Planck's constant: Difference between revisions
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Planck discovered in 1901 his constant in his study of [[black-body radiation]]. | The '''Planck constant''' (denoted '''''h''''') is a natural constant named after [[Max Planck]], one of the founders of quantum theory. Its value is approximately ''h'' = 6.63 × 10<sup>-34</sup> J s. A closely-related quantity is the '''reduced Planck constant''' (also known as '''Dirac's constant''' and denoted '''''ħ''''', pronounced "h-bar"). | ||
Planck discovered in 1901 his constant in his study of [[Black-body_radiation|black-body radiation]] and formulated a law ("Plancks's law") for the density of black-body radiation as a function of temperature. Four years later Einstein rederived Planck's law by assuming that electromagnetic radiation consists of parcels of energy hν, where ν is the frequency of the radiation. | |||
These energy parcels are now called [[photons]]. The Planck constant is ubiquitous in [[quantum mechanics]]. For instance, it appears in the [[Schrödinger equation]]. Its small size is the main reason that quantum effects are only noticeable for microscopic particles such as electrons and nuclei. | |||
==Units, value and symbols== | ==Units, value and symbols== | ||
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The value of the Planck constant is: | The value of the Planck constant is: | ||
:<math>h =\,\,\, 6.626\ 068\ 96(33) \times10^{-34}\ \mbox{J}\cdot\mbox{s} \,\,\, = \,\,\, 4.135\ 667\ 33(10) \times10^{-15}\ \mbox{eV}\cdot\mbox{s}</math> | :<math>h =\,\,\, 6.626\ 068\ 96(33) \times10^{-34}\ \mbox{J}\cdot\mbox{s} \,\,\, = \,\,\, 4.135\ 667\ 33(10) \times10^{-15}\ \mbox{eV}\cdot\mbox{s}.</math><ref name="NISTh">{{cite web |url=http://physics.nist.gov/cgi-bin/cuu/Value?h |title=Planck constant |accessdate=2007-08-08 |work=2006 [[CODATA]] recommended values |publisher=[[NIST]] }}</ref> | ||
The two digits between the parentheses denote the standard uncertainty in the last two digits of the value. | The two digits between the parentheses denote the standard uncertainty in the last two digits of the value. | ||
The value of the Dirac constant is: | The value of the Dirac constant is: | ||
:<math>\hbar\ \equiv \frac{h}{2\pi} = \,\,\, 1.054\ 571\ 628(53)\times10^{-34}\ \mbox{J}\cdot\mbox{s} \,\,\, = \,\,\, 6.582\ 118\ 99(16) \times10^{-16}\ \mbox{eV}\cdot\mbox{s}</math> | :<math>\hbar\ \equiv \frac{h}{2\pi} = \,\,\, 1.054\ 571\ 628(53)\times10^{-34}\ \mbox{J}\cdot\mbox{s} \,\,\, = \,\,\, 6.582\ 118\ 99(16) \times10^{-16}\ \mbox{eV}\cdot\mbox{s}.</math><ref name="NISThbar">{{cite web |url=http://physics.nist.gov/cgi-bin/cuu/Value?hbar |title=Planck constant over 2 pi |accessdate=2007-08-08 |work=2006 [[CODATA]] recommended values |publisher=[[NIST]] }}</ref> | ||
==Footnotes== | |||
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Latest revision as of 16:00, 4 October 2024
The Planck constant (denoted h) is a natural constant named after Max Planck, one of the founders of quantum theory. Its value is approximately h = 6.63 × 10-34 J s. A closely-related quantity is the reduced Planck constant (also known as Dirac's constant and denoted ħ, pronounced "h-bar").
Planck discovered in 1901 his constant in his study of black-body radiation and formulated a law ("Plancks's law") for the density of black-body radiation as a function of temperature. Four years later Einstein rederived Planck's law by assuming that electromagnetic radiation consists of parcels of energy hν, where ν is the frequency of the radiation. These energy parcels are now called photons. The Planck constant is ubiquitous in quantum mechanics. For instance, it appears in the Schrödinger equation. Its small size is the main reason that quantum effects are only noticeable for microscopic particles such as electrons and nuclei.
Units, value and symbols
The Planck constant has dimensions of energy multiplied by time, which are also the dimensions of action. In SI units, the Planck constant is expressed in joule-seconds. The dimensions may also be written as momentum times distance (N·m·s), which are also the dimensions of angular momentum.
The value of the Planck constant is:
The two digits between the parentheses denote the standard uncertainty in the last two digits of the value.
The value of the Dirac constant is:
Footnotes
- ↑ Planck constant. 2006 CODATA recommended values. NIST. Retrieved on 2007-08-08.
- ↑ Planck constant over 2 pi. 2006 CODATA recommended values. NIST. Retrieved on 2007-08-08.