# Input impedance

(Redirected from External impedance)

The input impedance of an electrical network is the measure of the opposition to current flow (impedance), both static (resistance) and dynamic (reactance), into the load network that is external to the electrical source. The input admittance (1/impedance) is a measure of the load's propensity to draw current. The source network is the portion of the network that transmits power, and the load network is the portion of the network that consumes power.

The circuit to the left of the central set of open circles models the source circuit, while the circuit to the right models the connected circuit. ZS is the output impedance seen by the load, and ZL is the input impedance seen by the source.

## Input impedance

If the load network were replaced by a device with an impedance equal to the input impedance of the load network, the characteristics of the source-load network would be the same from the perspective of the connection point. And so the voltage across and current through the input terminals would be identical to the original load network.

Therefore, the input impedance of the load network being connected and the output impedance of the source determines how the source current and voltage change i.e. the transfer function from the source to the input terminals of the circuit.

The Thévenin's equivalent circuit of the electrical network uses the concept of input impedance to determine the impedance of the equivalent circuit.

## Calculation

If one were to create a circuit with equivalent properties across the input terminals by placing the input impedance across the load of the circuit and the output impedance in series with the signal source, Ohm's Law could be used to calculate the transfer function. To calculate the input impedance, short the input terminals together and reduce the circuit by determining the equivalent circuit with only two component.

### Electrical Efficiency

The values of the input and output impedance are often used to evaluate the electrical efficiency of networks by breaking them up into multiple stages and evaluating the efficiency of the interaction between each stage interdependently. To minimize electrical losses, the output impedance of the signal should be insignificant in comparison to the input impedance of the network being connected as the gain is equivalent to the ratio of the input impedance to the total impedance (input impedance + output impedance). In this case,

${\displaystyle Z_{in}\gg Z_{out}}$
The input impedance of the driven stage (load) is much larger than the output impedance of the source.

#### Power factor

In AC circuits carrying power, the losses due to the reactive component of the impedance can be significant. These losses manifest themselves in a phenomenon called phase imbalance, where the current is out of phase (lagging behind or ahead) with the voltage. Therefore, the product of the current and the voltage is less than what it would be if the current and voltage were in phase. With DC sources, reactive circuits have no impact, therefore power factor correction is not necessary.

For a circuit modeled with an ideal source, an output impedance, and an input impedance; the circuits input reactance can be sized to be the negative of the output reactance of the load. In this scenario the reactive component of the input impedance cancels the reactive component of the output impedance of the load. The resulting equivalent circuit is purely resistive in nature, and there are no losses due to phase imbalance in the source or the load.

{\displaystyle {\begin{aligned}Z_{in}&=X-j\operatorname {Im} (Z_{out})\\\end{aligned}}}

### Power transfer

The maximum power states that for a given source maximum power will be transferred when the resistance of the source is equal to the resistance of the load and the power factor is corrected by canceling out the reactance. When this occurs the circuit is said to be complex conjugate matched to the signals impedance. Note this only maximizes the power transfer, not the efficiency of the circuit. When the power transfer is optimized the circuit only runs at 50% efficiency. Also note that this equation does not work in reverse, the optimal output impedance of the source is 0 regardless of the input impedance of the load.

The formula for complex conjugate matched is

{\displaystyle {\begin{aligned}Z_{in}&=Z_{out}^{*}\\&=\left\vert Z_{out}\right\vert e^{-\Theta _{out}j}\\&=\operatorname {Re} (Z_{out})-\operatorname {Im} (Z_{out})j.\\\end{aligned}}}

When there is no reactive component this equation simplifies to ${\displaystyle Z_{in}=Z_{out}}$ as the imaginary part of ${\displaystyle Z_{out}}$ is zero.

### Impedance matching

When the characteristic impedance of a transmission line does not match the impedance of the load network the load network will reflect back some of the source signal. This can create standing waves on the transmission line. To minimize reflections, the characteristic impedance of the transmission line and the impedance of the load circuit have to be equal (or "matched"). If the impedance matches, the connection is known as a matched connection, and the process of correcting an impedance mismatch is called impedance matching.[clarification needed][clarification needed]

${\displaystyle Z_{in}=Z_{line}}$

## Applications

### Signal processing

In modern signal processing, devices, such as operational amplifiers, are designed to have an input impedance several orders of magnitude higher than the output impedance of the source device connected to that input. This is called impedance bridging. The losses due to input impedance (lossing) in these circuits will be minimised and the voltage at the input of the amplifier will be close to voltage as if the amplifier circuit was not connected. When a device whose input impedance could cause significant degradation of the signal is used, oftentimes a device with a high input impedance and a low output impedance is used minimise its effects. Voltage follower or impedance-matching transformers are often used for these effects.

The input impedance for high-impedance amplifiers (such as vacuum tubes, field effect transistor amplifiers and op-amps) is often specified as a resistance in parallel with a capacitance (e.g., 2.2  ∥ 1 pF). Pre-amplifiers designed for high input impedance may have a slightly higher effective noise voltage at the input (while providing a low effective noise current), and so slightly more noisy than an amplifier designed for a specific low-impedance source, but in general a relatively low-impedance source configuration will be more resistant to noise (particularly mains hum).