Survey
* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project
Download Dynamics of particle systems (many body system)
Document related concepts
Negative mass wikipedia , lookup
Electromagnetism wikipedia , lookup
Woodward effect wikipedia , lookup
Mechanics of planar particle motion wikipedia , lookup
Centrifugal force wikipedia , lookup
Fictitious force wikipedia , lookup
Lorentz force wikipedia , lookup
Relativistic quantum mechanics wikipedia , lookup
Transcript
Dynamics Single Mechanical Particle Newton`s first law: If no net force acts on a body, it will move on a straight line at constant velocity or will stay at rest if it stays initially at rest. Inertial frame of reference: The frame of reference in which Newton`s first law is valid is called inertial frame of reference. Momentum: Product of the mass and the velocity vector of the mechanical particle. Particle Systems (Many Body Systems) Single Mechanical Particle Particle Systems (Many Body Systems) Newton`s second law: If a net external force acts on a body, then the body accelerates. The mass of the body multiplied by the acceleration vector of the body equals the net force vector. Momentum theorem: The first time derivate of the momentum vector of the body equals to the net force acts on the body. Momentum of the system – Momentum theorem: The first time derivate of the net momentum vector of the many body system equals to the vector sum of all external forces act on the particles of the system. Single Mechanical Particle Particle Systems (Many Body Systems) Newton`s third law („Action-reaction law”): If a body exerts a force on a second body, then the second body exerts a force on the first one. The two forces have the same magnitude, but they show in opposit direction. (The have same same direction but different derectionality). Internal forces, external forces: There are forces acting between particles. Forces can be: - External forces (acting from external outside source(s)) - Internal forces (acting between particles of the system) Action and reaction are always equal and opposite. Single Mechanical Particle Particle Systems (Many Body Systems) Newton`s fourth law („Superposition law”): If there are several forces acting simultaneously on a body, the net force equals to the vector sum of the acting forces. Center of mass: Center of mass is defined as the point with displacement vector of 𝑟𝑐 relative to O, where the net moment of the gravitational force exerted on the particles of the system is zero. Each of the forces exerts on the body as it would be alone. Single Mechanical Particle Particle Systems (Many Body Systems) Fundamental equation of dynamics: If there are several forces acting simultaneously on a body, the net force equals to the product of the mass and the acceleration vector of the body. In this case the net force holds all information from the neighbor (environment) of the body. External forces and motion of center of mass: Center of mass theorem: Belongs to the body Belongs to the environment If then: Center of mass moves as a point with mass of M and acceleration of 𝑎𝑐 . Conservation of center of mass: If the net external force is zero, then the velocity of center of mass is constant. In other words: Velocity of center of mass of an isolated system is constant. Conservation of momentum theorem: If the net force acts of the body is zero, then the momentum of the body is constant. It directly comes out from momentum theorem, if the force is zero. Conservation of momentum theorem: If no net external force acts on a particle system, then the total momentum of the whole system remains constant. This is valid in isolated system. Single Mechanical Particle Work: a.) Consider a body that undergoes a displacement of magnitude s along a straight line. While the body moves a constant force acts on it in the same direction as the displacement shows. b.) If the force and the displacement do not parallel to each other, then the work can be defined as: follows: c.) In general case: Particle Systems (Many Body Systems) Single Mechanical Particle Particle Systems (Many Body Systems) Energy: Collisions: Kinetic energy: 1 𝐸 = 2 𝑚𝑣 2 Work-energy theorem: The work done by the net force on a body equals the change in the kinetic energy of the body. In any collision in which the external force can be neglected, the momentum is conserved. a.) Completely inelastic collision: Total kinetic energy after the collision is less than before. The conservation of momentum gives the relationship: Work of the gravitational force in the field of gravity: b.) Elastic collision: The kinetic energy and the momentum is conserved. Single Mechanical Particle Work of the gravitational force is independent of the path taken from A to B. It depends only on the coordinates of the two end points (initial and final points) of the path. Conservative force: If the force force is independent of the path taken from A to B. It depends only on the coordinates of the two end points (initial and final points) of the path. The gravitational force is conservative force. The field of gravity is a conservative field. Potential energy: Particle Systems (Many Body Systems) Single Mechanical Particle Particle Systems (Many Body Systems) Conservation of mechanical energy theorem: In a conservative field the total mechanical energy (the sum of the potential and kinetic energy) is constant. It means the total energy is conserved. Consequence: If the body moves around a closed path (closed loop), the total work done by the conservative force is always zero. Nonconservative force = dissipative force, an example: Kinetic frictional force: , where perpendicular to the surface is Single Mechanical Particle Power – instantaneous power: The first time derivate of the work is defined as instantaneous power: SI unit of the dimension: In a special case: Particle Systems (Many Body Systems) Dinamics of the circular motion Single Mechanical Particle Particle Systems (Many Body Systems) Torque and angular momentum Torque or moment: Torque or moment is a physical quantity gives angular acceleration for a body. It has an important role at the rotational motion of a rigid body (see later.) Torque is the moment of a force relative to point O: : lever arm In the English literature the name moment is usually used as term of the moment of force. Torques is usually used for the net moment due to external forces in systems where the vector sum of these forces is zero. Single Mechanical Particle Particle Systems (Many Body Systems) Angular momentum The analog quantity of linear momentum (momentum) of a mechanical particle is called as angular momentum of a particle relative to a given point. Angular momentum of a particle systems: Angular momentum theorem: The rate of change of angular momentum of a particle equals to the moment or torque of the net force acts on it. In other words: The first time derivate of the angular momentum gives the torque or moment of the net force acts on it. Principle of conservation of angular momentum theorem: If the torque or moment of the net force acts on the body is zero, then the angular momentum of the body is constant. Angular momentum theorem: The net moment of the external forces acting on a particle system causes the change of the total angular momentum of the system. In other words: The first time derivate of the sum of the angular momentum vector of the system gives the total net moment vector of the system caused by all external forces. Principle of conservation of angular momentum theorem: If the net moment due to external forces acting on a particle system is zero, then the total angular momentum of the system remains constant.
