Trouble with enterpreting Faraday's Law

Question

$$ nabla times textbf{E} = -frac{partial textbf{B}}{partial t} $$
My interpretation of this equation is that:

A steady magnetic field will result in an electric field that is $0$.
A varying magnetic field will result in a varying electric field.

How can I produce a steady and non zero electric field then?

Thomas Prévost · Answer

In fact, your interpretation is not 100% right.
The equation you quote (Maxwell-Faraday) is:
$$nablatimesmathbf{E} = -frac{partialmathbf{B}}{partial t}$$
Then, is $bf{B}$ is steady (particularly in time as it's what is interesting in that case) then the field $bf{E}$ will have a curl equal to $0$. But $nablatimesbf{E}$ does not imply $mathbf{E}=0$. It only implies that $mathbf{E}$ is steady (but, that's true, the case $bf{E}=0$ is included in the possibilities but is not mandatory).
So, a constant and steady magnetic field can be used to create a constant and steady electic field.

Trouble with enterpreting Faraday's Law

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