You find an unlabeled box of fine needles, and want to determine how thick they

ID: 582891 • Letter: Y

Question

You find an unlabeled box of fine needles, and want to determine how thick they are. A standard ruler won't do the job, since all you can tell is that each needle is less than a millimeter thick. So to find the thickness, you use the needle to poke a hole in a piece of brown construction paper. Then you arrange your 670 nm laser pointer to shine through the hole, and a circular diffraction pattern, consisting of a central bright circle surrounded by alternating dark and bright rings, appears on the wall 25.2 m away. Now you can use your ruler to measure that the central bright circle is 17.7 cm in diameter. What is the diameter of the needle?

Explanation / Answer

Apply y/L = 1.22(wavelength)/D

Since the diameter of the central bright is 10.2 cm, the radius is .0501 m, so...

(.0501)/(25.2) = (1.22)(657 X 10-9)/D

D = 4.03 X 10-4 m (That is .403 mm)

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You find an unlabeled box of fine needles, and want to determine how thick they

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You find an unlabeled box of fine needles, and want to determine how thick they

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