A photon and an electron have equal energy E.`lambda_("photon")//lambda_("electron")` is proportional to :

A proton with KE equal to that a photono (E = 100 keV). lambda_(1) is the wavelength of proton and lambda_(2) is the wavelength of photon. Then lambda_(1)/lambda)_(2) is proportional to:

The energy of a photon is equal to the kinetic energy of a proton. The energy of the photon is E. Let lambda_1 be the de-Broglie wavelength of the proton and lambda_2 be the wavelength of the photon. The ratio (lambda_1)/(lambda_2) is proportional to (a) E^0 (b) E^(1//2) (c ) E^(-1) (d) E^(-2)

The energy of a photon is E which is equal to the kinetic energy of a proton.If lambda1 be the de-Broglie wavelength of the proton and lambda2 be the wavelength of the photon,then the ratio (lambda_(1))/(lambda_(2)) is proportional to

For same energy , find the ratio of lambda _("photon" ) and lambda _("electron") (Here m is mass of electron)

A photon and an electron both have wavelength 1 Å . The ratio of energy of photon to that of electron is

A proton has kinetic energy E = 100 keV which is equal to that of a photo is lambda_(1) . The ratio of k_(2) // lambda_(1) is proportional to

An electron (e,m) and photon have same energy E. Then the ratio lambda_e : lambda_p is?

Momentum of a photon of wavelength lambda is :

Photon and electron are given same energy (10^(-20) J) . Wavelength associated with photon and electron are lambda_(ph) and lambda_(el) then correct statement will be

A photon and electron have got same de-Broglie wavelength. Total energy of an electron is............than that of photon.