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Show that the claims made in the backbone text are actually true (for room temperature = 300
K). Use the following equations taken from the backbone: |
|
 |
For the average velocity v0
of a particle zooming around in the crystal: |
|
|
| v0 | = | æ
ç
è
| 3kBT
m |
ö
÷
ø | 1/2 |
|
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|
|
For the mean time t
between scattering: |
| |
|
|
|
For the drift velocity vD |
| |
|
|
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For the mean free path length l
obtained for vD = 0: |
| |
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Of course, you need numbers for the concentration n of the free carriers and
for the specific conductivity s |
|
|
Since we are essentially considering metals, you assume for a start that you have 1
free electron per atom if you want to find a number for n. Here are a few data needed for the calculation: |
| |
| Atom |
Density
[kg m–3] |
Atomic weight
[1.66 · 10–27 kg] |
Conductivity
s
[107
W–1 m–1] |
Atomic density n
[m–3] ??? |
| Na |
970 | 23 |
2.4 | |
| Cu |
8.920 | 64 |
5.9 | |
| Au |
19.300 | 197 |
4.5 | |
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You may run into some trouble with the dimensions. Just look at conversions from, e.g. eV
to J, from W to V and A, and at the relations beween Volt, Ampere,
Watts and Joule. |
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© H. Föll (MaWi 2 Skript)
2.1.2 Ohm's Law and Classical Physics 
Mit Frame