If the Planck's constant `h = 6.6 xx 10^(-34) Js`, the de-Broglie wave length of a particle having momentum of `3.3 xx 10^(-24) kg.ms^(-1)` will be

The mass of hydrogen atom is 1.66 xx 10^(-24)g and Planck's constant is 6.64 xx 10^(-27) erg.sec. The de Broglie wavelength of a hydrogen atom moving with a velocity half that of light of

The value of Plank's constant is 6.62618xx 10^(-34)Js . The number of significant figures in it is:

What is the de Broglie wavelength of A dust particle of mass 1.0xx10^(-9) kg drifting with a speed of 2.2 m/s ?

The De-Broglie wavelength associated with a particle of mass 1 mg moving with a velocity of 10ms^(-1) is

A particle is moving three times as fast as an electron. The ratio of the de Broglie wavelength of the particle to that of the electron is 1.813 xx 10^(-4) . Calculate the particle’s mass and identify the particle.

For an LED to emit light in visible region of the electromagnetic spectrum, it can have energy band gap in the range of, ( Plank's constant, h = 6.6 xx 10^(-34) Js and speed of light, e = 3 xx 10^(8) ms^(-1) in vacuum )

If the velocity of the electron is 1.6xx10^(6) "ms"^(-1) , calculate the de-Broglie wavelength associated with this electron .

If the kinetic energy of an electron is 4.55 xx 10^(-25)J , find its wavelength (Planck's cosntant, h = 6.625 xx 10^(-34) kgm^(2)s^(-1), m = 9.1 xx 10^(-31)kg ).

Calculate the energy in joule corresponding to light of wavelength 45nm (Planck's constant h = 6.63 xx 10^(-34)Js , speed of light c = 3 xx 10^(8)ms^(-1) )