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:''This article is about electronics. For a discussion of "reactive" or "reactance" in chemistry, see reactivity.''
:''For a discussion of the psychological concept of reactance, see reactance (psychology).''
'Reactance' is the imaginary part of electrical impedance, a measure of opposition to a sinusoidal alternating current. Reactance arises from the presence of inductance and capacitance within a circuit, and is denoted by the symbol $scriptstyle\{Chi\}$, the SI unit is the ohm.
Both reactance $scriptstyle\{Chi\}$ and resistance $scriptstyle\{R\}$ are required to determine the impedance $scriptstyle\{\; ilde\{Z\}\}$; although in some circumstances the reactance may dominate the impedance, at least an approximate knowledge of the resistance is required to establish this.
:$ilde\{Z\}\; =\; R\; +\; jChi$
Both the magnitude $scriptstyle\{|\; ilde\{Z\}|\}$ and the phase $scriptstyle\{\; heta\}$ of the impedance depend on both the resistance and the reactance.
:$|\; ilde\{Z\}|\; =\; sqrt\{ZZ^$
★ } = sqrt{R^2 + Chi^2}
:
ight)}
The magnitude is the ratio of the voltage and current amplitudes, while the phase is the voltage–current phase difference.

★ If $scriptstyle\{Chi\; >\; 0\}$, the reactance is said to be ''inductive''

★ If $scriptstyle\{Chi\; =\; 0\}$, then the impedance is purely ''resistive''

★ If , the reactance is said to be ''capacitive''

Contents

Physical significance

Capacitive reactance

Inductive reactance

Phase relationship

References

See also

External links

Physical significance

Determining the voltage-current relationship requires knowledge of both the resistance and the reactance. The reactance on its own gives only limited physical information about an electrical component or network:
# The value of the reactance is a lower limit on the magnitude of the impedance
# A positive reactance implies that the phase of the voltage ''leads'' the phase of the current, while a negative reactance implies that the phase of the voltage ''lags'' the phase of the current
# A reactance of zero implies the current and voltage are in phase (the only situation in which a specific value for the either the magnitude or phase of the impedance can be determined with knowledge of only the reactance) and conversely if the reactance is non-zero then there is a phase difference between the voltage and current
There are certain specific quantities that depend on the reactance alone, for example; resonance in an RLC circuit occurs when the reactive impedances ''Z_C'' and ''Z_L'' cancel. This means that the impedance has a phase of zero (a specific example of the third point above).

Capacitive reactance

Main articles: Capacitance

Capacitive reactance $scriptstyle\{Chi\_C\}$ is inversely proportional to the signal frequency $scriptstyle\{f\}$ and the capacitance $scriptstyle\{C\}$.
:
A capacitor consists of two conductors separated by an insulator, also known as a dielectric.
At low frequencies a capacitor is open circuit, as no current flows in the dielectric. A DC voltage applied across a capacitor causes charge to accumulate on one side, the electric field due to the accumulated charge is the source of the opposition to the flow of current. When the potential associated with the charge exactly balances the applied voltage, the current goes to zero.
Driven by an AC supply a capacitor will only accumulate a limited amount of charge before the potential difference changes sign and the charge dissipates. The higher the frequency, the less charge will accumulate and the smaller the opposition to the flow of current.

Inductive reactance

Main articles: Inductance

Inductive reactance $scriptstyle\{Chi\_L\}$ is proportional to the signal frequency $scriptstyle\{f\}$ and the inductance $scriptstyle\{L\}$.
:$X\_L\; =\; omega\; L\; =\; 2pi\; f\; Lquad$
An inductor consists of a coiled conductor. Faraday's law of electromagnetic induction gives the back emf $scriptstyle\{mathcal\{E\}\}$ (voltage opposing current) due to a rate-of-change of magnetic flux density $scriptstyle\{B\}$ through a current loop.
:$mathcal\{E\}\; =\; -\{\{dPhi\_B\}\; over\; dt\}quad$
For an inductor consisting of a coil with $N$ loops this gives.
:$mathcal\{E\}\; =\; -N\{dPhi\_B\; over\; dt\}quad$
The back-emf is the source of the opposition to current flow. A constant direct current has a zero rate-of-change, and sees an inductor as a short-circuit (it is typically made from a material with a low resistivity). An alternating current has a time-averaged rate-of-change that is proportional to frequency, this causes the increase in inductive reactance with frequency.

Phase relationship

The phase of the voltage across a purely reactive device (a device with a resistance of zero) ''lags'' the current by $scriptstyle\{pi/2\}$ for a capacitive reactance and ''leads'' the current by $scriptstyle\{pi/2\}$ for an inductive reactance. Note that without knowledge of both the resistance and reactance we cannot determine the voltage--current relationships.
The origin of the different signs for capacitive and inductive reactance is the phase factor in the impedance.
:$ilde\{Z\}\_C\; =\; \{1\; over\; omega\; C\}e^\{j(-\{pi\; over\; 2\})\}\; =\; jleft(-\{1\; over\; omega\; C\}$
ight) = jChi_Cquad
:$ilde\{Z\}\_L\; =\; omega\; Le^\{j\{pi\; over\; 2\}\}\; =\; jomega\; L\; =\; jChi\_Lquad$
For a reactive component the sinusoidal voltage across the component is in quadrature (a $scriptstyle\{pi/2\}$ phase difference) with the sinusoidal current through the component. The component alternately absorbs energy from the circuit and then returns energy to the circuit, thus a pure reactance does not dissipate power.

References

# Pohl R. W. ''Elektrizitätslehre.'' – Berlin-Gottingen-Heidelberg: Springer-Verlag, 1960.
# Popov V. P. ''The Principles of Theory of Circuits.'' – M.: Higher School, 1985, 496 p. (In Russian).
# Küpfmüller K. ''Einführung in die theoretische Elektrotechnik,'' Springer-Verlag, 1959.
# Sears and Zemansky's University Physics, Young, Hugh D., , , Addison Wesley, 2004, ISBN 0-8053-9179-7

See also

★ Impedance

★ Resistance

★ Susceptance

★ Magnetic reactance

External links

★ Resistance, Reactance, and Impedance

★ Inductive Reactance: Endless Examples & Exercises