Question

Question #e7625

Answer 1

`color(blue)"λ "prop"` `(1/sqrtV)"`

Explanation:

`color(blue)"De Broglie Wavelength Formula"`

Light can travel like a wave or like a particle (photons). Louis de Broglie (1892-1987) related both light movements. The formula relates the wavelength to the momentum of a wave/particle.

`λ = h/p`

Re-arrenging

`p = m nu = h/λ`

λ = the de Broglie wavelength (m)
h = Planck's constant ()
p = momentum of a particle ()
m = mass of a particle (kg)
`nu` = velocity of a particle (m/s)

Making squares both members of equation

`m^2` `nu^2 = h^2/λ^2"`

Dividing both sides by 2m

`"(m^2` `nu^2 )"`/`"2m"`= `"("h^2""λ^2")/"2m"`

`1/2` `"m` `nu^2 "`= `"("h^2"/"2m)"` `""(1/λ^2)"`

But since the kinetic energy of the electron is equal to the energy gained from accelerating through the electric potential,

`eV "`= `"("h^2"/"2m)"` `""(1/λ^2)"`

Re-arrenging

`λ^2` = `h^2/"2 m e V"`

`λ` = `h/"2 m e "` `(1/sqrtV)`

Finally,

`color(blue)"λ "prop"` `(1/sqrtV)"`

Personal opinion: similar to "thermocouple" (Seebeck) effect.