In Young's double slit intefrence experiment the wavelength of light used is `6000 Å` . If the path difference between waves reaching a point P on the screen is `1.5` microns, then at that point P

In Young's double slit interference experiment the wavelength of light used is 5000A .If the phase difference between waves reaching a point p on the screen is 6 pi ,then at the point p is ?

In a Young's double slit experiment, the central point on the screen is

In Young's double slit experiment, the slits are 3 mm apart. The wavelength of light used is 5000 Å and the distance between the slits and the screen is 90 cm. The fringe width in mm is

In Young's double-slit experiment, the path difference between two interfering waves at a point on the screen is 13.5 times the wavelength. The point is

In Young's double slit experiment, the distance between the two slits is 0.1 mm and the wavelength of light used is 4 xx 10^(-7) m . If the width of the fringe on the screen is 4 mm , the distance between screen and slit is

In Young’s double slit experiment, light from two identical sources are superimposing on a screen. The path difference between the two lights reaching at a point on the screen is frac{7 lambda}{4} . The ratio of intensity of fringe at this point with respect to the maximum intensity of the fringe is :

In young's double-slit experiment , the spacing between the slits is 'd' and the wavelength of light used is 6000Å If the angular width of a fringe formed on a distance screen is 1^@ then calculate 'd' .

In Young's double slit experiment, red light of wavelength of 6000Å is used and the n^(th) bright fringe is obtained at a ponit P on the screen. Keeping the same setting, the source of light is replaced by green light of wavelength 5000Å and now (n+1)^(th) bright fringe is obtained at the point P on the screen. The value of n is