oscilloscopes are used by everyone from television repair technicians to physicists. They are indispensable for anyone designing or repairing electronic equipment. The usefulness of an oscilloscope is not limited to the world of electronics. With the proper transducer, an oscilloscope can measure all kinds of phenomena. A transducer is a device that creates an electrical signal in response to physical stimuli, such as sound, mechanical stress, pressure, light, or heat. For example, a microphone is a transducer. An automotive engineer uses an oscilloscope to measure engine vibrations. A medical researcher uses an oscilloscope to measure brain waves. The possibilities are endless.

14 How does an oscilloscope work? An outline explanation of how an oscilloscope works can be given using the block diagram shown below: Like a televison screen, the screen of an oscilloscope consists of a cathode ray tube. Although the size and shape are different, the operating principle is the same. Inside the tube is a vacuum. The electron beam emitted by the heated cathode at the rear end of the tube is accelerated and focused by one or more anodes, and strikes the front of the tube, producing a bright spot on the phosphorescent screen. The electron beam is bent, or deflected, by voltages applied to two sets of plates fixed in the tube. The horizontal deflection plates, or X-plates produce side to side movement. As you can see, they are linked to a system block called the time base. This produces a sawtooth waveform. During the rising phase of the sawtooth, the spot is driven at a uniform rate from left to right across the front of the screen. During the falling phase, the electron beam returns rapidly from right ot left, but the spot is 'blanked out' so that nothing appears on the screen.time base In this way, the time base generates the X-axis of the V/t graph

15 assignment Page 431 Problems 1 - 5


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