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本文就血球容积 Het、纤维蛋白原容积 F 和血清大蛋白分子(分子量>50,000)容积 P 对血液比粘度η和血液电阻率ρ的影响,在进行实验的基础上,作了理论上的探讨,提出了关系式。dη/η=β_1d(Het)+β_2d(P)+β_3d(F)。这一公式解释了本文中的实验结果。在进而提出了关系式β_1d(Het)+β_2d(P)+β_3d(F)=K’(dρ/ρ)之后,即可导出王鸿儒等人的血液粘度与血液电阻率之间的经验公式η=2.105ρ+0.213。作为本文提出关系式的特例,即血浆成分正常时,还可导出Masakazu 等人的血液电阻率与血球容积之间的经验公式ρ=65.8exp(0.171Het)。上面提出的公式是一种近似的形式。当α=7/5时,即得出较为普遍的形式,dη/η~(7/5)=β_1d(Het)+β_2d(P)+β_3d(F),它与建立在 Roscoe 公式和Taylor 公式基础上的 Dintenfass 血粘度公式η=(1-kCT)~(-2.5)一致。上述各点,表明了本文所作的理论解释是正确的。
In this paper, the impact of hematocrit Het, fibrinogen volume F and serum large protein molecule (molecular weight> 50,000) volume P on blood specific viscosity η and blood resistivity ρ, based on the experiments, made a theoretical discussion, Proposed the relationship. dη / η = β_1d (Het) + β_2d (P) + β_3d (F). This formula explains the experimental results in this article. After further proposed the relation β_1d (Het) + β_2d (P) + β_3d (F) = K ’(dρ / ρ), we can deduce the empirical formula between the blood viscosity and blood resistivity of Wang Hongru et al = 2.105ρ + 0.213. As a special case of the equation presented here, that is, when plasma components are normal, an empirical formula ρ = 65.8exp (0.171 Het) between Masakazu et al.’s hematocrit and hematocrit can also be derived. The formula presented above is an approximation. When α = 7/5, we get the more general form, which is related to the formula established by Roscoe formula and Taylor formula Based on the Dintenfass blood viscosity formula η = (1-kCT) ~ (-2.5) consistent. The above points show that the theoretical interpretation made in this paper is correct.