A laser produced a diffraction pattern on a screen. The graph below shows the intensity of the signal as a function of y. Assume that the slit is 0.050 mm wide, located 0.80 m from the screen. What is the frequency of the laser? Completely solve algebraically before inserting any numerical values.
I know the answer is f = 4.8x10^14 Hz but I dont know how to get it with these equations:
A laser produced a diffraction pattern on a screen. The graph below shows the intensity of...
Using a 677 nm wavelength laser, you form the diffraction pattern of a 1.01 mm wide slit on a screen. You measure on the screen that the 15th dark fringe is 9.97 cm away from the center of the central maximum. How far is the screen located from the slit? distance: _______ m
Using a 679 nm wavelength laser, you form the diffraction pattern of a 0.101 mm wide slit on a screen. You measure on the screen that the 14thark fringe is 8.11 cmaway from the center of the central maximum. How far is the screen located from the slit?
Using a 671 nm wavelength laser, you form the diffraction pattern of a 1.1 mm wide slit on a screen. You measure on the screen that the 15th dark fringe is 9.47 cm away from the center of the central maximum. How far is the screen located from the slit?
Using a 699 nm wavelength laser, you form the diffraction pattern of a 1.1 mm wide slit on a screen. You measure on the screen that the 11th dark fringe is 8.69 cm away from the center of the central maximum. How far is the screen located from the slit?
A system of vertical slits is illuminated by a laser of the wavelength 600 nm. The diffraction pattern is observed on a screen at a distance of 2.4 m. The intensity distribution is shown in the figure right. The horizontal distance of the screen is 160 mm. a) How many slits were illuminated? b) What was the distance between the slits? c) Calculate the width of the slits d) Calculate the width of the central maximum. 5. A system of...
1. The picture below shows the intensity as a function of angle (in degrees) for a 2-slit interference pattern. You can assume that the gridlines are spaced by 1 degree on the horizontal axis. a. Assuming we are using 633 nm laser light, what is the approximate slit spacing? b. Recall that the 2-slit intensity pattern is pinched to zero by the diffraction pattern created by the slit width. Approximately how wide are the slits? asin θ ηλ gives the...
1) The graph below shows the intensity of monochromatic light on a screen far away from a double slit. On the blank set of axes sketch the intensity of light if one of the slits is blocked. Assume the wavelength of the laser is 750 nm. 2) If the screen from problem 1) above is 1.5 meters away from double slit what is the distance between the two slits? 3) If the screen from problem 1) above is 3.0 meters...
Light of wavelength 455 nm falls on a 0.32 mm wide slit and forms a diffraction pattern on a screen 1.0 m away. (a) Find the position of the first dark band on each side of the central maximum. (b) Find the width of the central maximum.
Light of wavelength 575 nm falls on a 0.32 mm wide slit and forms a diffraction pattern on a screen 1.0 m away. (a) Find the position of the first dark band on each side of the central maximum. (b) Find the width of the central maximum.
You measure distances from the center of a diffraction pattern (y) to a series of dark fringes on a screen that is 0.3000 ± 0.0005 m away from the 0.04-mm wide slit you are using to create the pattern. You create a plot of y (in m) vs m and get a slope for the best-fit line of 0.005245 ± 8.575 10-6. What is the wavelength of the laser you used to collect the data? And the uncertanity please.