In a circuit with a current source of 3 A in parallel with a 6 Ω resistor connected to a node, determine node voltage if the node also connects to a 12 Ω to ground.

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Study for the DC Theory LMS Test. Grow your knowledge with flashcards and multiple-choice questions, each detailed with explanations and hints. Ace your exam with confidence!

Multiple Choice

In a circuit with a current source of 3 A in parallel with a 6 Ω resistor connected to a node, determine node voltage if the node also connects to a 12 Ω to ground.

When a node has a current source injecting current into it and resistors to ground, the node voltage rises until the currents through those resistors sum to equal the injected current. This is the essence of applying Kirchhoff’s current law at the node.

Here, the current source pushes 3 A into the node. The two resistors to ground draw currents equal to V/6 and V/12, respectively. So the current balance is V/6 + V/12 = 3. Combine the terms: V(1/6 + 1/12) = V(2/12 + 1/12) = V/4. Set this equal to 3 A and solve: V/4 = 3 → V = 12 V. Therefore, the node voltage is 12 volts.

In a circuit with a current source of 3 A in parallel with a 6 Ω resistor connected to a node, determine node voltage if the node also connects to a 12 Ω to ground.

Study for the DC Theory LMS Test. Grow your knowledge with flashcards and multiple-choice questions, each detailed with explanations and hints. Ace your exam with confidence!

In a circuit with a current source of 3 A in parallel with a 6 Ω resistor connected to a node, determine node voltage if the node also connects to a 12 Ω to ground.

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