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Some general p roperties of waves. Summing waves. The wave equation is linear A sum of waves will be the arithmetical sum of the function representing them – and still a solution of the wave equation , but warning : energy is proportional to the square of the amplitude !.
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Summingwaves • The waveequationislinear • A sum ofwaveswillbe the arithmetical sum of the functionrepresentingthem– and still a solutionof the waveequation, butwarning: energyisproportionalto the squareof the amplitude!
Some very basic physics of stringed instruments………. 2f1 3f1 4f1
The fundamental frequency determines the pitch of the note. the higher harmonics determine the “colour” or “timbre” of the note. (ie why different instruments sound different)
Fundamental wavelength = 2L From v = fλ, f1= v/2L So, for a string of fixed length, the pitch is determined by the wave velocity on the string….. The string length on standard violin is 325mm. What tension is required to tune a steel “A” string (diameter =0.5mm) to correct pitch (f=440Hz)? Density of steel = 8g cm
Changing the “harmonic content” Plucking a string at a certain point produces a triangular waveform, that can be built up from the fundamental plus the higher harmonics in varying proportions. Plucking the string in a different place (or even in a different way) gives a different waveform and therefore different contributions from higher harmonics (see Fourier analysis) This makes the sound different, even though pitch is the same………………… string plucked here
Doppler Effect • The Doppler effect is the apparent change in the frequency of a wave motion when there is relative motion between the source of the waves and the observer. • The apparent change in frequency f experienced as a result of the Doppler effect is known as the Doppler shift. • The value of the Doppler shift increases as the relative velocity v between the source and the observer increases. • The Doppler effect applies to all forms of waves.
Doppler Effect (moving source) Suppose the source moves at a steady velocity vs towards a stationary observer. The source emits sound wave with frequency f. From the diagram, we can see that the distance between crests is shortened such that Since = c/fand = 1/f, we get vs
Doppler Effect (moving observer) c Consider an observer moving with velocityvo toward a stationary source S. The source emits a sound wave with frequencyfand wavelength = c/f. The velocity of the sound wave relative to the observer is c + vo.
Doppler Shift • Consider a source moving towards an • observer, the Doppler shift fis • If vs<<c, then we get • The above equation also applies to a receding source, with vs taking as negative • The same equation applies for the moving observer (note the limit vs<<c)
Applications of Doppler Effect (Astronomy) • The velocities of distant galaxies can be determined from • the Doppler shift ( The apparent change in frequency). • Light from such galaxies is shifted toward lower frequencies, • indicating that the galaxies are moving away from us. • This is called the red shift. Red shift Blue shift
Hubble’s Law • Hubble found that (almost) every galaxy was moving away from us. • Moreover, the further away it was, the faster it was moving away from us. This line can be described by an equation which relates the distance to a galaxy to the recession velocity – Hubble's Law. • This is a plot of some galaxies. • The x axis is the distance to the galaxy • The y axis is the speed at which the • galaxy is moving away from us
Huygens’ Principle (conjectured in 1600) • All points on a given wave front can be taken as point sources for the production of spherical secondary waves, called wavelets, which propagate in the forward direction with speeds characteristic of waves in that medium • After some time has elapsed, the new position of the wave front is the surface tangent to the wavelets • Demonstrated by Kirkhhoff in 1882, but Huygens was missing two points: • Amplitude varies as f(θ) ~ (1+cosθ)/2 • Phase is anticipated by π/2 In many problems these two points can be neglected
Huygen’s Construction for a Plane Wave • At t = 0, the wave front is indicated by the plane AA’ • The points are representative sources for the wavelets • After the wavelets have moved a distance cΔt, a new plane BB’ can be drawn tangent to the wavefronts
Huygen’s Construction for a Spherical Wave • The inner arc represents part of the spherical wave • The points are representative points where wavelets are propagated • The new wavefront is tangent at each point to the wavelet
Huygen’s Principle and the Law of Reflection • The Law of Reflection can be derived from Huygen’s Principle • AA’ is a wave front of incident light • The reflected wave front is CD
Triangle ADC is congruent to triangle AA’C • θ1 = θ1’ • This is the Law of Reflection
Huygen’s Principle and the Law of Refraction • In time Δt, ray 1 moves from A to B and ray 2 moves from A’ to C • From triangles AA’C and ACB, all the ratios in the Law of Refraction can be found • n1 sin θ1 = n2 sin θ2
Total Internal Reflection • Total internal reflection can occur when light attempts to move from a medium with a high index of refraction to one with a lower index of refraction • Ray 5 shows internal reflection • A particular angle of incidence will result in an angle of refraction of 90° • This angle of incidence is called the critical angle • For angles of incidence greater than the critical angle, the beam is entirely reflected at the boundary • This ray obeys the Law of Reflection at the boundary
Optical fibers • An application of internal reflection • Plastic or glass rods are used to “pipe” light from one place to another • Applications include • medical use of fiber optic cables for diagnosis and correction of medical problems • Telecommunications
Frequency Between Media • As light travels from one medium to another, its frequency does not change • Both the wave speed and the wavelength do change • The wavefronts do not pile up, nor are created or destroyed at the boundary, so ƒ must stay the same
