Question
Question: In the figure, find the equivalent capacitance between A and B.![](https://www.vedantu.com/question-...
In the figure, find the equivalent capacitance between A and B.
Explanation
Solution
As the capacitors are connected in form of parallel and series combination, we will compute the parallel capacitance first, followed by series capacitance and then finally again the parallel capacitance. By following this procedure, we will find the net capacitance between the points A and B.
Formula used:
& {{C}_{P}}={{C}_{1}}+{{C}_{2}}+..... \\\ & \dfrac{1}{{{C}_{S}}}=\dfrac{1}{{{C}_{1}}}+\dfrac{1}{{{C}_{2}}}+........ \\\ \end{aligned}$$ **Complete step by step answer:** The formulae that we will be using to compute the net capacitance of the circuit are given as follows. The capacitance of the capacitors connected in parallel is given as follows. $${{C}_{P}}={{C}_{1}}+{{C}_{2}}+.....$$ The sum of the individual capacitance equals the net capacitance of the capacitors connected in parallel. The capacitance of the capacitors connected in series is given as follows. $$\dfrac{1}{{{C}_{S}}}=\dfrac{1}{{{C}_{1}}}+\dfrac{1}{{{C}_{2}}}+........$$ The sum of the individual reciprocal capacitance equals the net reciprocal capacitance of the capacitors connected in series. Firstly, we will consider the capacitors connected in parallel. From the given diagram it’s clear that, the capacitors $$1\mu F$$and $$1\mu F$$are in parallel and the capacitors $$4\mu F$$and $$4\mu F$$are in parallel. Let us compute the equivalent capacitance. $$\begin{aligned} & {{C}_{P}}=1\mu +1\mu \\\ & \Rightarrow {{C}_{P}}=2\mu \\\ & C{{'}_{P}}=4\mu +4\mu \\\ & \Rightarrow C{{'}_{P}}=8\mu \\\ \end{aligned}$$ Now, the capacitors $$2\mu F$$and $$2\mu F$$are in series and the capacitors $$8\mu F$$and $$8\mu F$$are in series. Let us compute the equivalent capacitance. $$\begin{aligned} & {{C}_{S}}=\dfrac{2\mu \times 2\mu }{2\mu +2\mu } \\\ & \Rightarrow {{C}_{S}}=1\mu \\\ & C{{'}_{S}}=\dfrac{8\mu \times 8\mu }{8\mu +8\mu } \\\ & \Rightarrow C{{'}_{S}}=4\mu \\\ \end{aligned}$$ Now, the capacitors $$1\mu F$$ and $$4\mu F$$ are in parallel. Let us compute the equivalent capacitance. $$\begin{aligned} & {{C}_{P}}=1\mu +4\mu \\\ & \Rightarrow {{C}_{P}}=5\mu \\\ \end{aligned}$$ Thus, the net capacitance between the points A and B is $$5\mu F$$. **So, the correct answer is “Option B”.** **Note:** The given circuit diagram should be analyzed completely before attempting it, because the capacitors connected in series combination can be confused with the capacitors connected in parallel combination.