摘要
论证不通过惯性系原点作惯性直线运动的质点及在角动量守恒的条件下作曲线运动的质点均有形式相同的离开原点的惯性离心力.推导在位矢方向牛顿力与惯性离心力共存时力和总加速度的一般关系式及特殊关系式.
It was proved that the particle which does inertial linear motion not through the inertial system origin has the same form with the parrticle which does curve motion under the condition of angular momentum conservation.That is to say,they both have the form of inertial centrifugal force away from the origin.Furthermorer,we deduce the general relation and special relation between the force and the total acceleration while the newton force coexists with the inertial centrifugal force in the direction of position vector.
出处
《枣庄学院学报》
2010年第5期1-5,共5页
Journal of Zaozhuang University
关键词
顺径速度
垂径速度
直线惯性离心加速度
曲线惯性离心加速度
顺径核心方程
核心方程的惯性离心力
radial velocity
lateral velocity
linear intertial centrifugal acceleration
curve inertial centrifugal acceleration
radial master equatioon
inertial centrifugal force of master equation
