Mapoob sapling learning Measuring distances to high precision is a critical goal
ID: 1508554 • Letter: M
Question
Mapoob sapling learning Measuring distances to high precision is a critical goal in engineering. Numerous devices to exist to perform such measurements, with many involving laser lig uchn ureag uremenis, with many nvohvingineering Numerous devices to exist to perfom Shining light through a double slit will provide such a ruler i (1) the wavelength of the light beam and slit separation is known and (2) the distance the minima/maxima appearing on the screen can be measured. But this in itself requires a physical measurement of distance on the object, which may not be practical. In an effort to create a "laser-beam ruler" that does not require placing a physical ruler on the object, you mount a Nd: YAG laser inside a box so that the beam of the laser passes through two slits rigidly attached to the laser. Although 1064 nm is the principal wavelength of a Nd:YAG laser, the laser is also switchable to numerous secondary wavelengths, including 1052 nm, 1075 nm, 1113 nm, and 1319 nm IV IT object laser Turning on the laser, you shine the beam on an object located nearby and observe the interference pattern with a suitable infrared camera. By switching from a 1052 nm to a 1075 nm beam, you notice that you must move the laser 7.155 cm closer to the object to align the same order maxima and minima with their original locations on the object. How far was the laser originally from the object in meters?* (Assume the small-angle approximation applies.) Number InExplanation / Answer
Using Young's Double Slit Formula of y(bright) = Lm/d can solve this problem
For this problem, it must be realized that we are asked to find where y(bright) will be the same for two different wavelengths () and two differentscreen Distances (L). The order (m) and the slit distance (d) will remain the same.
The first wavelength of 1052 nm is a distance L away from the screen
The second wavelenght of 1075 nm is L - 7.155 cm away, or 7.155 cm closer
Since y(bright) for situation 1 must equal y(bright) for situation 2, you can set the equations equal to each other
1Lm/d = 2(L-7.155 X 10-2)m/d. The values of m and d will be the same on both sides of the equation and can be cancelled out leaving
(1052 X 10-9 L) = (1075 X 10-9) (L - 7.155X 10-2)
1052 X 10-9 L = 1075 X 10-9 L - 7.961 X 10-8
Solving for L provides...
7.961 X 10-8 = 2.3 X 10-8 L
so L = 3.46 m