If the kinetic energy of a free electron doubles . Find the factor by which de Broglie wavelength changes.

If the kinetic energy of a free electron doubles , its de - Broglie wavelength changes by the factor

The de Broglie wavelength is given by

If E_(1) , E_(2) "and" E_(3) represent respectively the kinetic energies of an electron , an alpha particle and a proton each having same de Broglie wavelength then :

If E_(1) , E_(2) " and " E_(3) represent respectively the kinetic energies of an electron , an alpha particle and a proton each having same de Broglie wavelength then :

In an excited state of hydrogen like atom an electron has total energy of -3.4 eV . If the kinetic energy of the electron is E and its de-Broglie wavelength is lambda , then

In an excited state of hydrogen like atom an electron has total energy of -3.4 eV . If the kinetic energy of the electron is E and its de-Broglie wavelength is lambda , then

If E_1, E_2 and E_3 represent respectively the kinetic energies of an electron, an alpha - particle and a proton each having same de-Broglie wavelength, then

If the KE of free electron triples, its deBroglie wavelength changes by a factor

Find the ratio of kinetic energy of the particle to the energy of the photon . If the de Broglie wavelength of a particle moving with a velocity 2.25xx 10^(8) m//s is equal to the wavelength of photon .

If the kinetic energy of a particle is increased by 16 times, the percentage change in the de Broglie wavelength of the particle is