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I have been following the methods suggested by members of this site to calculate the solar irradiance outside of the earth's atmosphere, see here.

I now want to calculate the solar irradiance reaching the earth's surface.

I calculate the irradiance outside the atmosphere as:

$$ L_{\lambda} = \frac{2c^{2}h}{\lambda^{5}\left( \exp\left[hc/\lambda kT \right] - 1\right)}$$

where $ h = 6.626\times 10^{-34}$

$ c = 3 \times 10^{8} $

$ T = 6000 $

$ k = 1.38066\times 10^{-23} $

$ \lambda = 0:20 \times 10^{-9}:3200 \times 10^{-9} $

I then convert the units as: $$ L_{\lambda} =L_{\lambda} \times 10^{-9} $$

multiply by the square of the ratio of the solar radius of earth's orbital radius $$ L_{\lambda} =L_{\lambda} \times 2.177 \times 10^{-5} $$

apply Lambert's cosine law $$ L_{\lambda} =L_{\lambda} \times \pi$$

which results in the upper curve seen in the following figure, i.e. the energy curve for a black body at 6000K:

enter image description here

I now wish to generate a second curve, one that shows the irradiance at the earth's surface. I know that the scattering and absorption processes that take place in the atmosphere not only reduce the intensity but also change the spectral distribution of the direct solar beam.

I want to show the spectral distribution of solar irradiance at seal level for a Zenith sun and a clear sky. So, the curve that I want to show is the spectral distribution as it would be if there were scattering but no absorption. For this I would also like to make the assumption that the solar elevation is more than 30 degrees.

Does anyone know how I could produce the curve explained above?

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  • $\begingroup$ Find someone who has a copy of MODTRAN :-) . The quality of your result will depend on the details of your model. For example, you could limit it to Rayleigh scattering plus $H_2O$ absorption. $\endgroup$ Jun 4 '14 at 13:46
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This is getting complicated. :) You have to make a lot of assumptions to make progress; you have listed most of them. I'll explicitly add an assumption that we consider only Rayleigh scattering (more-or-less consistent with "clear sky"), and that the atmosphere is pure N${}_2$.

Since this is homework, I won't spill all the beans.

What you need is the cross section for Rayleigh scattering: how much light does each molecule remove from the incident light. Given that, then you have to figure out what to do with it. This will involve figuring out how many molecules are in the way between the Sun and your detector.

I will say that there are web sites that present the results you need without your having to do the calculations yourself.

Of course, this won't give you any of the absorption bands that show up in your chart. And, of course, it won't account for the fact that the light hitting the top of the atmosphere only approximately follows the black body curve. I haven't done the exercise myself, but I suspect you will end up reproducing one of the main features of those data.

Update

Since we're beyond homework: this Wikipedia page gives the Rayleigh scattering cross section for N${}_2$, and a value for molecular density, but it doesn't say if it's the average value or the value at the earth's surface. Nonetheless, that number can help in making order-of-magnitude estimates. At any rate, Rayleigh scattering goes as $\lambda^{-4}$, so when you take that into account you will multiply your result by $a\lambda^{-4}$ where a is some pre-factor that you don't know yet. You can try to make an estimate of the pre-factor using the data on that Wikipedia page, and perhaps some knowledges or guesses about the thickness of the atmosphere. (Or you can simply try different values for $a$ until you find one that works.) You might be able to model the fact that the solar data matches the b.b. curve for high frequencies, but not at lower frequencies.

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  • $\begingroup$ Thanks. Just to clarify, this is not actually homework (way passed that stage), just seemed like a relevant tag. $\endgroup$
    – KatyB
    Jun 4 '14 at 13:57
  • $\begingroup$ what about the m = 1 part specified on the graph? $\endgroup$
    – KatyB
    Jun 4 '14 at 22:11
  • $\begingroup$ I'm not sure, but I'm thinking that you might be able to reproduce the general outline of that curve. (Again, you won't be able to get the features that occurred before the light gets to the earth, and the absorption features from the atmosphere.) $\endgroup$
    – garyp
    Jun 5 '14 at 0:23
  • $\begingroup$ Is there a table somewhere that shows the percentage of spectral energy per wavelength band e.g. PAR constitutes 45 % of the energy at earth's surface and so on... $\endgroup$
    – KatyB
    Jun 5 '14 at 7:21
  • $\begingroup$ Excuse my ignorance, but what is PAR? $\endgroup$
    – garyp
    Jun 5 '14 at 11:51

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