Question:medium

Calculate the value of the current passing through the battery in the given circuit diagram.

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When multiple paths exist in a circuit, reduce parallel and series combinations step-by-step. Use Ohm’s law only after obtaining the total resistance.
Updated On: Feb 19, 2026
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Solution and Explanation

Circuit parameters are provided:- \( R_{AB} = 10\,\Omega \)- Two parallel paths exist between B and D: - Path 1: \( R_{BD1} = 20\,\Omega \) - Path 2 comprises a series combination of: \[ R_{BC} = 5\,\Omega, \quad R_{CD1} = 40\,\Omega, \quad R_{CD2} = 20\,\Omega \text{ in parallel} \]Step 1: Calculate the equivalent resistance of \( R_{CD1} \parallel R_{CD2} \).\[\frac{1}{R_{CD}} = \frac{1}{40} + \frac{1}{20} = \frac{3}{40} \Rightarrow R_{CD} = \frac{40}{3} \, \Omega\]Step 2: Combine \( R_{BC} \) in series with \( R_{CD} \).\[R_{BCD} = 5 + \frac{40}{3} = \frac{55}{3} \, \Omega\]Step 3: Calculate the equivalent resistance between B and D by combining \( R_{BD1} = 20 \, \Omega \) and \( R_{BCD} = \frac{55}{3} \, \Omega \) in parallel:\[\frac{1}{R_{BD}} = \frac{1}{20} + \frac{3}{55} = \frac{11 + 12}{220} = \frac{23}{220} \Rightarrow R_{BD} = \frac{220}{23} \, \Omega\]Step 4: Determine the total equivalent resistance by adding \( R_{AB} = 10\,\Omega \) in series with \( R_{BD} \):\[R_{\text{total}} = 10 + \frac{220}{23} = \frac{450}{23} \, \Omega\]Step 5: Apply Ohm's Law to find the current:\[I = \frac{V}{R} = \frac{6}{450/23} = \frac{138}{450} = \frac{23}{75} \, \text{A} \approx 0.307 \, \text{A}\]
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