In the given figure, the total charge stored in the combination of capacitors is . The value of is _____.

In the given figure, the total charge stored in the combination of capacitors is . The value of is _____.

Correct answer:5
Standard Method
Given: Three capacitors are connected in parallel with values , , and . The applied potential difference is and the total charge stored is .
Find: The value of .
For capacitors in parallel,
Using the relation between charge, capacitance and voltage,
Substitute the given values,
Therefore, the value of is .
Direct Charge Relation
Given: The capacitors are in parallel, so their capacitances add directly.
Find: The value of .
First find the equivalent capacitance from :
Now use
This works because in a parallel combination, each capacitor has the same potential difference and the total capacitance is the sum of individual capacitances. Hence, the value of is .
Assuming the capacitors are in series is incorrect because the figure shows all three capacitors connected across the same two nodes. In parallel, capacitances add directly. Always identify whether the potential difference across each capacitor is the same before choosing the formula.
Using with only one capacitor instead of the equivalent capacitance gives a wrong result. The total charge given is for the entire combination, so first calculate for the network and then apply .
Ignoring units can cause confusion between and . Here, using is consistent because . Keep the micro-prefix throughout the calculation.
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