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Page 400
... mass , the mass difference is AM = m „ 0 135.0 Mev , while the target mass is m2 = тр = 938.5 Mev . Then the threshold energy is Tth = 135.0 [ 1 1 + 135.0 2 ( 938.5 ) = 135.0 ( 1.072 ) = 144.7 Mev As another example consider the ...
... mass , the mass difference is AM = m „ 0 135.0 Mev , while the target mass is m2 = тр = 938.5 Mev . Then the threshold energy is Tth = 135.0 [ 1 1 + 135.0 2 ( 938.5 ) = 135.0 ( 1.072 ) = 144.7 Mev As another example consider the ...
Page 534
... mass m collides with a fixed , smooth , hard sphere of radius R. Assuming that the collision is elastic , show that in the dipole approximation ( neglecting retardation effects ) the classical differential cross section for the emission ...
... mass m collides with a fixed , smooth , hard sphere of radius R. Assuming that the collision is elastic , show that in the dipole approximation ( neglecting retardation effects ) the classical differential cross section for the emission ...
Page 589
... mass . 17.4 Difficulties with the Abraham - Lorentz Model Although the Abraham - Lorentz approach is a significant step towards a fundamental description of a charged particle , it is deficient in several respects . 1. One obvious ...
... mass . 17.4 Difficulties with the Abraham - Lorentz Model Although the Abraham - Lorentz approach is a significant step towards a fundamental description of a charged particle , it is deficient in several respects . 1. One obvious ...
Contents
1 | 1 |
BoundaryValue Problems in Electrostatics I | 26 |
Dielectrics | 98 |
Copyright | |
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4-vector acceleration Ampère's law angular distribution approximation atomic axis behavior boundary conditions bremsstrahlung calculation Chapter charge q charged particle Cherenkov radiation classical coefficients collisions component conducting conductor consider constant coordinate cross section cylinder d³x dielectric diffraction dipole direction discussed E₁ electric field electromagnetic fields electron electrostatic emitted energy loss energy transfer equation of motion factor force equation frame frequency given Green's function impact parameter incident particle integral Lagrangian limit Lorentz force Lorentz invariant Lorentz transformation m₁ magnetic field magnetic induction magnitude Maxwell's equations meson modes momentum multipole nonrelativistic obtain orbit oscillations P₁ P₂ parallel perpendicular photon plane plasma polarization power radiated problem quantum quantum-mechanical radius region relativistic result scalar scattering screen shown in Fig shows sin² solid angle solution spectrum sphere spherical surface transverse V₁ vanishes vector potential wave number wavelength ΦΩ