30.7:

Induced Electric Fields: Applications

JoVE Core
物理学
このコンテンツを視聴するには、JoVE 購読が必要です。  サインイン又は無料トライアルを申し込む。
JoVE Core 物理学
Induced Electric Fields: Applications

1,166 Views

01:27 min

September 18, 2023

An important distinction exists between the electric field induced by a changing magnetic field and the electrostatic field produced by a fixed charge distribution. Specifically, the induced electric field is nonconservative because it does not work in moving a charge over a closed path. In contrast, the electrostatic field is conservative and does no net work over a closed path. Hence, electric potential can be associated with the electrostatic field but not the induced field. The following equations represent the distinction between the two types of electric fields:

Equation1

Equation2

When the magnetic flux through a circuit changes, a nonconservative electric field is induced, which drives current through the circuit. However, when there is no conducting path in free space, it can be treated as if a conducting path were present; that is, nonconservative electric fields are induced wherever the magnetic flux through a circuit changes, whether or not a conducting path is present.