In an experiment on photo electric effect, the slope of cut - off voltage versus frequency, incident light is found to be `4.12 xx 10^(-15)` Vs. Calculate the of Planck's constant.

Rate constant k for a first order reactions has been found to be 2.54 xx 10^(-3) sec^(-1) . Calculate its 3//4^(th) life. (log 4 = 0.6020)

When light of frequency 6 xx 10^(14) Hz is incident on a photosensitive metal, the kinetic energy of the photoelectron ejected is 2e V. Calculate the kinetic energy of the photoelectron in eV when light to frequency 5 xx 10^(14) Hz is incident on the same metal. Given Planck's constant, h = 6.625 xx 10^(-34) Js , 1 eV = 1.6 xx 10^(-19) .

A photon of frequency 1.5xx10^(15) Hz is incident on a metal surface of work function 1.672 eV. Calculate the stopping potential.

Calculate the wavelength of a wave of frequency 10^(12) Hz, travelling witli the speed of light 3xx10^(8) ms^(-1) .

When the frequency of the incident light on a photo sensitive metal is changed from 7.6 xx 10^(14) Hz to 6 xx 10^(14) Hz the value of stopping potential changes by 0.66 V. Calculate Planck's constant. [Note : Any form of Einstein's P.E. Equation can be considered]

The kinetic energy of sub-atomic particle is 5.85 xx 10^(-25) J. Calculate the frequency of the particle wave. (Planck’s constant, h = 6.626 xx 10^(-34) Js)

Calculate the retarding potential required to stop the photoelectrons emitted from a metal surface of work function 1.2 eV , when light of frequency 6.3xx 10^(14) Hz is incident on it

The threshold wavelength of a photosensitive metal is 662.5 nm. If this metal is irradiated with a radiation of wavelength 331.3 nm, find the maximum kinetic energy of the photoelectrons. If the wavelength of radiation is increased to 496.5 nm, calculate the change in maximum kinetic energy of the photoelectrons. (Planck's constant h = 6.625 xx 10^(-34) Js and "speed of light in vacuum" = 3 xx 10^(8)ms^(-1) )