In Maxwell's equations, I understand intuitively how: &#x222E;<!-- ∮ --> B &#x22C5;<!-- ⋅

Bernard Mora

Bernard Mora

Answered question

2022-05-10

In Maxwell's equations, I understand intuitively how: B d a = 0 (because there are no monopoles and so equal number of field lines going in and coming out of the surface).
And then using the divergence theorem:
V ( B ) d τ = S B d a
Then V ( B ) d τ must be = 0.
But then I'm not sure why I can say: B = 0 and forget about the integral.
Does it just mean that B must be zero everywhere?

Answer & Explanation

Braeden Shannon

Braeden Shannon

Beginner2022-05-11Added 13 answers

You can actually calculate B at a certain point r : just choose as the (arbitrary) integration domain a bowl V ϵ ( r ) of radius ϵ. Then let ϵ tend to zero, so
( B ) ( r ) 4 3 π ϵ 3 V ϵ ( r ) ( B ) d τ = 0
Since ϵ is small but non-zero, you finally get B = 0

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