비디오: 전류 밀도에 대한 경계 조건

The current density becomes discontinuous across an interface having different electrical conductivities.

For steady currents, the divergence of the current density is zero. So, the normal component of the current density is continuous across the boundary.

Recall that the tangential component of the electric field is continuous across an interface. Expressing the electric field in terms of the current density and the electrical conductivity gives the boundary condition for the tangential component of the current density.

Now, the normal component of the electric displacement is discontinuous across the interface. So, the normal component of the electric field is also discontinuous across an interface.

Again, using the expression of the electric field and current density, the boundary condition for the normal component of the current density is obtained in terms of permittivity and conductivity.

It shows that a surface charge density is created across an interface having different conductivities and/or permittivities.

The surface charge density is zero for an interface with the same conductivity and permittivity values or with an equal ratio of permittivity to conductivity.

Current density becomes discontinuous across an interface of materials with different electrical conductivities. The normal component of the current density is continuous across the boundary.

Equation1

However, the tangential components of the current density are discontinuous across the interface.

Equation2

Consider an interface separated by two conducting media with conductivities σ₁ and σ₂. The steady current density at the interface is , in medium 1 at a point P₁. It makes an angle α₁ with the normal. The current density at point P₂ in medium 2 makes an angle α₂ with the normal.

The normal and tangential components of the current density give the equations as follows:

Equation3

Equation4

Taking the ratio of the two equations, the expression for the electrical conductivities in both the media is obtained.

Equation5

If the electrical conductivity of medium 1 is greater than that of medium 2, the angle α₂ approaches zero. This implies that the current density is normal to the surface of conductor 1.

Tags

Current Density Boundary Conditions Electrical Conductivity Interface Normal Component Tangential Component Conducting Media Steady Current Density Angle With Normal Electrical Conductivities Medium 1 Medium 2

장에서 26:

article

Now Playing

26.11 : Boundary Conditions for Current Density

Current and Resistance

717 Views

article

26.1 : 전류

Current and Resistance

5.2K Views

article

26.2 : 드리프트 속도

Current and Resistance

3.7K Views

article

26.3 : 전류 밀도

Current and Resistance

3.6K Views

article

26.4 : 저항력

Current and Resistance

3.2K Views

article

26.5 : 저항

Current and Resistance

4.0K Views

article

26.6 : 옴의 법칙

Current and Resistance

5.1K Views

article

26.7 : 무저항 장치

Current and Resistance

962 Views

article

26.8 : 전력

Current and Resistance

2.9K Views

article

26.9 : 전기 에너지

Current and Resistance

1.1K Views

article

26.10 : 연속성 방정식

Current and Resistance

695 Views

article

26.12 : 전기 전도성

Current and Resistance

995 Views

article

26.13 : 금속 전도 이론

Current and Resistance

1.2K Views

Copyright © 2025 MyJoVE Corporation. 판권 소유