In an experiment on photoelectric effect, the slope of the cut-off voltage versus frequency of incident light is found to be `4.12 xx 10^(–15)` V s. Calculate the value of Planck’s constant.

In an experiment on photoelectric effect, the slope of the cut off voltage versus frequency of incident light is found to be 4.12xx10^(-15)Vs . Given e=1.6xx10^(-19)C , estimate the value of Planck's constant.

In photoelectric effect the slope of stop of stopping potential versus frequency of incident light for a given surface will be

In photoelectric effect the slope of straight line graph between stopping potential (V_(s)) and frequency of incident light (v) gives

In photoelectric effect experiment, the slope of the graph of the stopping potential versus frequency gives the value of :

In an experiment of photo-electric effect, the graph of maximum kinetic energy E_(k) of the emitted photoelectrons versus the frequency v of the incident light is a straight line AB as shown in figure below : Stopping potential for the photoelectrons emitted by the light of frequency v=30xx10^(14)Hz

In an experiment of photo-electric effect, the graph of maximum kinetic energy E_(k) of the emitted photoelectrons versus the frequency v of the incident light is a straight line AB as shown in figure below : Threshold frequency of the metal.

In an experiment of photo-electric effect, the graph of maximum kinetic energy E_(k) of the emitted photoelectrons versus the frequency v of the incident light is a straight line AB as shown in figure below : Work function of the metal.

In an experiment of photoelectric effect, the graph of maximum kinetic energy E_(K) of the emitted photoelectrons versus the frequency v of the incident light is a straight line AB as shown in Figure below: Find : (i) Threshold frequency of the metal. (ii) work function of the metal (iii) Stopping potential for the photoelectrons emitted by the light of frequency v=30xx10^(14) Hz.

For a photoelectric cell the graph showing the variation of cut of voltage (V_(0)) with frequency (v) of incident light is best represented by

In a photoelectric experiment, it was found that the stopping potential decreases from 1.85 V to 0.82 V as the wavelength of the incident light is varied from 300nm to 400nm. Calculate the value of the Planck constant from these data.