Submitted by DeismAccountant t3_11dmqfz in askscience

I’m familiar with the wavelength range (380-750nm approximately,) but what about the intensity expressed in base so units (W/m^2?) The closest indications I can find is plugging the definition of Lux into this converter and moving the decimal from cm^2 to m^2, but it appears to be limited to 555nm in terms of wavelength, and this chart seems to give me the indication that my math is still off.

I’m obviously trying to accurately construct an overall graph of human vision more akin to the last image, but the second axis is oddly elusive.

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Coomb t1_jadsbp1 wrote

What exactly are you asking for? Are you asking for the range of irradiance under which humans can have "acceptable" vision, however you define that? Because if that's the case, it's going to vary by illuminating source. That is why you can't find convenient converters online. Stare at a light source that's putting out 100W in long range infrared and you can't see a thing, but your face will probably get warm if you're close enough. On the other hand, stare at a white LED that's putting out 100W across the visual spectrum and it's going to look pretty darn bright. Unfortunately, the luminous efficacy (how bright a light source of a particular wavelength appears to a human being given a certain amount of emitted flux) is variable based not only on wavelength but also on overall lighting conditions, because the sensors in your eye which are used at low light have different wavelength dependent response than the sensors in your eye that are used in brighter light.

Lux is the unit for radiative flux that is useful for human vision. It's the unit which is intended to reflect how bright a light source actually looks, without regard to how much total radiation is coming out of it. The range of human vision, in terms of being able to develop a useful visual picture based on the incoming light, is roughly 10^-5 to 10^+5 lux. If we make the further assumption that even at very low radiation power the eye is most sensitive to 555 nanometer wavelength light (which is not true) and use the conversion for luminous flux to radiative flux assuming that all of the light is monochromatic 555 nm light, we have 683 lux = 1 W/m^2. These edges aren't exactly precise, so let's just use 10^3 as the conversion factor between lux and watts per square meter, in which case we get a visual range of 10^-8 to 10^2 W/m^2.

Again, there's no single answer to your question. It's underdetermined. But as a general estimate the above is somewhat reasonable.

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DeismAccountant OP t1_jadwsa6 wrote

As I said, I generally accept the range of 380-780nm (although I hope to see experiments on expanded human vision in the future) as the limits of wavelength when building the axis opposite to irradiance, and 555nm is all the site gave me.

For now I’m hoping I can find a way to trace a feasible range on the chart in the last page.

Your comment is appreciated. I know someone else left a reply but I think they’re shadowbanned?

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Coomb t1_jae4c5k wrote

The last chart you linked has nothing to do with human vision at all. It's just a chart of how much power per unit area a black body puts out if it's at a given temperature (as well as the wavelength of the maximum emitted spectral irradiance at that temperature).

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DeismAccountant OP t1_jae4zo7 wrote

In terms of irradiance, it’s the closest thing I have. At least it outlines where the visual spectrum is so I can zoom in on it Like this. Would you at least say it’s accurate?

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