1 Answer

Umesh Maharshi · Answer 1 · 2020-02-06T02:05:09+0000

Answer:

Wavelength = 64.635 pm

Step-by-step explanation:

The expression for the deBroglie wavelength and kinetic energy is:

$\lambda=\frac {h}{√(2* m* K.E.)}$

Where,

$\lambda$ is the deBroglie wavelength

h is Plank's constant having value
$6.626* 10^(-34)\ Js$

m is the mass of electron having value
$9.11* 10^(-31)\ kg$

K.E. is the kinetic energy of the electron.

Given, K.E. = 360 eV

Energy in eV can be converted to energy in J as:

1 eV = 1.6022 × 10⁻¹⁹ J

So, K.E. =
$360* 1.6022* 10^(-19)\ J=5.76792* 10^(-17)\ J$

Applying in the equation as:

$\lambda=\frac {h}{√(2* m* K.E.)}$

$\lambda=\frac{6.626* 10^(-34)}{\sqrt {{2* 9.11* 10^(-31)* 5.76792* 10^(-17)}}}\ m$

$\lambda=\frac{10^(-34)* \:6.626}{\sqrt{10^(-48)* \:105.0915024}}\ m$

$\lambda=6.4635* 10^(-11)\ m$

Also, 1 m = 10¹² pm

So, Wavelength = 64.635 pm

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