Forbidden energy gap of Ge is `0.75eV`, maximum wave length of incident radiation for producing electron-hole pair in germanium semiconductor is

Forbidden energy gap of Ge is 0.75eV , maximum wave length of incident radiation for producing electron-gole pair in germanium semiconductor is

The forbidden energy gap in Ge is 0.72 eV , given hc = 12440 eVÅ - The maximum wavelength of radiation that will generate electron hole pair is

calculate the maximum wavelength of electromagentic radioation to create pair in germanium Energy band gap of 0.72 eV

The forbidden energy gap of germanium is 0.72eV. What do you understand by it?

Forbidden energy gap of a silicon semiconductor is 1.12 eV. In order to generate electron-hole pairs in it, the maximum wavelength of the incident photons will be -

For a photodiode, the forbidden energy gap (E_g) of the material used is 2.8 eV and wavelength of radiations (lambda) incident on it is 5780 A. Then the emission of electrons is possible when incident radiation have.

" The cut-off wavelength for a photon able to create electron-hole pair in a semiconductor having energy band gap of "1.6eV" is "

For a semiconductor of band energy gap 1.5eV , calculate the wave-length of the emitted radiation when a conduction hand electron combines with a valence band hole. Given Planck's constat 6.6xx10^(-34)Js

The energy gap of germanium is 1.28 eV. What is the maximum wave length at which germanium will begin absorbing energy.