Illuminance Explained

Illuminance
Unit:lux
Otherunits:phot, foot-candle
Baseunits:cd·sr·m−2
Dimension:

L-2J

In photometry, illuminance is the total luminous flux incident on a surface, per unit area.[1] It is a measure of how much the incident light illuminates the surface, wavelength-weighted by the luminosity function to correlate with human brightness perception.[2] Similarly, luminous emittance is the luminous flux per unit area emitted from a surface. Luminous emittance is also known as luminous exitance.[3]

In SI units illuminance is measured in lux (lx), or equivalently in lumens per square metre (lm·m−2). Luminous exitance is measured in lm·m−2 only, not lux.[4] In the CGS system, the unit of illuminance is the phot, which is equal to . The foot-candle is a non-metric unit of illuminance that is used in photography.[5]

Illuminance was formerly often called brightness, but this leads to confusion with other uses of the word, such as to mean luminance. "Brightness" should never be used for quantitative description, but only for nonquantitative references to physiological sensations and perceptions of light.

The human eye is capable of seeing somewhat more than a 2 trillion-fold range. The presence of white objects is somewhat discernible under starlight, at (50 μlx), while at the bright end, it is possible to read large text at 108 lux (100 Mlx), or about 1000 times that of direct sunlight, although this can be very uncomfortable and cause long-lasting afterimages.

Common illuminance levels

Lighting condition Foot-candles Lux
Sunlight 10,000 [6] 100,000
Shade on a sunny day 1,000 10,000
Overcast day 100 1,000
Very dark day 10 100
Twilight 1 10
Deep twilight 0.1 1
Full moon 0.01 0.1
Quarter moon 0.001 0.01
Starlight 0.0001 0.001
Overcast night0.00001 0.0001

Astronomy

In astronomy, the illuminance stars cast on the Earth's atmosphere is used as a measure of their brightness. The usual units are apparent magnitudes in the visible band.[7] V-magnitudes can be converted to lux using the formula[8] E_\mathrm = 10^,where Ev is the illuminance in lux, and mv is the apparent magnitude. The reverse conversion ism_\mathrm = -14.18 - 2.5 \log(E_\mathrm).

Relation to luminance

The luminance of a reflecting surface is related to the illuminance it receives:\int_ L_\mathrm \mathrm\Omega_\Sigma \cos \theta_\Sigma = M_\mathrm = E_\mathrm Rwhere the integral covers all the directions of emission, and

In the case of a perfectly diffuse reflector (also called a Lambertian reflector), the luminance is isotropic, per Lambert's cosine law. Then the relationship is simplyL_\mathrm = \frac

See also

External links

Notes and References

  1. Encyclopedia: Illuminance, 17-21-060 . CIE S 017:2020 ILV: International Lighting Vocabulary, 2nd edition. . CIE - International Commission on Illumination . 20 April 2023 . 2020 .
  2. International Electrotechnical Commission (IEC): International Electrotechnical Vocabulary. ref. 845-21-060, illuminance
  3. http://www.drdrbill.com/downloads/optics/photometry/Exitance.pdf Luminous exitance
  4. International Electrotechnical Commission (IEC): International Electrotechnical Vocabulary. ref. 845-21-081, luminous exitance
  5. One phot =, according to http://www.unitconversion.org/unit_converter/illumination.html
  6. Web site: https://web.archive.org/web/20220403223446/https://www.engineeringtoolbox.com/light-level-rooms-d_708.html. Illuminance - Recommended Light Level. July 7, 2022. April 3, 2022. The Engineering ToolBox. live.
  7. Web site: Radiometry and photometry in astronomy FAQ, section 7 . Paul . Schlyter.
  8. Web site: Formulae for converting to and from astronomy-relevant units . Nov 23, 2013 . December 2, 2013 . https://web.archive.org/web/20131202231237/http://members.ziggo.nl/jhm.vangastel/Astronomy/Formules.pdf . dead .