• A selective radiator, for which ε varies with wavelength
According to Kirchhoff’s law, for any material the spectral emissivity and spectral absorp-
tance of a body are equal at any specified temperature and wavelength. That is:
From this we obtain, for an opaque material (since α
λ
+ ρ
λ
= 1):
For highly polished materials ε
λ
approaches zero, so that for a perfectly reflecting materi-
al (
i.e.
a perfect mirror) we have:
For a graybody radiator, the Stefan-Boltzmann formula becomes:
This states that the total emissive power of a graybody is the same as a blackbody at the
same temperature reduced in proportion to the value of ε from the graybody.
Figure 25.8
Spectral radiant emittance of three types of radiators. 1: Spectral radiant emittance; 2: Wave-
length; 3: Blackbody; 4: Selective radiator; 5: Graybody.
Figure 25.9
Spectral emissivity of three types of radiators. 1: Spectral emissivity; 2: Wavelength; 3: Black-
body; 4: Graybody; 5: Selective radiator.
#T559950; r. AD/35720/35720; en-US
99
Summary of Contents for FLIR A6 Series
Page 1: ...User s manual FLIR A6xx series nbn Austria GmbH...
Page 2: ......
Page 3: ...User s manual FLIR A6xx series T559950 r AD 35720 35720 en US iii...
Page 4: ......
Page 8: ......
Page 71: ...Mechanical drawings 16 T559950 r AD 35720 35720 en US 63...
Page 81: ...CE Declaration of conformity 17 T559950 r AD 35720 35720 en US 73...
Page 82: ......
Page 84: ...Digital I O connection diagrams 19 T559950 r AD 35720 35720 en US 76...
Page 85: ......
Page 125: ......