Question

asked Mar 21, 2020 222k views

1 Answer

Josip Ivic · Answer 1 · 2020-03-28T17:02:43+0000

Answer:

(a). The Fermi energy is
$5.75*10^(-17)\ eV$

(b). The next available energy level in a 1 cm³ is
$1.51*10^(-6)\ eV$

(c). The next available energy level in a 10 nm is 1.508 eV.

Step-by-step explanation:

Given that,

Number of electron
$n=18*10^(2)\ electron/m^3$

(a). We need to calculate the Fermi energy in electron volts

Using formula of Fermi energy

$E_(f)=(h)/(8m)((3)/(\pi))^{(2)/(3)}n^{(2)/(3)}$

Put the value into the formula

$E_(f)=((6.67*10^(-34))^2)/(8*9.1*10^(-31))((3)/(\pi))^{(2)/(3)}(18*10^(2))^{(2)/(3)}$

$E_(f)=5.75*10^(-17)\ eV$

The Fermi energy is
$5.75*10^(-17)\ eV$

(b). We need to calculate the next available energy level in a 1 cm³

$a = 1 cm^3 = 10^(-6)\ m^3$

n = 2

Using formula of energy

$E_(n)=(n^2\pi^2\hbar^2)/(2ma^2)$

Put the value into the formula

$E_(n)=((2)^2*\pi^2*(1.0545*10^(-34))^2)/(2*9.1*10^(-31)*(10^(-6))^2)$

$E_(n)=0.0000015075\ ev$

$E_(n)=1.51*10^(-6)\ eV$

The next available energy level in a 1 cm³ is
$1.51*10^(-6)\ eV$ .

(c). We need to calculate the next available energy level in a 10 nm

$a = 10 nm = 10^(-9)\ m^3$

n = 2

Using formula of energy

$E_(n)=(n^2\pi^2\hbar^2)/(2ma^2)$

Put the value into the formula

$E_(n)=((2)^2*\pi^2*(1.0545*10^(-34))^2)/(2*9.1*10^(-31)*(10^(-9))^2)$

$E_(n)=1.508\ ev$

The next available energy level in a 10 nm is 1.508 eV.

Hence, This is the required solution.

Please log in or register to add a comment.