dual-nature-of-radiation-and-matter Question 40

Question: Q. 1. An $\alpha$-particle and a proton are accelerated through the same potential. Find the ratio of their de-Broglie wavelengths.

U] [Delhi 2017]

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Solution:

Ans. de-Broglie wavelength is given by

$$ \lambda=\frac{h}{\sqrt{2 m K}} $$

Mass of a proton $=u$

Charge of proton $=e$

Hence, Kinetic energy of a proton when accelerated through a potential $=\mathrm{eV}$

Putting these values in de-Broglie wavelength formula to calculate wave length of proton

$$ \lambda_{p}=\frac{h}{\sqrt{2 u e V}} $$

Now,

  • Mass of an $\alpha$-particle $=4 u$
  • Charge of an $\alpha$-particle $=2 e$

Hence, Kinetic energy of an $\alpha$-particle when accelerated through a potential $=2 \mathrm{eV}$

Putting these values in de-Broglie wavelength formula to calculate wave length of $\alpha$-particle

$$ \lambda_{\alpha}=\frac{h}{\sqrt{8 u \times 2 e V}}=\frac{h}{\sqrt{16 u e V}} $$

Hence ratio of $\frac{\lambda_{p}}{\lambda_{\alpha}}=\frac{1}{\sqrt{8}}$

$$ \frac{\lambda_{p}}{\lambda_{\alpha}}=\frac{1}{2 \sqrt{2}} $$

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