MASSACHUSETTS INSTITUTE OF TECHNOLOGY Department of Physics 8.02 Spring 2005 Experiment 13: Interference and Diffraction OBJECTIVES 1. To explore the diffraction of light through a variety of apertures using a laser pointer. 2. To measure the wavelength of the laser light; the spacing between the tracks of an audio compact disk (CD); and the thickness of a human hair. WARNING! The beam of laser pointers is so concentrated that it can cause real damage to your retina if you look into the beam either directly or by reflection from a shiny object. USING THE SPREADSHEET The data analysis for this experiment should be done using the Excel spreadsheet exp13.xls; your data should be entered into the appropriate places in this spreadsheet and reproduced in the tear-off sheet. Until you enter your data into the indicated boxes (or cells) in the spreadsheet, some of the displayed results will be of little use (there will be “#DIV/0!” in some cells). INTRODUCTION AND PRELIMINARY OBSERVATIONS Single-Slit Diffraction When light passes through a small opening, secondary waves from different portions of the opening will generally travel different distances before hitting a wall or screen, so, although they were in phase at the slit, they will not be exactly in phase at the screen. Consequently, the brightness on the screen will vary from point to point. “Secondary waves” and Huygens’s Principle are discussed in the 8.02 Course Notes, Section 14.4, and the variation of intensity with position on a screen is discussed in Section 14.5. Place the 35-mm slide containing four single slits with different widths in front of the laser pointer. The widths of the slits are printed on the slide, and reproduced in Table 1. You will note that one side of the slide has attached magnets, and you might want to use these to attach the slide to the metal bracket in front of the aperture. This will mean that the printed widths will not be readable, but this is not important. −3Note that Table 1 below gives the widths in microns, µm , where 1 µm = 10-6 m = 10 mm . E13-1Table 1 Single Slits Pattern A B C D Slit Width a (µm ) 20 40 80 160 Shine the laser pointer through the slide and examine the patterns produced on a white card held some distance from the slide. Notice how the intensity (brightness) of the pattern fades with distance from the center. The dark spots are labeled by their order m, with m starting at 1 on each side of the center; these are the “first-order minima”. The maxima are similarly labeled. Notice that the center of the pattern, referred to as the “zeroth-order” maximum, is always bright. Question 1 (answer on your tear-off sheet at the end): Why is the center of the pattern always bright? Figure 1 Single-slit diffraction E13-2EXPERIMENT Part 1: Laser Wavelength Fasten a card (preferably without a hole in it) with the clips across the wooden slide. Then place the slide in its slot in the block on your optical bench, and shine the pointer through one of the slits (Figure 2). Figure 2 Optical Bench Slide the block to a distance D of at least 30 cm from the laser. (Use a larger distance if it is dark enough at your table to still see the patterns.) Measure the distance D from the center of the card to the slit. For each pattern A-D in turn, carefully put marks on the card at the positions of the pair of first order minima and measure the distance ∆y(as indicated in Figure 1) between them. Enter your results, including the distance D, in the indicated places in the Excel Spreadsheet, and in the table in the tearoff sheet. The angle θ from the center of the slit to a minimum of order m (see Figure 1) is given by a sin θ= mλ (13.1) where a is the width of the slit. The angle θ is related to D and ∆y by tan θ= ∆y . (13.2)2D (See the 8.02 Course Notes, Section 14.5, but note that in the Course Notes, L is used instead of D for the distance to the screen.) E13-3The spreadsheet contains the needed calculations, both trigonometric and algebraic, needed to convert your measured values of ∆y to a wavelength. The wavelength is given in nanometers, -6 -3nm, 1nm = 10-9 m = 10 mm = 10 µm . Optical wavelengths are conventionally given in nanometers. Part 2: Thickness of Human Hair What would happen if you replaced the slit (which blocks much of the laser beam except for a narrow open strip), with a thin wire or human hair (which blocks little of the laser beam except for a narrow opaque strip – just the reverse of a slit)? Figure 3 Hair diffraction To find out, tape a short piece of hair (vertically, as indicated), donated by a group member, across the hole in the wooden slide and place the slide in its slot (see Figure 3). Tape a card to the far end of the optical bench. Shine the laser at the hair and observe the pattern. Surprised? (The fact that the pattern is virtually identical to that of a single slit is an example of a general rule called Babinet’s principle.) Measurement 2: Mark the location of the two first-order minima on the card. Then measure the distance ∆y between these minima and measure the distance D between the card and the hair. Using the wavelength of the laser you just calculated, compute the diameter of the hair. Enter your measurements in the indicated places in the spreadsheet, and record your results in the tearoff sheet. Part 3: Double-Slit Interference Table 2 Double Slits Pattern A B C D Slit Width a (µm ) 40 40 80 80 Separation d (µm ) 250 500 250 500 E13-4Now place the slide containing the pairs of slits on the apparatus, in a similar manner to that used for the single-slit slide, and observe the patterns produced. Notice the appearance of closely (and uniformly spaced) fringes. The fringes as a whole vary in intensity in much the same way that the single-slit patterns did. This is most apparent when you compare the difference between patterns A and C (or B and D), which have the same distance d between the slits but different slit widths. (The slit parameters are reproduced in Table 2 above.) Wavelength Check The width ∆y of these fringes, that is, the distance between adjacent minima is approximately Dλ y∆≈ (13.3)d where D is the slit-to-screen distance, and d is the separation between slits. (This is accurate as ylong as ∆<<D .) Measurement 3: Measure the width of a group of fringes produced by Pattern A of slits, compute the average width of one fringe (the spreadsheet will
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