Connecting resistors in parallel

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In a parallel resistor configuration, the current distribution is inversely proportional to the resistance values. When resistors are connected, the voltage remains constant across all branches, leading to varying current based on resistance. For example, in a circuit with a 10k and a 5k resistor, the total impedance is approximately 3.33k, resulting in a total current of about 3mA. The current through the 5k resistor is 2mA, while the 10k resistor carries 1mA. This illustrates that lower resistance carries a larger proportion of the total current in parallel circuits.
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When resistors are connected in parallel, which one , according to resistance value, carries the larger proportion of the currents? Does the ratio appear to be directly, or inversely, proportional to the ratio of the resistances?
 
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Note that resistance is a type of impedance but that impedance is not necessarily just resistance but something that comes up with AC called reactance or both.

When devices are placed in parallel, voltage is the same through all branches (unless a capacitor is in one branch) and charge (and therefore current) is inversely proportional.

So for example, two resistors in parallel are 10k and 5k. Total impedance is approx 3.33k. Voltage into the parallel node is 10V. Thus total current is 10V/3.33k or about 3mA. Solve for current along each branch with current divider and you will find 2mA along the 5k branch and 1 mA along the 10k branch.
 

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