If `lambda` is the wavelength of a stationary wave, what would be the distance between a node and the adjacent antionde ?

If lambda is the wavelength of a stationary wave, what would be the distance between two consecutive nodes ?

If wavelength of a stationary wave is lamda then write the distance between two consecutive antinodes .

If lambda the wavelength of a stationary wave, discuss what will be the distance of the third antinode from a particular node .

The intensity at the maximum in a Young's double slit experiment is I_(0) . Separation between two slits is d = 5lambda , where lambda is the wavelength of light used in the experiment. What will be the intensity in front of one of the slits on the screen placed at a distance D = 10 d?

The expression for a standing wave is y(x, t) = 2 sin ( 0 . 1 pi x) cos 100 pi t , where x, y are in cm and t is in second. Find the distance between a node and the next antinode of the wave .

Stationary waves are formed due to superposition of two oppositely directed waves, each of frequency 550 Hz, velocity 330 m*s^(-1) and of equal amplitude . Find (i) the distance between two consecutive antinodes, (ii) the distance between three consecutive nodes, (iii) the distance between a pair of adjacent node and antinode in this stationary wave .

An incident wave and a reflected wave are represented by xi _(1) = a "sin" (2pi)/(lambda) (vt - x) and xi _(2) = a "sin"(2pi)/(lambda) (vt + x) Derive the equation of the stationary wave and calcu-late the position of the nodes and antinodes.

A narrow slit of 2 mm width is illuminated by a monochromatic light of wavelength 500 nm. What would be the intermediate distance between two first minima on either side of a screen kept 1m away?