Variable mass systems are a classic example of open systems in classical mechanics with rockets being a standard practical example. Due to the changing mass, the angular momentum of these systems is not generally conserved. Here, we show that the angular momentum vector of a free variable mass system is fixed in inertial space and, thus, is a partially conserved quantity. It is well known that such conservation rules allow simpler approaches to solving the equations of motion. This is demonstrated by using a graphical technique to obtain an analytic solution for the second Euler angle that characterizes nutation in spinning bodies
A theoretical study was made of the angular motions of spinning bodies in space. The analysis was ba...
During the violent relaxation of a self-gravitating system, a significant fraction of its mass may b...
Perez Laraudogoitia (1996) presented an isolated system of infinitely many particles with infinite t...
Variable mass systems are a classic example of open systems in classical mechanics with rockets bein...
In classical mechanics, the ‘geometry of motion’ refers to a development to visualize the motion of ...
Angular momentum (a vector) is introduced. The rate of change of angular momentum is related to the ...
<p></p><p>Abstract One of the main points of classical mechanics courses, the conservation law of an...
In the absence of a net external torque on an object, angular momentum is conserved. When an object ...
Whittaker’s mass variation law in variable mass dynamics is applied to many body problem of celest...
Restricted Access.For a classical-mechanical system of any fixed number of particles it is observed ...
Conserved quantities â mass, linear momentum, center of mass, and angular momentum â are importa...
The model system consisting of a free particle is revisited in order to fully exploit it as a teachi...
This paper explores the various analytical links between the free attitude motions of spinning bodie...
For rotation-invariant Hamiltonian systems, canonical angular momentum is conserved. In beam optics,...
Concepts and mathematical instruments used in elementary mechanics are often perceived as abstract e...
A theoretical study was made of the angular motions of spinning bodies in space. The analysis was ba...
During the violent relaxation of a self-gravitating system, a significant fraction of its mass may b...
Perez Laraudogoitia (1996) presented an isolated system of infinitely many particles with infinite t...
Variable mass systems are a classic example of open systems in classical mechanics with rockets bein...
In classical mechanics, the ‘geometry of motion’ refers to a development to visualize the motion of ...
Angular momentum (a vector) is introduced. The rate of change of angular momentum is related to the ...
<p></p><p>Abstract One of the main points of classical mechanics courses, the conservation law of an...
In the absence of a net external torque on an object, angular momentum is conserved. When an object ...
Whittaker’s mass variation law in variable mass dynamics is applied to many body problem of celest...
Restricted Access.For a classical-mechanical system of any fixed number of particles it is observed ...
Conserved quantities â mass, linear momentum, center of mass, and angular momentum â are importa...
The model system consisting of a free particle is revisited in order to fully exploit it as a teachi...
This paper explores the various analytical links between the free attitude motions of spinning bodie...
For rotation-invariant Hamiltonian systems, canonical angular momentum is conserved. In beam optics,...
Concepts and mathematical instruments used in elementary mechanics are often perceived as abstract e...
A theoretical study was made of the angular motions of spinning bodies in space. The analysis was ba...
During the violent relaxation of a self-gravitating system, a significant fraction of its mass may b...
Perez Laraudogoitia (1996) presented an isolated system of infinitely many particles with infinite t...