- Quantum
In

physics , a**quantum**(plural:**quanta**) is an indivisibleentity of a quantity that has the same units as thePlanck constant and is related to bothenergy andmomentum ofelementary particles ofmatter (calledfermions ) and ofphotons and otherbosons . The word comes from theLatin "quantus," for "how much." Behind this, one finds the fundamental notion that a physical property may be "quantized", referred to as "quantization". This means that the magnitude can take on only certain discretenumerical values, rather than any value, at least within a range. There is a related term ofquantum number .A

photon is often referred to as a "light quantum ." The energy of anelectron bound to anatom (at rest) is said to be quantized, which results in the stability of atoms, and ofmatter in general. But these terms can be a little misleading, because what is quantized is thisPlanck's constant quantity whose units can be viewed as either energy multiplied by time or momentum multiplied by distance.Usually referred to as quantum "mechanics," it is regarded by virtually every professional physicist as the most fundamental framework we have for understanding and describing nature at the infinitesimal level, for the very practical reason that it works. It is "in the nature of things", not a more or less arbitrary human preference.

**Development of quantum theory**Quantum theory, the branch of physics which is based on quantization, began in 1900 when

Max Planck published his theory explaining theemission spectrum of black bodies. In that paper Planck used the "Natural" system of units he invented the previous year.The consequences of the differences between classical andquantum mechanics quickly became obvious. But it was not until 1926, by the work ofWerner Heisenberg ,Erwin Schrödinger , and others, thatquantum mechanics became correctly formulated and understood mathematically. Despite tremendous experimental success, the philosophical interpretations of quantum theory are still widely debated.Planck was reluctant to accept the new idea of quantization, as were many others. But, with no acceptable alternative, he continued to work with the idea, and found his efforts were well received. Eighteen years later, when he accepted the

Nobel Prize in Physics for his contributions, he called it "a few weeks of the most strenuous work" of his life. During those few weeks, he even had to discard much of his own theoretical work from the preceding years. Quantization turned out to be the only way to describe the new and detailed experiments which were just then being performed. He did this practically overnight, openly reporting his change of mind to his scientific colleagues, in the October, November, and December meetings of theGerman Physical Society , inBerlin , where the black body work was being intensely discussed. In this way, careful experimentalists (includingFriedrich Paschen ,O.R. Lummer ,Ernst Pringsheim ,Heinrich Rubens , and F. Kurlbaum), and a reluctant theorist, ushered in a momentous scientific revolution.**The quantum black-body radiation formula**When a body is heated, it emits radiant

heat , a form ofelectromagnetic radiation in theinfrared region of the EM spectrum. All of this was well understood at the time, and of considerable practical importance. When the body becomes red-hot, the redwavelength parts start to become visible. This had been studied over the previous years, as the instruments were being developed. However, most of the heat radiation remains infrared, until the body becomes as hot as the surface of theSun (about 6000 K, where most of the light is green in color). This was not achievable in the laboratory at that time. What is more, measuring specific infrared wavelengths was only then becoming feasible, due to newly developed experimental techniques. Until then, most of theelectromagnetic spectrum was not measurable, and therefore blackbody emission had not been mapped out in detail.The quantum black-body radiation formula, being the very first piece of quantum mechanics, appeared Sunday evening October 7, 1900, in a so-called back-of-the-envelope calculation by Planck. It was based on a report by Rubens (visiting with his wife) of the very latest experimental findings in the infrared. Later that evening, Planck sent the formula on a postcard, which Rubens received the following morning. A couple of days later, he informed Planck that it worked perfectly. At first, it was just a fit to the data; only later did it turn out to enforce quantization.

This second step was only possible due to a certain amount of luck (or skill, even though Planck himself called it "a fortuitous guess at an interpolation formula"). It was during the course of polishing the mathematics of his formula that Planck stumbled upon the beginnings of Quantum Theory. Briefly stated, he had two mathematical expressions:

*(i) from the previous work on the red parts of the spectrum, he had "x";

*(ii) now, from the new infrared data, he got "x"².Combining these as "x"("a"+"x"), he still has "x", approximately, when "x" is much smaller than "a" (the red end of the spectrum); but now also "x"² (again approximately) when "x" is much larger than "a" (in the infrared). The formula for the energy "E", in a single mode of radiation at frequency "λ", and temperature "T", can be written

:$E\; =\; frac\{h\; lambda\}\{e^\{frac\{h\; lambda\}\{k\; T\; -\; 1\}$

This is (essentially) what is being compared with the experimental measurements. There are two parameters to determine from the data, written in the present form by the symbols used today: "h" is the new

Planck's constant , and "k" isBoltzmann's constant . Both have now become fundamental in physics, but that was by no means the case at the time. The "elementary quantum of energy" is "hλ". But such a unit does not normally exist, and is not required for quantization.**Beyond electromagnetic radiation**While quantization was first discovered in electromagnetic radiation, it describes a fundamental aspect of energy not just restricted to photons. [

*[*]*http://www.scienceagogo.com/news/20050110221715data_trunc_sys.shtml Real-World Quantum Effects Demonstrated*] February 11, 2005**The birthday of quantum mechanics**From the experiments, Planck deduced the numerical values of "h" and "k". Thus he could report, in the German Physical Society meeting on December 14, 1900, where quantization (of energy) was revealed for the first time, values of the Avogadro-Loschmidt number, the number of real molecules in a mole, and the unit of

electrical charge , which were more accurate than those known until then. This event has been referred to as "the birth of quantum mechanics".**ee also***

Quantum mechanics

*Quantum state

*Quantum number

*Quantum Leap (TV series)

*Quantum cryptography

*Quantum electronics

*Quantum computer

*Quantum entanglement

*Quantum coherence

*Quantum immortality

*Quantum lithography

*Quantum metrology

*Quantum sensor

*Quantum dot

*Magnetic flux quantum

*Quantum cellular automata

*Quantization

*Subatomic particle

*Elementary particle

*Photon polarization **References***J. Mehra and H. Rechenberg, "The Historical Development of Quantum Theory", Vol.1, Part 1, Springer-Verlag New York Inc., New York 1982.

*Lucretius, "On the Nature of the Universe", transl. from the Latin by R.E. Latham, Penguin Books Ltd., Harmondsworth 1951. There are, of course, many translations, and the translation's title varies. Some put emphasis on how things work, others on what things are found in nature.

*M. Planck, "A Survey of Physical Theory", transl. by R. Jones and D.H. Williams, Methuen & Co., Ltd., London 1925 (Dover editions 1960 and 1993) including the Nobel lecture.

**Notes**

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2010.*

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**quantum**— plur. quanta [ k(w)ɑ̃tɔm, k(w)ɑ̃ta ] n. m. • 1624; mot lat. « combien » 1 ♦ (par l angl.) Philos. Quantité déterminée. ♢ Dr., admin. Montant (d une amende, d une pension, d une part). 2 ♦ (1911; all … Encyclopédie Universelle**Quantum**— Quan tum, n.; pl. {Quanta}. [L., neuter of quantus how great, how much. See {Quantity},] 1. Quantity; amount. Without authenticating . . . the quantum of the charges. Burke. [1913 Webster] 2. (Math.) A definite portion of a manifoldness, limited… … The Collaborative International Dictionary of English**quantum**— (n.) 1610s, one s share or portion, from L. quantum how much, neuter singular of quantus how great (see QUANTITY (Cf. quantity)). Introduced in physics by Max Planck, 1900; reinforced by Einstein, 1905. Quantum theory is from 1912; quantum… … Etymology dictionary**Quantum 2**— Localisation Coordonnées … Wikipédia en Français**Quantum**— (von lateinisch für „wie viel“, „wie groß“) ist: ein umgangssprachlicher Begriff mit der Bedeutung eine bestimmte Menge oder eine bestimmte Anzahl eine ehemalige Automobilmarke; siehe Quantum (Automarke) ein US Unternehmen, das… … Deutsch Wikipedia**quantum**— index bulk, proportion, quantity, quota Burton s Legal Thesaurus. William C. Burton. 2006 … Law dictionary**quantum**— UK US /ˈkwɒntəm/ noun [C, usually singular] FORMAL ► an amount of something: quantum of sth »Earnings depend on the quantum of work done by you. »During this period, the quantum of oil production increased to 16.10 million barrels from 15.84… … Financial and business terms**Quantum**— Sn erw. fremd. Erkennbar fremd (16. Jh.) Entlehnung. Neutralform von l. quantus wieviel . Wird aus der Wissenschaftssprache und Kaufmannssprache übernommen und nicht eingedeutscht. Ebenso nndl. quantum, ne. quantum, nfrz. quantum, nschw.… … Etymologisches Wörterbuch der deutschen sprache**quantum**— |quantum| s. m. 1. Quantidade ou soma que não se designa. 2. Quantidade referente a cada um numa repartição. 3. Montante de uma indenização. 4. [Física] Quantidade mínima de energia que pode ser emitida, propagada ou absorvida. [A teoria dos… … Dicionário da Língua Portuguesa**Quantum**— Quantum: Der Ausdruck für »Menge, Anzahl; Anteil; ‹bestimmtes› Maß« wurde im 17. Jh. in der Kaufmannssprache aus lat. quantum, dem Neutrum von lat. quantus »wie groß, wie viel; so groß wie« übernommen. – Dazu: Quantität »Menge, Masse, Anzahl; (in … Das Herkunftswörterbuch**quantum**— [kwän′təm] n. pl. quanta [kwän′tə] [L, neut. sing. of quantus, how much: see QUANTITY] 1. quantity, or amount 2. a specified quantity; portion 3. in the quantum theory, a (or the) fixed, elemental unit, as of energy, angular momentum, etc … English World dictionary