In November 2024
Answer to Question #291747 in Electricity and Magnetism for ishita
A sphere of radius R carries a charge of volume charge density ρ ar, where a is a constant and r denotes the distance from the centre of the sphere. Calculate the total charge enclosed by the sphere and the electric field at points lying inside and outside the sphere.
"\\rho=ar,"
"\\rho=\\frac QV,"
"Q=\\int_0^Rar(4\\pi r^2)dr=4a\\pi\\int_0^Rr^3dr=4a\\pi\\frac{R^4}4=\\pi aR^4,"
"E=\\frac{Q}{4\\pi r^2\\varepsilon_0}=\\frac{aR^4}{4\\varepsilon_0r^2}."
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#340153 on Dec 2023
Comments
Good answers I am stisfied
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