In a Young's double slit experiment let A and B be the two slits. A thin plate of thickness t and refractive index `mu` is placed in front of A. Let `beta` be the fringe width. The central maximum will shift

If a Young's double slit experiment were conducted inside water instead of air, the fringe width would

In Young's double slit experiment if distance between the two sources is increased how will the fringe width be changed?

In Young's double slit experiment the distance between the two slits is d and wavelength of the light used is lambda . The angular width of the fringe

In Young's double slit experiment the magnitude of the fringe width is beta . If the whole set-up of the experiment is immersed in a liquid of refractive index mu then the magnitude of the fringe width will be

In Young's double slit experiment, the fringe width is beta . If the entire arrangement is placed in a liquid of refractive index n, the fringe width becomes :

In Young's double slit experiment the fringe width is found to be 0.3 mm. Now if a thin glass plate of refracting index 1.5 is placed in the path of any one of light rays coming from the slits then the width of the fringe will be

In Young's double slit experiment describe briefly how bright and dark fringes are obtained on the screen kept in front of a double slit. Hence obtain the expression for the fringe width.

In Young's double slit experiment the width of the fringe is 2.0 mm. Find the distance between 9th bright band and 2nd dark band.