Consider a single-slit diffraction pattern. The center of the central maximum, where the intensity is I0, is located at ? = 0.
(a) Let ?+ and ?_ be the two angles on either side of ? = 0 for which I = ?1 I0. ?? = | ?+ â ?_| is called the full width at half maximum, or FWHM, of the central diffraction maximum. Solve for ?? when the ratio between alit width a and wavelength ? is (i) a/?. = 2; (ii) a/? = 5; (iii) a/ ? = 10.
(b) The width of the central maximum can alternatively be defined as 2?0, where ?0 is the angle that locates the minimum on one side of the central maximum. Calculate 2?0 for each case considered in part (a) and compare to ?.
(a) Let ?+ and ?_ be the two angles on either side of ? = 0 for which I = ?1 I0. ?? = | ?+ â ?_| is called the full width at half maximum, or FWHM, of the central diffraction maximum. Solve for ?? when the ratio between alit width a and wavelength ? is (i) a/?. = 2; (ii) a/? = 5; (iii) a/ ? = 10.
(b) The width of the central maximum can alternatively be defined as 2?0, where ?0 is the angle that locates the minimum on one side of the central maximum. Calculate 2?0 for each case considered in part (a) and compare to ?.
