Principles of Dynamics |
Contents
3 | 61 |
DYNAMICS OF A SYSTEM OF PARTICLES | 130 |
ORBITAL MOTION | 185 |
Copyright | |
6 other sections not shown
Other editions - View all
Common terms and phrases
acceleration angle angular momentum angular velocity assume axes axial axis of symmetry calculate cartesian center of mass circular coefficient components constant constraint forces coordinate system corresponding cos² degrees of freedom differential equations direction disk ellipsoid equal equations of motion equilibrium evaluated example expression fixed point force F frequency friction function given in Eq gravitational H₂ Hence horizontal impulse inertia ellipsoid initial conditions instantaneous center integral kinetic energy Lagrange's equations let us consider m₁ m₂ magnitude matrix mode moments of inertia moves obtain orbit orthogonal p₁ particle of mass plane polhode potential energy principal axis products of inertia radius reference frame reference point relative result rigid body rocket rotational motion scalar seen shown in Fig sin² sliding solve sphere unit vectors vertical virtual displacement write x₁ xyz system zero