Consider the circuit shown in the figure. The current $I$ flowing through the 10 $\Omega$ resistor is ________________.
Show Hint
When two branches of a circuit are perfectly symmetrical, the midpoint potentials become equal, leading to zero current through the connecting resistor.
The circuit consists of two identical voltage sources (3 V each) and two identical sets of series resistances on the left and right sides. Each side has:
Left branch: $3\ \text{V} \rightarrow 1\Omega \rightarrow 2\Omega$
Right branch: $3\ \text{V} \rightarrow 2\Omega \rightarrow 1\Omega$ Step 1: Compute equivalent resistance of each branch.
Left branch resistance:
\[
R_L = 1 + 2 = 3\Omega
\]
Right branch resistance:
\[
R_R = 2 + 1 = 3\Omega
\] Step 2: Compute the current supplied by each battery.
\[
I_L = \frac{3}{3} = 1\ \text{A}, \qquad I_R = \frac{3}{3} = 1\ \text{A}
\] Step 3: Determine potentials at the two ends of the 10 $\Omega$ resistor.
Both branches produce the same voltage drop across identical resistances, making the potential at both nodes equal.
Thus, the 10 $\Omega$ resistor has the same voltage at both ends, meaning:
\[
V_{\text{left}} = V_{\text{right}}.
\]
Hence,
\[
I = \frac{V_{\text{left}} - V_{\text{right}}}{10\Omega} = 0.
\] Final Answer: 0 A
