27.6:

Kirchoff's Rules: Application

JoVE 핵심
물리학
JoVE 비디오를 활용하시려면 도서관을 통한 기관 구독이 필요합니다.  전체 비디오를 보시려면 로그인하거나 무료 트라이얼을 시작하세요.
JoVE 핵심 물리학
Kirchoff’s Rules: Application

1,091 Views

01:22 min

September 18, 2023

Kirchhoff's rules quantify the current flowing through a circuit and the voltage variations around the loop in a circuit. Applying Kirchhoff's rules generates a set of linear equations that allow us to find the unknown values in circuits. These may be currents, voltages, or resistances.

When applying Kirchhoff's first rule, the junction rule, label the current in each branch and decide its direction. If the chosen direction is wrong, it will have the correct magnitude, although the current will be negative. When applying Kirchhoff's second rule, the loop rule, identify a closed loop and decide the direction to go around it, clockwise or counterclockwise. In many circuits, it will be necessary to construct more than one loop. When traversing each loop, be consistent with the sign of the change in potential.

In the case of the voltage source, the emf is considered positive when we travel through the source in the direction from a negative to a positive terminal. It is considered to be negative when we travel in the reverse direction. When encountering a resistor in the loop, if the travel direction of the loop through the resistor is the same as that of the assumed current direction, the potential drop across the resistor is negative. However, the potential drop across the resistor is taken as positive when the travel direction is opposite to the assumed current direction.

In conclusion, Kirchhoff's method of analysis requires the following procedure:

  1. Recognize all the circuit elements, identify the polarity of each emf source, and imagine the current's directions in the emf.
  2. Assign labels to all the known quantities and symbols to the unknown quantities. Assign the current direction in each part of the circuit.
  3. Apply Kirchhoff's junction and loop rule.
  4. Obtain the number of independent equations equal to the number of unknowns and simultaneously solve the equations for unknowns.