Textbook content produced by OpenStax is licensed under a Creative Commons Attribution License. We recommend using aĪuthors: Paul Peter Urone, Roger Hinrichs 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. As seen in the figure, the difference in path length for rays from either side of the slit is D sin θ D sin θ, and we see that a destructive minimum is obtained when this distance is an integral multiple of the wavelength. Finally, in Figure 27.22(d), the angle shown is large enough to produce a second minimum. However, all rays do not interfere constructively for this situation, and so the maximum is not as intense as the central maximum. Most rays from the slit will have another to interfere with constructively, and a maximum in intensity will occur at this angle. ![]() Two rays, each from slightly above those two, will also add constructively. One ray travels a distance λ λ different from the ray from the bottom and arrives in phase, interfering constructively. The difference in path length for rays from either side of the slit is seen to be D sin θ D sin θ.Īt the larger angle shown in Figure 27.22(c), the path lengths differ by 3λ / 2 3λ / 2 for rays from the top and bottom of the slit. There will be another minimum at the same angle to the right of the incident direction of the light.įigure 27.22 Light passing through a single slit is diffracted in all directions and may interfere constructively or destructively, depending on the angle. In fact, each ray from the slit will have another to interfere destructively, and a minimum in intensity will occur at this angle. A ray from slightly above the center and one from slightly above the bottom will also cancel one another. Thus a ray from the center travels a distance λ / 2 λ / 2 farther than the one on the left, arrives out of phase, and interferes destructively. In Figure 27.22(b), the ray from the bottom travels a distance of one wavelength λ λ farther than the ray from the top. However, when rays travel at an angle θ θ relative to the original direction of the beam, each travels a different distance to a common location, and they can arrive in or out of phase. When they travel straight ahead, as in Figure 27.22(a), they remain in phase, and a central maximum is obtained. (Each ray is perpendicular to the wavefront of a wavelet.) Assuming the screen is very far away compared with the size of the slit, rays heading toward a common destination are nearly parallel. These are like rays that start out in phase and head in all directions. According to Huygens’s principle, every part of the wavefront in the slit emits wavelets. Here we consider light coming from different parts of the same slit. ![]() The analysis of single slit diffraction is illustrated in Figure 27.22. (b) The drawing shows the bright central maximum and dimmer and thinner maxima on either side. The central maximum is six times higher than shown. Monochromatic light passing through a single slit has a central maximum and many smaller and dimmer maxima on either side. Figure 27.21 (a) Single slit diffraction pattern.
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