Mathematical analysis of the diffraction patterns produced by a circular aperture is described by the diffraction equation: sinθ(1) = 1.22(λ/d) Circular apertures produce diffraction patterns similar to those described above, except the pattern naturally exhibits a circular symmetry. However, all optical instruments have circular apertures, for example the pupil of an eye or the circular diaphragm and lenses of a microscope. Our discussions of diffraction have used a slit as the aperture through which light is diffracted. The wave-like nature of light forces an ultimate limit to the resolving power of all optical instruments. This is often determined by the quality of the lenses and mirrors in the instrument as well as the properties of the surrounding medium (usually air). The resolving power is the optical instrument’s ability to produce separate images of two adjacent points. This diffraction element leads to a phenomenon known as Cellini’s halo (also known as the Heiligenschein effect) where a bright ring of light surrounds the shadow of the observer’s head.ĭiffraction of light plays a paramount role in limiting the resolving power of any optical instrument (for example: cameras, binoculars, telescopes, microscopes, and the eye). This last interaction with the interface refracts the light back into the atmosphere, but it also diffracts a portion of the light as illustrated below. The beam, still traveling inside the water droplet, is once again refracted as it strikes the interface for a third time. As a light wave traveling through the atmosphere encounters a droplet of water, as illustrated below, it is first refracted at the water-to-air interface, then it is reflected as it again encounters the interface. The amount of diffraction depends on the wavelength of light, with longer wavelengths being diffracted at a greater angle than shorter ones (in effect, red light are diffracted at a higher angle than is blue and violet light). We can often observe pastel shades of blue, pink, purple, and green in clouds that are generated when light is diffracted from water droplets in the clouds. A good example of this is the diffraction of sunlight by clouds that we often refer to as a silver lining, illustrated in Figure 1 with a beautiful sunset over the ocean. This phenomenon can also occur when light is “bent” around particles that are on the same order of magnitude as the wavelength of the light. The parallel lines are actually diffraction patterns. As the fingers approach each other and come very close together, you begin to see a series of dark lines parallel to the fingers. This makes the diffraction grating like a "super prism".A very simple demonstration of diffraction of waves can be conducted by holding your hand in front of a light source and slowly closing two fingers while observing the light transmitted between them. Since the positions of the peaks depends upon the wavelength of the light, this gives high resolution in the separation of wavelengths. This gives very narrow and very high intensity peaks that are separated widely. This progresses toward the diffraction grating, with a large number of extremely narrow slits. The progression to a larger number of slits shows a pattern of narrowing the high intensity peaks and a relative increase in their peak intensity. The multiple slit interference typically involves smaller spatial dimensions, and therefore produces light and dark bands superimposed upon the single slit diffraction pattern. The multiple slit arrangement is presumed to be constructed from a number of identical slits, each of which provides light distributed according to the single slit diffraction expression. Under the Fraunhofer conditions, the light curve (intensity vs position) is obtained by multiplying the multiple slit interference expression times the single slit diffraction expression. The shape or "envelope" of this light curve will serve to set limiting intensities for multiple slit arrangements, assuming that all the slits are identical. The narrower the slit, the broader the peaks of light. Under the Fraunhofer conditions, a single slit will exhibit a light curve following the single slit diffraction intensity expression. Multiple Slit Diffraction Single Slit Diffraction
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