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`

Semiconductor Ge has forbidden gap of 1.43 eV. Calculate maximum wavelength which result from electron hole combination.

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

The electron in a given Bohr orbit has a total energy of -1.51 eV. calculate the wavelength of radiation emitted, when this electron makes a transition of the ground state.

Hydrogen atom in its ground state is excited by means of monochromatic radiation of wavelength 970.6 Å . How many lines are possible in the resulting emission spectrum ? Calculate the longest wavelength amongst them. You may assume that the ionisation energy for hydrogen atom is 13.6 eV. Given Planck's constant = 6.6 xx 10^(-34)Js, " " c = 3 xx 10(8) ms^(-1)

The bank gap of an alloy semiconductor galiumarseide phosphie is 1.98eV . Calculate the wavelength of radiation that is emitted when electrons and holes in this material combine directly. What is the colour of the emitted radiation? Take h=6.6xx10^(-34) Js

Calculate the wavelength of de Broglie waves associated with a proton of kinetic energy 500 eV. (Given : m_(p)=1.67 xx 10^(-27)kg, h=6.63 xx 10^(-34)Js ).

If the total energy of radiation of frequency 10^(14)Hz is 6.63J , calculate the number of photons in the radiation. (Planck's constant =6.63xx10^(-34)J-s ).

The forbidden energy gap of a germanium semiconductor is 0.75 eV. The minimum thermal energy of electrons reaching the conduction band from the valence band should be -

Find the wavelength of light that may excite an electron in the valence band of diamond to the conduction band. The energy gap is 5.50 eV

(i) the number of conduction electrons in a sample of pure semiconductor is 7xx10^(20) per cubic metre calculate the number of holes in a sample of size 2cm xx2 cm xx2 cm (ii) an electron in the conduction band combines with a hole in the valence band of the semiconductor and excess energy is released in the of the semiconductor is 2.1 eV find the maximum wavelength that can be emitte in this process