![]() If two identical waves that arrive exactly out of phase-that is, precisely aligned crest to trough-they may produce pure destructive interference. Because the disturbances add, constructive interference may produce a wave that has twice the amplitude of the individual waves, but has the same wavelength.Ĭonstructive Interference: Pure constructive interference of two identical waves produces one with twice the amplitude, but the same wavelength. This superposition produces pure constructive interference. When two identical waves arrive at the same point exactly in phase the crests of the two waves are precisely aligned, as are the troughs. Wave Interference: A brief introduction to constructive and destructive wave interference and the principle of superposition. Interference is an effect caused by two or more waves. \]Īs a result of superposition of waves, interference can be observed. Textbook content produced by OpenStax is licensed under a Creative Commons Attribution License. Use the information below to generate a citation. Then you must include on every digital page view the following attribution: If you are redistributing all or part of this book in a digital format, Then you must include on every physical page the following attribution: If you are redistributing all or part of this book in a print format, Want to cite, share, or modify this book? This book uses the This book may not be used in the training of large language models or otherwise be ingested into large language models or generative AI offerings without OpenStax's permission. In addition, we will see that Huygens’s principle tells us how and where light rays interfere. It is useful not only in describing how light waves propagate but also in explaining the laws of reflection and refraction. Huygens’s principle works for all types of waves, including water waves, sound waves, and light waves. The new wave front is a plane tangent to the wavelets and is where we would expect the wave to be a time t later. We can draw these wavelets at a time t later, so that they have moved a distance s = v t. Each point on the wave front emits a semicircular wave that moves at the propagation speed v. A wave front is the long edge that moves, for example, with the crest or the trough. The new wave front is tangent to all of the wavelets.įigure 1.26 shows how Huygens’s principle is applied. Starting from some known position, Huygens’s principle states that every point on a wave front is a source of wavelets that spread out in the forward direction at the same speed as the wave itself. The Dutch scientist Christiaan Huygens (1629–1695) developed a useful technique for determining in detail how and where waves propagate. The direction of propagation is perpendicular to the wave fronts (or wave crests) and is represented by a ray. The view from above is perhaps more useful in developing concepts about wave optics.įigure 1.25 A transverse wave, such as an electromagnetic light wave, as viewed from above and from the side. ![]() ![]() The side view would be a graph of the electric or magnetic field. From above, we view the wave fronts (or wave crests) as if we were looking down on ocean waves. ![]() A light wave can be imagined to propagate like this, although we do not actually see it wiggling through space. When sound strikes a hard, non-porous obstacle, it may be reflected or diffracted, depending on the size of the obstacle relative to the wavelength. Huygens’s principle is an indispensable tool for this analysis.įigure 1.25 shows how a transverse wave looks as viewed from above and from the side. Diffraction of Sound Diffraction refers to the bending of sound waves as they move around obstacles. This is particularly true when the wavelength is not negligible compared to the dimensions of an optical device, such as a slit in the case of diffraction. However, some phenomena require analysis and explanations based on the wave characteristics of light. So far in this chapter, we have been discussing optical phenomena using the ray model of light. ![]() Use Huygens’s principle to explain diffraction.Use Huygens’s principle to explain the law of refraction.Use Huygens’s principle to explain the law of reflection.By the end of this section, you will be able to: ![]()
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