The ratio of resolving powers of an optical microscope for two wavelengths
`lamda_(1) =4000` `Å and lamda_(2)=6000 Å is`

The ration of resolving powers of an optical microscope for two wavelangths lamda_(1) =4000 Å and lamda_(2)=6000 Å is

The ratio of resolving power of an optical microscope for two wavelength lambda_(1)=4000Å and lambda_(2)=6000Å is:

In YDSE a parallel beam of incident light consists of two wavelengths lambda_(1)=4000Å and lambda_(2)=5600Å . The minimum distance y on the screen, measured from the central axis, where the bright fringe due to two wavelengths coincide is (nlambda_(1)D)/(d) . Find n.

Wavelength of light used in an optical instrument are lambda_(1) = 4000 Å and lambda_(2) = 5000Å then ratio of their respective resolving powers (corresponding to lambda_(1) and lambda_(2) ) is

The resolving power of a telescope whose lens has a diameter of 1.22 m for a wavelength of 5000 Å is

If lambda_(1), lamda_(2)and lamda_(3) are the wavelengths of the wave giving resonance with the fundamental, first and second overtones respectively of a closed organ pipe Then the ratio of wavelength lambda_(1), lamda_(2)and lamda_(3) is

V_(1) and V_(2) are the stopping potentials for the incident radiations of wave lengths lamda_(1) and lamda_(2) respectively are incident on a metallic surface. If lamda_(1)=3lamda_(2) then

The ratio of energy of photon of lambda = 2000 Å to that of lambda = 4000 Å is

The ratio of energy of photon of lambda = 2000 Å to that of lambda = 4000 Å is

The ratio of energy of photon of lambda = 2000 Å to that of lambda = 4000 Å is