Abstract
A method is shown and formulas are derived by which local angular radiation coefficients can be determined in certain two-body systems where the configuration is arbitrary but one of the bodies is either a cylinder or a rectangular plate.
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Abbreviations
- Ēint :
-
radiation vector of body 1
- intE :
-
intrinsic radiation intensity of body 1
- φ x,φ y,φ z :
-
components of the geometrical radiation vector along rectangular coordinates
- r0=√x2+z2 :
-
shortest distance from point M(x, y, z) to linear radiator
- γ ′0 ,γ ′'0 :
-
angles subtending the two segments of the linear radiator from point M(x, y, z) on area element 2 of irradiated surface
- l :
-
length of the cylinders
- x, y, z:
-
space coordinates of point M
Literature cited
A. G. Blokh, Fundamentals of Radiative Heat Transfer [in Russian], Gosénergoizdat (1962).
S. S. Kutateladze and V. M. Borishanskii, Textbook on Heat Transmission [in Russian], Gosénergoizdat (1959).
R. A. Sapozhnikov, Theoretical Photometry [in Russian], Izd. Énergiya, Leningrad (1967).
A. S. Nevskii, Radiative Heat Transfer in Furnaces and Ovens [in Russian], Metallurgizdat, Moscow (1959).
O. N. Favorskii and Ya. S. Kadaner, Problems of Heat Transfer in Space [in Russian], Izd. Vysshaya Shkola, Moscow (1967).
Yu. A. Surinov and S. V. Khorol'skii, Inzh.-Fiz. Zh.,14, No. 6 (1968).
F. M. Vafin, Teplofiz. Vys. Temp.,7, No. 4 (1969).
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Translated from Inzhenerno-Fizicheskii Zhurnal, Vol. 22, No. 6, pp. 1080–1088, June, 1972.
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Sokurenko, V.I., Shcherbakov, V.K. & Shcherbakov, Y.P. Determination of the local angular radiation coefficients in certain two-body systems. Journal of Engineering Physics 22, 750–755 (1972). https://doi.org/10.1007/BF00822985
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DOI: https://doi.org/10.1007/BF00822985