The potential energy of a partical varies as .
`U(x) = E_0 ` for ` 0 le x le 1`
`= 0` for `x gt 1 `
for `0 le x le 1` de- Broglie wavelength is `lambda_1` and for `xgt1` the de-Broglie wavelength is `lambda_2`. Total energy of the partical is `2E_0`. find `(lambda_1)/(lambda_2).`

The potential energy of a particle varies as . U(x) = E_0 for 0 le x le 1 = 0 for x gt 1 for 0 le x le 1 de- Broglie wavelength is lambda_1 and for xgt1 the de-Broglie wavelength is lambda_2 . Total energy of the particle is 2E_0 . find (lambda_1)/(lambda_2).

The potential energy of particle of mass m varies as U(x)={(E_(0)"for"0lexle1),(0" for " gt 1):} The de Broglie wavelength of the particle in the range 0lexle1 " is " lamda_(1) and that in the range xgt1" is "lamda_(2) . If the total of the particle is 2E_(0)," find "lamda_(1)//lamda_(2) .

Derive the relation between the wavelength (lambda) of the de broglie wave and kinetic energy (E ) of a moving particle

The log - log graph between the energy E of an electron and its de - Broglie wavelength lambda will be

Kinetic energy of the particle is E and it's De-Broglie wavelength is lambda . On increasing it's KE by delta E , it's new De-Broglie wavelength becomes lambda/2 . Then delta E is

Kinetic energy of the particle is E and it's De-Broglie wavelength is lambda . On increasing it's KE by delta E , it's new De-Broglie wavelength becomes lambda/2 . Then delta E is

If the de-Broglie wavelength is lambda_(0) for protons accelerated through 100 V, then the de-Broglie wavelength for alpha particles accelerated through the same voltage will be

Electrons with de-Broglie wavelength lambda fall on the target in an X-ray tube. The cut-off wavelength of the emitted X-ray is

Electrons with de-Broglie wavelength lambda fall on the target in an X-ray tube. The cut-off wavelength of the emitted X-ray is

y - 2x le 1, x + y le 2, x ge 0, y ge 0