Newton's laws of motion Guide, Meaning , Facts, Information and Description
Newton's laws of motion are the three scientific laws which Isaac Newton discovered concerning the behaviour of moving bodies. These laws are fundamental to classical mechanics.Newton first published these laws in Philosophiae Naturalis Principia Mathematica (1687) and used them to prove many results concerning the motion of physical objects. In the third volume (of the text), he showed how, combined with his law of universal gravitation, the laws of motion would explain Kepler's laws of planetary motion.
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2 Newton's first law 3 Newton's second law 4 Newton's third law 5 Weak and strong forms of Newton's third law 6 See also |
Importance of Newton's laws of motion
Newton's laws of motion, together with his law of universal gravitation and the mathematical techniques of calculus, provided for the first time a unified quantitative explanation for a wide range of physical phenomena such as: the motion of spinning bodies, motion of bodies in fluids; projectiles; motion on an inclined plane; motion of a pendulum; the tides; the orbits of the Moon and the planets. The law of conservation of momentum, which Newton derived as a corollary of his second and third laws, was the first conservation law to be discovered.
Newton's laws were verified by experiment and observation for over 200 years, until 1916, when they were superseded by Einstein's theory of relativity. Newton's laws still provide a completely adequate approximation for the behaviour of objects in "everyday" situations.
Alternative formulations:
Newton's first law
This law is also called the Law of Inertia or Galileo's Principle.
Another important point, that is implicit in the two alternative formulations, is that if this law is true for one object relative to a defined reference frame, then it is also true for any object relative to that reference frame. The first law can therefore be taken as a definition of an intertial reference frame i.e. an inertial reference frame is a reference frame in which Newton's first law is true.
In less formal terms, Aristotle thought that things stood still if you left them alone; that to be at rest was natural; and that movement needed a cause. But Newton (and Galileo) taught us that "Things travel naturally at a steady speed (which may or may not be zero), if left alone"; it is acceleration that requires a cause - and we call this cause a force.
This means that a stationary object will remain stationary, and a moving object will continue to move (in a straight line and at a constant speed), unless a force acts upon it. In everyday life, the force of friction usually acts upon moving objects. Newton's law indicates that some force (gravity) must be acting upon the planets, as they do not travel in a straight line.
Alternative formulations:
Newton's second law
This is expressed by the equation:
- F = ma
- F = force
- m = mass
- a = acceleration.
In the equation, F = ma, a is directly measurable but F is not. The second law only has meaning if we are able to assert, in advance, the value of F. Rules for calculating force include Newton's law of universal gravitation.
The most general form of Newton's second law is given in terms of the momentum p which is given by p=mv:
Alternative formulations:
Newton's third law
If you strike an object with a force of 200 N, then the object also strikes you (with a force of 200 N). Not only does a bullet exert force upon a target; but, the target exerts equal force upon the bullet. Not only do planets accelerate toward stars; but, stars accelerate toward planets. The reaction force has the opposite direction of action, and is of the same type and magnitude as the original force. However, it doesn't necessarily "line up" in space with the action. One example of this is a force on an electric dipole due to a point charge, when the dipole points in a direction perpendicular to the line connecting the point charge and the dipole. The force on the dipole due to the point charge is perpendicular to the line connecting them, so there is a reaction force on the point charge in the opposite direction, but these two force vectors are parallel and, even when extended to a line, they never cross each other in space.
It is often contended that Newton's third law is incorrect when electromagnetic forces are included: if a body A exerts a force on body B, then body B will in general exert a different force on body A (the force considered is the Lorentz force, generated by electric and magnetic fields). Modern theory predicts that the electromagnetic field generated by such interactions itself transports momentum via electromagnetic radiation. Newton's third law becomes correct if the momentum of the field is included in the calculations..
Also see: Physics Study Guide
The so-called "weak form" of Newton's Third Law applies for classical physical forces. In a system of particles, let represent the force exerted on particle due to particle . The weak form requires that:
The "strong form" of Newton's Third Law requires that, in addition to being equal and opposite, the forces must be directed along the line connecting the two particles. Gravitational force satisfies the strong form, while electromagnetic forces satisfy the weak form. For an example in electrostatics where the strong form is not obeyed, consider the interaction between a point charge and a perfect dipole aligned in a direction perpendicular to the line connecting the charge and the dipole.
The weak form is a valuable mathematical abstraction, because it allows one to study concepts such as the center of mass in the presence of arbitrary forces.Weak and strong forms of Newton's third law
All classical physical forces satisfy this condition.