In YDSE, `d = 2 mm, D = 2 m,` and `lambda = 500 nm`. If intensities of two slits are `I_(0)` and `9I_(0)`, then find intensity at `y = (1)/(6) mm`.

In YDSE, D = 1 m, d = 1 mm , and lambda = 5000 nm . The distance of the 100th maxima from the central maxima is

In YDSE a = 2mm , D = 2m, lambda = 500 mm. Find distance of point on screen from central maxima where intensity becomes 50% of central maxima

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 YDSE, D = 1 M, d = 1 mm, and lambda = 1//2 mm. (a) Find the distance between the first and central maxima on the screen. (b) Find the number of maxima and minima obtained on the screen.

What is the intensity of sound of 70 decibel ? ( Given the reference intensity I_0 = 10^(-12) " watt"//m^(2) )

In a YDSE experiment, d = 1mm, lambda = 6000Å and D= 1m. The minimum distance between two points on screen having 75% intensity of the maximum intensity will be

A Young's double slit experiment uses a monochromatic light of wavelength lambda . The intensity of each slit is same and is equal to I_(0) . What will be the resultant intensity at a point where waves interfere at a path difference of (lambda)/2 ?

In Young's double slit experiment, assume intensity of light on screen due to each source alone is I_(0) and K_(1) is equal to difference of maximum and minimum intensity. Now intensity of one source is made (I_(0))/(4) and K_(2) is again difference of maximum and minimum intensity . Then (K_(1))/(K_(2))=

In Young's double - slit experiment, d = 0.1 mm, D = 20 cm, and lambda=5460Å , the angular position for first dark fringe 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 ?