Newton's Laws

Newton's first and second laws, in Latin, from the original 1687 edition of Principia Mathematica .

In 1687 Isaac Newton's work Philosophiae Naturalis Principia Mathematica ( Latin ; 'Mathematical Principles of Natural Philosophy ') appeared, in which Newton formulated three principles ( laws ) of motion , which were Newtonian axioms , basic laws of motion , Newtonian principles or also Newtonian Laws are known. In Newton's work they are referred to as Lex prima , Lex secunda and Lex tertia ('First / Second / Third Law'), together with axiomata, sive leges motus (' axioms or laws of motion').

These laws form the foundation of classical mechanics . Although they do not apply unreservedly in the context of modern physical theories such as quantum mechanics and relativity, they can be used to make reliable predictions within a wide range of validity .

Usually the following three laws are mentioned, which in a very simplified form read as follows:

A body free of force remains at rest or moves in a straight line at a constant speed.
Force equals mass times acceleration . ( ) ${\ displaystyle {\ vec {F}} = m \ cdot {\ vec {a}}}$
Force equals opposing force : A force from body A to body B is always accompanied by an equally large but opposing force from body B to body A.
${\ displaystyle {\ vec {F}} _ {A \ to B} = - {\ vec {F}} _ {B \ to A}}$

Newton already assumed that two forces can be combined with a force parallelogram to form one resulting force. The axiom of the parallelogram of forces is also called Newton's fourth law. In modern literature, on the other hand, the superposition principle is usually mentioned as the fourth Newtonian law.

First Newton's Law

The first Newtonian law is also called lex prima , the principle of inertia , the law of inertia or the inertial law . The principle of inertia makes statements about the movement of physical bodies in inertial systems . There are different versions:

"A body remains in a state of rest or uniform, straight-line movement, unless it is forced to change its state by acting forces ."

Original Latin text:

Corpus omne perseverare in statu suo quiescendi vel movendi uniformiter in directum, nisi quatenus illud a viribus impressis cogitur statum suum mutare.

The speed is therefore constant in amount and direction. A change in the state of motion can only be achieved by exerting an external force , for example through gravitational force or the force of friction . ${\ displaystyle {\ vec {v}}}$

Other versions read:

If there is no force acting on a body, its speed is constant over time.

If no force acts on a mass point, its momentum is constant. The momentum is the product of mass and speed.

In these forms the sentence is only valid when there is no force at all . The reverse, that no force acts when it moves at constant speed, does not follow from this. In this case, several forces can act on him that cancel each other out. In this case there is no resulting force .

For a mass point, Newton's first law corresponds to the equilibrium conditions . For extended bodies, the torque balance must also be checked.

Galileo Galilei was the first to recognize the principle of inertia at the beginning of the 17th century and already formulated that the force-free movement could continue in a straight line as far as desired. He used this for the first correct treatment of the movements of bodies on earth in free fall , inclined throw and on the inclined plane . René Descartes gave the first clear formulation as a general principle of force-free movements in 1644, but it was only Newton that applied the principle of inertia to the movements of extraterrestrial bodies. This is also his special achievement: in the works of antiquity, which were still regarded as correct up to the late Middle Ages, it was believed that the movements on earth and those in the sky obey different laws. Newton recognized them as two special cases of a general law. In addition, Newton declared the straight, unaccelerated movement to be the norm. Only when the movement of a body deviates from this, one has to explain this with the effect of forces. Shortly before Newton it was assumed that circular motion would be the normal case.

The above versions only apply if the movement is described in an inertial frame. Newton's first law is then only a special case of the second. In modern works on theoretical mechanics , the reference system is usually first defined and the first Newtonian axiom is then introduced in one of the following versions or similar versions.

There are reference systems in which the force-free movement takes place at a constant speed. These are inertial systems .

There are coordinate systems in which every force-free mass point moves in a straight line or is at rest. These particularly important coordinate systems are called inertial systems.

It is then determined which properties must apply to inertial systems. (In particular, they must not rotate or be accelerated.) The first Newtonian axiom is thus used as a definition for the concept of the inertial system.

Second Newton's Law

Newton's second law is also called the lex secunda or principle of action .

It is the basis for many equations of motion in mechanics :

"The change in movement is proportional to the effect of the moving force and happens in the direction of the straight line in which that force acts."

Original Latin text:

"Mutationem motus proportionalem esse vi motrici impressae, et fieri secundum lineam rectam qua vis illa imprimitur."

Formally, this relationship between force and change in motion is expressed as

{\ displaystyle {\ dot {\ vec {v}}} \ propto {\ vec {F}}}

The point above a letter is the notation introduced by Newton in another context for the temporal change of a physical quantity . The sign in between means proportional , i.e. standing in a fixed relationship. ${\ displaystyle \ propto}$

In Newton's original work, expressed in modern terms, the generally applicable formulation (with the impulse ) was already described. Newton's writings work with geometric representations of the limit values of distance and area relationships. The representation is also called the momentum set , especially in literature on technical mechanics and fluid mechanics . In words, it means that the change in momentum of a body over time corresponds to the resulting external force acting on this body. This representation is more general than the Euler form mentioned below, since it also applies to bodies with variable mass. The law of momentum is of great importance when calculating impacts from bodies that can no longer be regarded as point-shaped. It can also be represented in integral form with the impulses and at the time or : ${\ displaystyle {\ vec {F}} = {\ dot {\ vec {p}}}}$ ${\ displaystyle {\ vec {p}}}$ ${\ displaystyle {\ vec {F}} = {\ dot {\ vec {p}}}}$ ${\ displaystyle {\ vec {p}} _ {0}}$ ${\ displaystyle {\ vec {p}} _ {1}}$ ${\ displaystyle t_ {0}}$ ${\ displaystyle t_ {1}}$

{\ displaystyle {\ vec {p}} _ {1} - {\ vec {p}} _ {0} = \ int _ {t0} ^ {t1} {\ vec {F}} (t) \, \ mathrm {d} t}

The force can therefore be seen as the cause of the change in momentum. The amount of the impulse changes only by forces that act in the direction of the movement of the body, while the direction of the impulse is changed by forces that are perpendicular to it. If the resulting force is zero, the law of conservation of momentum follows .

The law was first formulated in this form by Leonhard Euler in 1750 . It is the acceleration , that is a measure of the change in speed. ${\ displaystyle {\ vec {F}} = m {\ vec {a}}}$ ${\ displaystyle {\ vec {a}}}$

This equation is often called the basic equation of mechanics - regardless of whether in Newton's or Euler's formulation .

Third Newton's Law

Newton's third law, also called lex tertia , interaction principle , counteraction principle , or reaction principle , states:

“ Forces always appear in pairs. If a body A exerts a force on another body B ( actio ), an equally large but opposing force from body B acts on body A ( reaction ). "

Original Latin text:

" Actioni contrariam semper et aequalem esse reactionem: sive corporum duorum actiones in se mutuo semper esse aequales et in partes contrarias dirigi. "

{\ displaystyle {\ vec {F}} _ {A \ to B} = - {\ vec {F}} _ {B \ to A}}

The principle of interaction is also referred to as the principle of actio and reactio or, for short, " actio equals reactio " (lat. Actio est reactio ). Newton's third law presupposes an immediate action at a distance . Therefore it has no general validity in the special theory of relativity (and thus in electrodynamics ) and the general theory of relativity - here the momentum conservation of the entire system (particles plus radiation) applies . The principle of interaction can also be formulated in such a way that in a closed system the sum of the forces is zero, which is equivalent to conservation of momentum.

Superposition principle of forces

In Newton's work, the principle of undisturbed superposition or superposition principle of mechanics is described as an addition to the laws of motion.

“ If several forces act on a point (or a rigid body ) , these add up vectorially to form a resulting force . ${\ displaystyle {\ vec {F}} _ {1}, {\ vec {F}} _ {2}, \ dots, {\ vec {F}} _ {n}}$ ${\ displaystyle {\ vec {F}}}$ "

{\ displaystyle {\ vec {F}} _ {\ text {res}} = {\ vec {F}} _ {1} + {\ vec {F}} _ {2} + \ dots + {\ vec { F}} _ {n}}

This superposition principle was later also referred to as lex quarta , Newton's fourth law .

literature

Isaac Newton: Philosophiae Naturalis Principia Mathematica . 3. Edition. Innys, Regiae Societatis typographos, London 1726 ( uni-goettingen.de [accessed July 30, 2017]).
Jerry Marion, Stephen Thornton: Classical Dynamics of Particles and Systems. Harcourt College Publishers, 1995, ISBN 0-03-097302-3 .
GR Fowles, GL Cassiday: Analytical Mechanics. Saunders College Publishing, 6th Edition 1999, ISBN 0-03-022317-2 .
Ulrich Hoyer : Is Newton's second axiom of motion a law of nature? In: Journal for general philosophy of science. Volume VIII, 1977, pp. 292-301 doi: 10.1007 / BF01800698

Web links

Wikisource: Mathematische Principien der Naturlehre (Die Wolfers-Translation, 1872) - Sources and full texts

Individual evidence

^ Philosophiae naturalis principia mathematica. , London, 1726 p. 13 ( GDZ ) - almost also in the edition Geneva 1739, p. 20 ( digitized , 60 of 589): “Corpus omne perseverare in statu suo quiescendi vel movendi uniformiter in directum, nisi quatenus a viribus impressis cogitur statum illum mutare. "
↑ Brandt, Damen: Mechanik - From the mass point to the rigid body. Springer, 2016, p. 12.
^ Gross et al .: Technical Mechanics - Kinetics. 13th edition. Springer, 2015, p. 36.
↑ Stillman Drake: Galileo and the Law of Inertia . In: American Journal of Physics . tape 32 , 1964, pp. 601-608 , doi : 10.1119 / 1.1970872 .
^ Roberto Torretti: The Philosophy of Physics . Cambridge University Press, Cambridge 1999, pp. 20-30 .
↑ Lichtenegger: Key Concepts in Physics - from Newton's Axioms to Hawking Radiation. Springer, 2015, p. 14.
↑ Wilfried Kuhn: History of ideas in physics. Springer, 2nd edition, 2016, p. 218.
↑ Bartelmann et al. (Ed.): Theoretical Physics. Springer, 2015, p. 10.
↑ Fließbach: Textbook on Theoretical Physics I - Mechanics. 7th edition. Springer, 2015, p. 9.
↑ Henz, Langhanke: Paths through Theoretical Mechanics 1. Springer, 2016, p. 42.
Almost identical with Nolting: Basic Course Theoretical Physics 1 - Classical Mechanics. 10th edition. Springer, 2013, p. 173.
↑ H. Schrecker: The way to the physical concept of force from Aristotle to Newton. In: Natural sciences in the classroom physics / chemistry. 36, No. 34, 1988, ( abridged version ( Memento from January 20, 2012 in the Internet Archive )).
^ Dreyer: Technical Mechanics - Kinetics, Kinematics. 11th edition. Springer, pp. 123-125.
↑ Holzmann, Meyer, Schumpich: Technical Mechanics - Kinetics and Kinematics. 12th edition. Springer, pp. 123-125.
↑ Mahnken: Technical Mechanics - Dynamics. 2nd Edition. Springer, p. 329 f.
↑ Henz, Langhake: Paths through Theoretical Mechanics 1. Springer, 2016, p. 140
↑ Euler: Découverte dun nouveau principe de mécanique. Memoires de l'Academie royal des sciences, Berlin, Volume 6, 1752, p. 185 - Euler Opera Omnia, Series 2, Volume 5, 1957.
↑ Lecture notes on electrodynamics and the theory of relativity , p. 4 (PDF; 13.4 MB).

[NewtonPNPM13-1] Philosophiae naturalis principia mathematica. , London, 1726 p. 13 ( GDZ ) - almost also in the edition Geneva 1739, p. 20 ( digitized , 60 of 589): “Corpus omne perseverare in statu suo quiescendi vel movendi uniformiter in directum, nisi quatenus a viribus impressis cogitur statum illum mutare. "

[2] Brandt, Damen: Mechanik - From the mass point to the rigid body. Springer, 2016, p. 12.

[3] Gross et al .: Technical Mechanics - Kinetics. 13th edition. Springer, 2015, p. 36.

[4] Stillman Drake: Galileo and the Law of Inertia . In: American Journal of Physics . tape 32 , 1964, pp. 601-608 , doi : 10.1119 / 1.1970872 .

[Torretti_1999-5] Roberto Torretti: The Philosophy of Physics . Cambridge University Press, Cambridge 1999, pp. 20-30 .

[6] Lichtenegger: Key Concepts in Physics - from Newton's Axioms to Hawking Radiation. Springer, 2015, p. 14.

[7] Wilfried Kuhn: History of ideas in physics. Springer, 2nd edition, 2016, p. 218.

[8] Bartelmann et al. (Ed.): Theoretical Physics. Springer, 2015, p. 10.

[9] Fließbach: Textbook on Theoretical Physics I - Mechanics. 7th edition. Springer, 2015, p. 9.

[10] Henz, Langhanke: Paths through Theoretical Mechanics 1. Springer, 2016, p. 42.
Almost identical with Nolting: Basic Course Theoretical Physics 1 - Classical Mechanics. 10th edition. Springer, 2013, p. 173.

[11] H. Schrecker: The way to the physical concept of force from Aristotle to Newton. In: Natural sciences in the classroom physics / chemistry. 36, No. 34, 1988, ( abridged version ( Memento from January 20, 2012 in the Internet Archive )).

[12] Dreyer: Technical Mechanics - Kinetics, Kinematics. 11th edition. Springer, pp. 123-125.

[13] Holzmann, Meyer, Schumpich: Technical Mechanics - Kinetics and Kinematics. 12th edition. Springer, pp. 123-125.

[14] Mahnken: Technical Mechanics - Dynamics. 2nd Edition. Springer, p. 329 f.

[15] Henz, Langhake: Paths through Theoretical Mechanics 1. Springer, 2016, p. 140

[16] Euler: Découverte dun nouveau principe de mécanique. Memoires de l'Academie royal des sciences, Berlin, Volume 6, 1752, p. 185 - Euler Opera Omnia, Series 2, Volume 5, 1957.

[17] Lecture notes on electrodynamics and the theory of relativity , p. 4 (PDF; 13.4 MB).