The momentum of an electron is 1.60 times larger than the value computed non-relativistically. What is the speed (in `xx10^(8)` m/s) of the electron?

If the deBroglie wavelength of an electron is equal to 10^(-3) times the wavelength of a photon of frequency 6xx10^(-14)Hz then the speed (in m/s) of electron is equal to: (Speed of light =3xx10^(8)m//s) Planck's constant =6.63xx10^(-34)J.s Mass of electron =9.1xx10^(-31)kg)

The mass of an electron at rest is 9.1 xx10^(-31) kg. The energy of electron when it moves with speed of 1.8xx10^(8) m/s is

Calculate the de-Broglie wavelength of an electron moving with one fifth of the speed of light. Neglect relativistic effects. (h=6.63 xx 10^(-34) J.s., c=3xx10^(8)m//s , mass of electron =9xx10^(-31)kg)

The rest mass of an electron is 9.1 xx10^(-31) kg. Its kinetic energy when it moves with a speed of 2.4xx10^(8) m/s is

An electron gun inside a computer monitor sends an electron toward the screen at a speed of 1.20xx10^(8)m//s . If the mass of the electron is 9.190xx10^(-31) kg, what is the magnitude of its relativistic momentum?

If the uncertainty in the position of an electron is 10^(-10) m, then what be the value of uncertainty in its momentum in kg m s^(-1) ? (h = 6.62 xx10^(-34) Js)

The uncertainty in momentum of an electron is 1 xx 10^-5 kg m//s . The uncertainty in its position will be (h = 6.62 xx 10^-34 kg m^2//s) .

In a nuclear physics experiment, electrons are to be accelerated so as to have de-Broglie wavelength of the order of the diameter of a heavy nucleus (~​10^(–14) m) . Determine the momentum of the electron needed to make the wavelength of electrons equal to diameter. Use the classical formula for momentum, p = m_(0) v to determine the speed of electrons. Is this speed permissible? Now use the relativistic mass of the electrons in the expression of momentum to find the speed of electrons. Relativistic mass is given by m = (m_(0))/(sqrt(1-v^(2)//c^(2))) . Where m_(0) is rest mass and v is speed of the particle.