应用粘性流体动力学基本方程,分析了聚合物物料在螺槽中的流动。
The flow of rubber compound in the screw channel was analyzed with the basic equation of the viscous fluid kinetics.
针对典型形状微通道(微缝隙)在滑移边界条件下,利用粘性流体运动方程和动量方程,推导出速度场和流动阻力。
Aimed at typical shape micro-channel (fissure) under slip confine condition, it used dauby fluid motion equation and momentum equation, derived pace bout and running resistance.
本文由粘性流体动力学方程组导出溶潭内涡旋、速度及温度的分布。
The distribution of vorticity, velocity and temperature of the melt puddle were obtained by the viscous hydrodynamic equations.
本文提出了基于微分-积分方程组求解n - S方程的有限差分法求解不可压缩实际粘性流体绕孤立翼型流动。
A finite difference method based on differential-integral equation is presented for the solution of Navier-Stokes equations for incompressible viscous flow.
用粘性流体力学基本方程进行了模拟计算,计算部分着重分析物料特性参数及螺杆主要几何参数。
According to viscous fluid mechanics equation, simulating calculations that focus on properties of composites and geometry of screw were developed.
本文的研究结果使粘性流体力学中的N—S方程又增添一例准确解,对工程实践中的具体问题有实用价值和指导意义。
Velocity sections are shown by electric computer. The studying in this paper not only make N—S function add a exact solution but also have practical value for engineering problem.
本文的研究结果使粘性流体力学中的N—S方程又增添一例准确解,对工程实践中的具体问题有实用价值和指导意义。
Velocity sections are shown by electric computer. The studying in this paper not only make N—S function add a exact solution but also have practical value for engineering problem.
应用推荐