# Resistor Series Parallel Formula

## Resistor Series Parallel Formula

In Electrical Circuits, various components are connected in series or parallel to create various resistor networks. Within the same circuit, resistors can be connected in parallel and series between different loops to create more complex resistor networks. These circuits are known as mixed resistance circuits. Ultimately, though, we need to know the total resistance. Knowing how to do this is important because a resistor never exists in isolation. They are always part of a larger circuit with many resistors connected in various combinations. Students can learn more about the Resistor Series Parallel formula by visiting the Extramarks website.

### To Calculate The Total Resistance Of The Series Circuit

Two or more resistors are connected in series if the same current flows through all resistors. In such a circuit, the voltage across each resistor is different. If a resistor fails or an error occurs in the series circuit, the entire circuit will shut down. Series circuits are easier to set up than parallel circuits.

### Total Resistance Of 2 Resistors Connected Parallel

In such circuits, when the branches meet at a common point, the currents split and recombine. Resistors and other components can be easily connected or disconnected without affecting other elements in a parallel circuit. Learn more about Resistor Series Parallel Formula by visiting the Extramarks website.

### Total Resistance Of 3 Or More Resistors Connected Parallel

Two or more resistors are connected in parallel when the voltage across all resistors is the same. The following relationship gives the total resistance of the parallel circuit.

In some cases, resistors can be connected in parallel within the same circuit and in series across different loops to create more complex resistor networks. These circuits are known as mixed resistance circuits. Extramarks is the best learning platform for Resistor Series Parallel Formula. Students can visit the website and learn the formulas.