Question:

If the wavelength of incident light changes from 400 nm to 300 nm, then the stopping potential of photoelectrons emitted from a surface becomes (approximately)

Updated On: Apr 26, 2024

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The Correct Option is A

Explanation:
As the stopping potential is given by:

V = \frac{h c}{λ e} - \frac{θ}{e}

For the first case, the stopping potential is

V_{1} = \frac{h c}{λ_{1} e} - \frac{ϕ}{e}

For the second case, the stopping potential is

V_{2} = \frac{h c}{λ_{2} e} - \frac{θ}{e}

V_{2} - V_{1} = \frac{h c}{λ_{2} e^{e}} - \frac{h c}{λ_{1} e} = \frac{h c}{e} [\frac{1}{λ_{2}} - \frac{1}{λ_{1}}]

V_{2} - V_{1} = \frac{6.6 \times 10^{- 34} \times 3 \times 10^{8}}{1.6 \times 10^{- 19}} \times \frac{1}{10^{- 9}} \times [\frac{1}{300} - \frac{1}{400}]

V_{2} - V_{1} = \frac{6.6 \times 10^{- 34} \times 3 \times 10^{8}}{1.6 \times 10^{- 19}} \times \frac{1}{10^{- 9}} \times [\frac{1}{1200}] = 1.03 v

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List-I		List-II
P	If \(n = 2\) and \(\alpha = 180°\), then all the possible values of \(\theta_0\) will be	I	\(30\degree\) or \(0\degree\)
Q	If \(n = √3\) and \(\alpha= 180°\), then all the possible values of \(\theta_0\) will be	II	\(60\degree\) or \(0\degree\)
R	If \(n = √3\) and \(\alpha= 180°\), then all the possible values of \(\phi_0\) will be	III	\(45\degree\) or \( 0\degree\)
S	If \(n = \sqrt2\) and \(\theta_0 = 45°\), then all the possible values of \(\alpha\) will be	IV	\(150\degree\)
			\[0\degree\]