Translation examples
Näiden hiukkasten lepomassa muodostaa noin 1 % protonin kokonaismassasta.
The rest masses of quarks contribute only about 1% of a proton's mass, however.
Tardioni tai bradioni kulkee valoa hitaammin, ja sillä on nollasta eroava lepomassa.
A tardyon or bradyon travels slower than light and has a non-zero rest mass.
Takioni (mainittu yllä) on hypoteettinen hiukkanen, joka kulkee valoa nopeammin, ja sillä on imaginaarinen lepomassa.
A tachyon (mentioned above) is a hypothetical particle that travels faster than the speed of light and has an imaginary rest mass.
Mikäli fotonilla on vaikkapa kaksi kertaa elektronin lepomassa (me) eli 1,022 MeV energiaa, saattaa muodostua elektroni ja positroni.
For incident photon energies E larger than two times the rest mass of the electron (1.022 MeV), pair production can occur.
Massalliselle kappaleelle, jonka lepomassa tai invariantti massa on m', neliliikemäärä määritellään: P = m U = m γ ( u ) ( c , u ) = ( E / c , p ) {\displaystyle \mathbf {P} =m\mathbf {U} =m\gamma (\mathbf {u} )(c,\mathbf {u} )=(E/c,\mathbf {p} )} missä liikkuvan kappaleen kokonaisenergia on: E = γ ( u ) m c 2 {\displaystyle E=\gamma (\mathbf {u} )mc^{2}} ja sen relativistinen kokonaisliikemäärä on: p = γ ( u ) m u {\displaystyle \mathbf {p} =\gamma (\mathbf {u} )m\mathbf {u} } Laskemalla neliliikemäärän sisätulo itsensä kanssa saadaan: ‖ P ‖ 2 = P μ P μ = m 2 U μ U μ = m 2 c 2 {\displaystyle \|\mathbf {P} \|^{2}=P^{\mu }P_{\mu }=m^{2}U^{\mu }U_{\mu }=m^{2}c^{2}} ja myös: ‖ P ‖ 2 = E 2 c 2 − p ⋅ p {\displaystyle \|\mathbf {P} \|^{2}={\frac {E^{2}}{c^{2}}}-\mathbf {p} \cdot \mathbf {p} } mistä saadaan kappaleen energian ja liikemäärän välinen yhteys: E 2 = c 2 p ⋅ p + ( m c 2 ) 2 . {\displaystyle E^{2}=c^{2}\mathbf {p} \cdot \mathbf {p} +(mc^{2})^{2}\,.} Tämä tulos on käyttökelpoinen relativistisessa mekaniikassa ja oleellisen tärkeä relativistisessa kvanttimekaniikassa sekä relativistisessa kvanttikenttäteoriassa, joita kaikkia sovelletaan hiukkasfysiikassa.
For a massive particle of rest mass (or invariant mass) m0, the four-momentum is given by: P = m 0 U = m 0 γ ( u ) ( c , u ) = ( E / c , p ) {\displaystyle \mathbf {P} =m_{0}\mathbf {U} =m_{0}\gamma (\mathbf {u} )(c,\mathbf {u} )=(E/c,\mathbf {p} )} where the total energy of the moving particle is: E = γ ( u ) m 0 c 2 {\displaystyle E=\gamma (\mathbf {u} )m_{0}c^{2}} and the total relativistic momentum is: p = γ ( u ) m 0 u {\displaystyle \mathbf {p} =\gamma (\mathbf {u} )m_{0}\mathbf {u} } Taking the inner product of the four-momentum with itself: ‖ P ‖ 2 = P μ P μ = m 0 2 U μ U μ = m 0 2 c 2 {\displaystyle \|\mathbf {P} \|^{2}=P^{\mu }P_{\mu }=m_{0}^{2}U^{\mu }U_{\mu }=m_{0}^{2}c^{2}} and also: ‖ P ‖ 2 = E 2 c 2 − p ⋅ p {\displaystyle \|\mathbf {P} \|^{2}={\frac {E^{2}}{c^{2}}}-\mathbf {p} \cdot \mathbf {p} } which leads to the energy–momentum relation: E 2 = c 2 p ⋅ p + ( m 0 c 2 ) 2 . {\displaystyle E^{2}=c^{2}\mathbf {p} \cdot \mathbf {p} +(m_{0}c^{2})^{2}\,.} This last relation is useful relativistic mechanics, essential in relativistic quantum mechanics and relativistic quantum field theory, all with applications to particle physics.
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