Знание - физика!ТекстРепетитор Голодняк
Далее, согласно основному уравнению релятивистской динамики, сила, действующая
на один заряд со стороны второго, определяется соотношением
(2)
где
(3)
— релятивистский импульс заряда. Тогда, учитывая (1, б), для Y-проекции силы имеем:
(4)
где
— время, за которое произошло изменение импульса в системе К0. Связь между
и
вытекает из преобразований Лоренца:
![](data:image/png;base64,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)
Тогда
![](data:image/png;base64,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)
Этого и следовало ожидать, так как
очевидно, является собствченным временем. Таким образом, связь между Y-проекциями сил взаимодействия зарядов в системах К и К0 выражается соотношением:
(5)
Аналогично связаны также Z-проекции, но, поскольку
то и
Не появится в системе К и проекции на ось X. Показать это можно следующим образом. Для X-проекций силы, аналогично (4), можно записать:
(6)
Согласно (1, а)
(7)
Первое слагаемое в числителе правой части здесь равно нулю, а для второго применим теорему о кинетической энергии:
![](data:image/png;base64,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)
Но
— это скорость заряда в системе К0 стало быть, она тоже равна нулю. Таким образом, правая часть (7), а, значит, и (6) действительно равна нулю.
где
— релятивистский импульс заряда. Тогда, учитывая (1, б), для Y-проекции силы имеем:
где
Тогда
Этого и следовало ожидать, так как
Аналогично связаны также Z-проекции, но, поскольку
Согласно (1, а)
Первое слагаемое в числителе правой части здесь равно нулю, а для второго применим теорему о кинетической энергии:
Но