For a series RC circuit with R=1 kΩ and C=1 μF charging from 0 V to 12 V, calculate τ and Vc after t=3τ.

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Study for the DC Theory LMS Test. Engage with comprehensive flashcards and interactive multiple choice questions, each equipped with helpful hints and clear explanations. Prepare confidently and efficiently for your exam!

Multiple Choice

For a series RC circuit with R=1 kΩ and C=1 μF charging from 0 V to 12 V, calculate τ and Vc after t=3τ.

The key idea is how a series RC charges over time. The time constant τ equals RC, and the capacitor voltage follows Vc(t) = Vs(1 − e^{−t/τ}) as it charges toward the supply Vs.

Compute τ: R = 1 kΩ = 1000 Ω, C = 1 μF = 1×10^−6 F, so τ = RC = 1000 × 1×10^−6 = 1×10^−3 s = 1 ms.

At t = 3τ, with Vs = 12 V, Vc(3τ) = 12 [1 − e^{−3}] ≈ 12 × (1 − 0.0498) ≈ 11.40 V.

So the correct values are τ = 1 ms and Vc(3τ) ≈ 11.40 V.

For a series RC circuit with R=1 kΩ and C=1 μF charging from 0 V to 12 V, calculate τ and Vc after t=3τ.

Study for the DC Theory LMS Test. Engage with comprehensive flashcards and interactive multiple choice questions, each equipped with helpful hints and clear explanations. Prepare confidently and efficiently for your exam!

For a series RC circuit with R=1 kΩ and C=1 μF charging from 0 V to 12 V, calculate τ and Vc after t=3τ.

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