Superposition in a two-source network: One source alone drives 12 mA through a branch; the other source alone drives 10 mA in the opposite direction through the same branch. What is the actual branch current with both sources active?

Electrical Engineering Circuit Theorems and Conversions Difficulty: Easy
Choose an option
  • A
    2 mA
  • B
    22 mA
  • C
    12 mA
  • D
    10 mA
  • E
    0 mA

Answer

Correct Answer: 2 mA

Explanation

Introduction / Context:Linear circuit analysis often leverages superposition: the total response equals the algebraic sum of individual responses to each independent source acting alone (with the others turned off appropriately). Direction matters; currents opposing each other subtract.

Given Data / Assumptions:

  • Current due to source 1 alone: I1 = 12 mA (reference direction taken as positive).
  • Current due to source 2 alone: I2 = 10 mA in the opposite direction (hence negative with respect to the same reference).
  • Linear network; sources are independent; superposition valid.

Concept / Approach:

Superposition principle: I_total = I1 + I2, with signs assigned according to direction. Opposite directions imply subtraction of magnitudes.

Step-by-Step Solution:

Assign signs: I1 = +12 mA; I2 = −10 mA.Sum: I_total = 12 mA + (−10 mA) = 2 mA.Direction: the result is in the direction of the 12 mA contribution (since net is positive).

Verification / Alternative check:

Check limits: If both contributed in the same direction, magnitude would be 22 mA. With opposite directions and larger 12 mA, the remainder must be 2 mA, consistent with the arithmetic.

Why Other Options Are Wrong:

22 mA wrongly adds opposing currents. 12 mA or 10 mA ignores the second source. 0 mA would require equal magnitudes, which is not the case here.

Common Pitfalls:

Forgetting to treat direction as sign, or mixing up which direction is taken as positive.

Final Answer:

2 mA

Discussion & Comments
No comments yet. Be the first to comment!
Join Discussion