Abstract
Results of an experimental investigation of the average heat transfer of a sphere in the region of Reynolds numbers 0.1–40 are given. The increase in the Nusselt number with increase in the constraint parameter of flow is established. Based on the fractal theory, the influence of the degree of constraint on the heat transfer is physically explained and a quantitative correction is introduced.
Similar content being viewed by others
REFERENCES
J. Happel and H. Brenner, Low Reynolds Number Hydrodynamics [Russian translation], Moscow (1976).
S. I. Isataev, Zh. S. Akylbaev, and A. Zh. Turmukhambetov, Aerohydrodynamics and Heat Exchange of Curvilinear Bodies [in Russian], Almaty (1996).
S. I. Isataev and A. Zh. Turmukhambetov, Prikl. Teor. Fiz. (Almaty), Issue 5, 264-269 (1973).
S. I. Isataev, V. V. Polzik, A. Zh. Turmukhambetov, and A. K. Tul'taeva, Teplofiz. Radiats. Fiz. (Almaty), 2, 112-113 (1979).
Z. Zh. Zhanabaev and A. Zh. Turmukhambetov, in: Proc. Int. Conf. "Chaos and Structure in Nonlinear Systems. Theory and Experiment" [in Russian], Karaganda (1997), pp. 105-111.
Z. Zh. Zhanabaev and A. Z. Turmukhambetov, in: Proc. Symp. "Problems of Applied Aerodynamics, Heat and Mass Exchange, and Combustion" [in Russian], Almaty (1997), pp. 53-54.
A. Zh. Turmukhambetov, Vestn. Akad. Nauk Resp. Kazakhstan, No. 5, 77-83 (1999).
V. N. Shtern in: M. A. Gol'dshtik (ed.), Structural Turbulence [in Russian], Novosibirsk (1982).
Z. Zh. Zhanabaev, Izv. Sib. Otd. Akad. Nauk SSSR, Ser. Tekh. Nauk, Issue 4, No. 15, 57-60 (1988).
Z. Zh. Zhanabaev, S. B. Tarasov, and A. K. Nagmetzhanov, in: Proc. Int. Sem. "Stability of Flows of Homogeneous and Heterogeneous Liquids" [in Russian], Novosibirsk (1998), pp. 14-20.
Z. Zh. Zhanabaev and A. Zh. Turmukhambetov, in: Proc. IVth Minsk Int. Forum "Heat and Mass Transfer-MIF-2000," Minsk, May 22-26, 2000 [in Russian], Vol. 5, Minsk (2000), pp. 273-277.
Author information
Authors and Affiliations
Rights and permissions
About this article
Cite this article
Turmukhambetov, A.Z. Heat Transfer of a Sphere in a Constrained Flow of a Viscous Fluid. Journal of Engineering Physics and Thermophysics 74, 759–764 (2001). https://doi.org/10.1023/A:1016785000780
Issue Date:
DOI: https://doi.org/10.1023/A:1016785000780