03myersd said:
Please
anyone? The report is due in at 3.30 today and I would really like to
have the analysis of the derivation included in it. Its not essential
but it would essentially round the whole thing off nicely.
Thanks
Here's the derivation; I hope it's not late
[tex]{L_p}[/tex] = diffusion length of holes ([tex]{cm}[/tex])
[tex]{D_p}[/tex] = diffusion constant ([tex]{cm^2}/s[/tex])
[tex]{L_p}[/tex] = average carrier life time ([tex]s[/tex])
Firstly, we find [tex]\Delta{p}[/tex]
where [tex]\Delta{p}[/tex] is the minority carrier concentration at the
edge of the depletion region (DP)
we know that the built-in voltage is given by
[tex]{V_{bi}} = \frac{kT}{q}\ln({\frac{{N_A}{N_D}}{n_{i^2}}})[/tex]
Applying the law of mass action [tex]{n_{i^2}} =<br />
<br />
{n_{no}}\times{p_{no}}[/tex]
we get
[tex]{V_{bi}} = \frac{kT}{q}\ln({\frac{{n_{no}}{p_{no}}}{n_{i^2}}})[/tex]
Rearranging
[tex]p_{po} = p_{no}\exp(\frac{qV_{bi}}{kT})[/tex] => eqn.1
For non-equilibrium situation, i.e. when there's forward bias voltage
[tex]{V_f}[/tex]
[tex]p_{p(0)} = p_{n(0)}\exp(\frac{q(V_{bi}-{V_f})}{kT})[/tex] => eqn.2
or
[tex]p_{po} = p_{no}\exp(\frac{qV}{kT})[/tex]
where [tex]V = {V_{bi}}-V_f[/tex]
assuming low injection level, i.e. [tex]{p_p}\approx{p_{po}}[/tex]
eqn.1/eqn.2 by doing this we get [tex]\Delta{p}[/tex]
therefore
[tex]\Delta{p} = p_{no}\exp(\frac{qV}{kT}-1)[/tex]
Using the continuity equation, we get an expression for the current density
[tex]J_{p(x)} = q\frac{D_p}{L_p}\delta_{p(x)}[/tex]
since [tex]\Delta{p} = \delta_{p(x=0)}[/tex]
so [tex]\delta_{p(x=0)}= p_{no}\exp(\frac{qV}{kT}-1)[/tex]
[tex]J_{p(x)} = q\frac{{D_p}{p_{no}}}{L_p}\exp(\frac{qV}{kT}-1)[/tex]
Doing the same with electrons, we get a similar expression, hence
[tex]J_{total} = J_p + J_n = J_s\exp(\frac{qV}{kT}-1)[/tex]
This is the standard way of expressing the diode equation. However, if we multiply the above expression by the cross-section area, we get the current I.
