Copyright © Michael Richmond.
This work is licensed under a Creative Commons License.
Physics 312 Lecture: "Diffraction."
Apr 27, 1998
- When light passes through a single narrow slit or aperture,
it may interfere with itself
- The type of interference depends on the angle away from
the center of the slit; the general formula is
a sin(theta) = m lambda destructive interference
where "a" is the width of the slit, and "m" an integer 1, 2, 3 ...
- A single slit produces a central bright maximum, with much fainter
maxima to each side
- Any lens or eyeball of finite size is limited in its ability to
resolve fine detail by diffraction; the limiting angle
of a slit of width "a" is
theta = lambda / a
- For a circular aperture of diameter D, the limiting resolution is
theta = 1.22 lambda / D
- A mask with many, many slits equally spaced is called a
diffraction grating
- A diffraction grating produces many narrow bands of nearly equal
brightness; bright spots occur at any angle for which
d sin(theta) = m lambda m = 1, 2, 3, ...
where "d" is the spacing of the slits
- Light of different wavelengths will produce bright spots at different
angles after passing through a diffraction grating;
the grating creates a rainbow spectrum
- The resolving power of a diffraction grating is a measure
of its ability to separate light of nearly equal wavelengths;
it is equal to the number of slits times the order of the
spectrum
This lecture discusses material in Chapter 38 of Serway.
Copyright © Michael Richmond.
This work is licensed under a Creative Commons License.
