22.14:

Properties of Electric Field Lines

JoVE 핵심
물리학
JoVE 비디오를 활용하시려면 도서관을 통한 기관 구독이 필요합니다.  전체 비디오를 보시려면 로그인하거나 무료 트라이얼을 시작하세요.
JoVE 핵심 물리학
Properties of Electric Field Lines

6,193 Views

00:00 min

April 30, 2023

The definition of electric field lines greatly eases the visualization of electric fields, a vector field, especially in the presence of many charges. The one-to-one correspondence between the electric field and the electric field lines necessitates that the field lines follow some rules.

For one, the electric field of a positive charge must originate from it. That is because its electric field points away from it. Moreover, since the magnitude of the field asymptotes to zero at infinity, the field lines in the presence of a single positive charge must also extend to infinity.

For a negative charge, the field lines are precisely the opposite. Hence, they come in from infinity and culminate on it.

Since the electric field of a point charge is proportional to its magnitude, so is the number of electric field lines in its vicinity.

By definition, the field line density at any point in space is proportional to the electric field at that point. Also, the electric field vector is tangent to the field line at that point. Now, this implies that electric field lines can never cross each other.

Imagine a point where electric field lines cross. That implies there are two directions of the field at that point. This further implies that a test charge placed at that point would experience a net force that has two directions. Since that is impossible, the hypothesis is ruled out.