Electrons are accelerated through a potential difference of 150V. Calculate the de Broglie wavelength.

If a proton is accelerated through a potential difference of 1000V, then its de-Broglie wavelength is (given, m_(p) = 1.67 xx 10^(-27)kg, h = 6.63 xx 10^(-34)J-s )

If lamda_(0) is the De-Broglie wavelength for a proton accelerated through a potential difference of 100 V, De- Broglie wavelength for prop- particle accelerated through the same potential difference is

Photon having energy equivalent to the binding energy of 4^(th) state of He^+ atom is used to eject an electron from the metal surface of work function 1.4 eV. If electrons are further accelerated through the potential difference of 4V then the minimum value of De-broglie wavelength associated with the electron is :

A proton when accelerated through a potential difference of V, has a De-Broglie wavelength lambda associated with it.if an alpha -particle is to have the same De-Broglie wavelength lambda, it must be accelerated through a potential difference of

A charged particle is accelerated from rest through a certain potenetial difference. The de-Broglie wavelength is lambda_(1) when it is acceleated through V_(1) and is lambda_(2) when accelerated through V_(2) . Then ratio lambda_(1)//lambda_(2) is

Calculate the wavelength of an electron that has been accelerated in a particle accelerator through a potential difference of 100 million volts.