E0
1-rasm.
Rasmda E0 to‘g‘ri chiziq birlamchi o‘zgaruvchan elektr maydonini, H gorizontal aylanalar ikkilamchi o‘zgaruvchan magnit madoynini, vertikal E aylanalar esa – ikkilamchi o‘zgaruvchan elektr maydonini tasvirlaydi. O‘zgarmas elektr va magnit maydonlar yagona elektromagnit maydonning xususiy holatidir.
Dastlab zaryadlar va toklar bilan bog‘langan o‘zgaruvchan elektr va magnit maydonlar so‘ngra zaryadlar va toklardan mustaqil holda mavjud bo‘lishi va bir-birini hosil qilib fazoda qo‘yidagi tezlik bilan harakatlanishi mumkin:
(1)
(1) formulaga ε0 va μ0 larning son qiymatlari va o‘lchamlarini qo‘ysak, u paytda:
![](data:image/png;base64,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) (2)
bu yerda ε va μ – muhitning nisbiy dielektrik va magnit singdiruvchanlik-lari.
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