In YDSE of equal width slits, if intensity at the center of screen is `I_(0)`, then intensity at a distance of `beta // 4` from the central maxima is

In YDSE, having slits of equal width, let beta be the fringe width and I_(0) be the maximum intensity. At a distance x from the central brigth fringe, the intensity will be

A monochromatic light of lambda=500 nm is incident on two identical slits separated by a distance of 5xx10^(-4)m . The interference pattern is seen on a screen placed at a distance of 1 m from the plane of slits. A thin glass plate of thickness 1.5xx10^(-6)m and refractive index mu=1.5 is placed between one of the slits and the screen. Find the intensity at the center of the screen if the intensity is I_(0) in the absence of the plate. Also find the lateral shift of the central maxima and number of fringes crossed through center.

In Young's double-slit experiment d//D = 10^(-4) (d = distance between slits, D = distance of screen from the slits) At point P on the screen, resulting intensity is equal to the intensity due to the individual slit I_(0) . Then, the distance of point P from the central maximum is (lambda = 6000 Å)

In a double slit experiment ,the separation between the slits is d=0.25cm and the distance of the screen D=100 cm from the slits .if the wavelength of light used in lambda=6000Å and I_(0) is the intensity of the central bright fringe. The intensity at a distance x=4xx10^(-5) in form the central maximum is-

In YDSE intensity at central maxima is I_0 The ratio I/I_0 , at path difference lamda/8 on the screen from central maxima , is closed to

Monochromatic light of wavelength 5000 Å is used in YDSE, with slit width, d = 1 mm , distance between screen and slits, D = 1 M . If intensites at the two slits are I_1 = 4I_0 and I_2 = I_0 , find: a. finge width beta: b. distance of 5th minima from the central maxima on the screen, c. intensity at y = (1)/(3) mm, d. distance of the 1000th maxima, and e. distance of the 5000th maxima.

In a Young's double slit experiment, I_0 is the intensity at the central maximum and beta is the fringe width. The intensity at a point P distant x from the centre will be

In a Young's double slit experiment, I_0 is the intensity at the central maximum and beta is the fringe width. The intensity at a point P distant x from the centre will be

In a Young's double slit experiment, I_0 is the intensity at the central maximum and beta is the fringe width. The intensity at a point P distant x from the centre will be

In a Young's double slit experiment, the separation between the slits = 2.0 mm, the wavelength of the light = 600 nm and the distance of the screen from the slits = 2.0 m. If the intensity at the centre of the central maximum is 0.20 Wm^-2 , what will be the intensity at a point 0.5 cm away from this centre along the width of the fringes ?