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{{use dmy dates|date=July 2020}} {{use dmy dates|date=July 2020}}
{{Electromagnetism|Network}} {{Electromagnetism|Network}}
{{Infobox physical quantity
The '''electrical resistance''' of an object is a measure of its opposition to the flow of ]. Its ] quantity is '''{{vanchor|electrical conductance|CONDUCTANCE}}''', measuring the ease with which an electric current passes. Electrical resistance shares some conceptual parallels with mechanical ]. The ] unit of electrical resistance is the ] ({{math|]}}), while electrical conductance is measured in ] (S) (formerly called 'mhos' and then represented by {{math|℧}}).
| name = Electric resistance
| unit = ohm (Ω)
| symbols = {{mvar|R}}
| baseunits = kg⋅m<sup>2</sup>⋅s<sup>−3</sup>⋅A<sup>−2</sup>
| dimension = <math>\mathsf{M} \mathsf{L}^2 \mathsf{T}^{-3} \mathsf{I}^{-2}</math>
}}
{{Infobox physical quantity
| name = Electric conductance
| unit = siemens (S)
| symbols = {{mvar|G}}
| dimension = <math>\mathsf{M}^{-1} \mathsf{L}^{-2} \mathsf{T}^3 \mathsf{I}^2</math>
|baseunits=kg<sup>−1</sup>⋅m<sup>−2</sup>⋅s<sup>3</sup>⋅A<sup>2</sup>|derivations=<math>G = \frac{1}{R}</math>}}

The '''electrical resistance''' of an object is a measure of its opposition to the flow of ]. Its ] quantity is '''{{vanchor|electrical conductance|CONDUCTANCE}}''', measuring the ease with which an electric current passes. Electrical resistance shares some conceptual parallels with mechanical ]. The ] unit of electrical resistance is the ] ({{math|]}}), while electrical conductance is measured in ] (S) (formerly called the 'mho' and then represented by {{math|℧}}).


The resistance of an object depends in large part on the material it is made of. Objects made of ]s like ] tend to have very high resistance and low conductance, while objects made of ]s like metals tend to have very low resistance and high conductance. This relationship is quantified by ]. The nature of a material is not the only factor in resistance and conductance, however; it also depends on the size and shape of an object because these properties are ]. For example, a wire's resistance is higher if it is long and thin, and lower if it is short and thick. All objects resist electrical current, except for ]s, which have a resistance of zero. The resistance of an object depends in large part on the material it is made of. Objects made of ]s like ] tend to have very high resistance and low conductance, while objects made of ]s like metals tend to have very low resistance and high conductance. This relationship is quantified by ]. The nature of a material is not the only factor in resistance and conductance, however; it also depends on the size and shape of an object because these properties are ]. For example, a wire's resistance is higher if it is long and thin, and lower if it is short and thick. All objects resist electrical current, except for ]s, which have a resistance of zero.


The resistance {{mvar|R}} of an object is defined as the ratio of ] {{mvar|V}} across it to ] {{mvar|I}} through it, while the conductance {{mvar|G}} is the reciprocal: The resistance {{mvar|R}} of an object is defined as the ratio of ] {{mvar|V}} across it to ] {{mvar|I}} through it, while the conductance {{mvar|G}} is the reciprocal:
<math display=block>R = \frac{V}{I}, \qquad G = \frac{I}{V} = \frac{1}{R}</math> <math display=block>R = \frac{V}{I}, \qquad G = \frac{I}{V} = \frac{1}{R}.</math>


For a wide variety of materials and conditions, {{mvar|V}} and {{mvar|I}} are directly proportional to each other, and therefore {{mvar|R}} and {{mvar|G}} are ] (although they will depend on the size and shape of the object, the material it is made of, and other factors like temperature or ]). This proportionality is called ], and materials that satisfy it are called ''ohmic'' materials. For a wide variety of materials and conditions, {{mvar|V}} and {{mvar|I}} are directly proportional to each other, and therefore {{mvar|R}} and {{mvar|G}} are ] (although they will depend on the size and shape of the object, the material it is made of, and other factors like temperature or ]). This proportionality is called ], and materials that satisfy it are called ''ohmic'' materials.
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over a wide range of voltages and currents. Therefore, the resistance and conductance of objects or electronic components made of these materials is constant. This relationship is called ], and materials which obey it are called ''ohmic'' materials. Examples of ohmic components are wires and ]s. The ] of an ohmic device consists of a straight line through the origin with positive ]. over a wide range of voltages and currents. Therefore, the resistance and conductance of objects or electronic components made of these materials is constant. This relationship is called ], and materials which obey it are called ''ohmic'' materials. Examples of ohmic components are wires and ]s. The ] of an ohmic device consists of a straight line through the origin with positive ].


Other components and materials used in electronics do not obey Ohm's law; the current is not proportional to the voltage, so the resistance varies with the voltage and current through them. These are called ''nonlinear'' or ''non-ohmic''. Examples include ]s and ]s. The current-voltage curve of a nonohmic device is a curved line. Other components and materials used in electronics do not obey Ohm's law; the current is not proportional to the voltage, so the resistance varies with the voltage and current through them. These are called ''nonlinear'' or ''non-ohmic''. Examples include ]s and ]s.


== Relation to resistivity and conductivity == == Relation to resistivity and conductivity ==
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] ]


The resistance of a given object depends primarily on two factors: What material it is made of, and its shape. For a given material, the resistance is inversely proportional to the cross-sectional area; for example, a thick copper wire has lower resistance than an otherwise-identical thin copper wire. Also, for a given material, the resistance is proportional to the length; for example, a long copper wire has higher resistance than an otherwise-identical short copper wire. The resistance {{math|R}} and conductance {{math|G}} of a conductor of uniform cross section, therefore, can be computed as The resistance of a given object depends primarily on two factors: what material it is made of, and its shape. For a given material, the resistance is inversely proportional to the cross-sectional area; for example, a thick copper wire has lower resistance than an otherwise-identical thin copper wire. Also, for a given material, the resistance is proportional to the length; for example, a long copper wire has higher resistance than an otherwise-identical short copper wire. The resistance {{math|R}} and conductance {{math|G}} of a conductor of uniform cross section, therefore, can be computed as


<math display=block>\begin{align} <math display=block>\begin{align}
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|- |-
| ] (''typical ]'') | ] (''typical ]'')
| 0.1{{efn|For a fresh Energizer E91 AA alkaline battery, the internal resistance varies from {{val|0.9|u=Ω}} at {{val|−40|u=°C}}, to {{val|0.1|u=Ω}} at {{val|+40|u=°C}}.<ref>{{cite report |url=http://data.energizer.com/PDFs/BatteryIR.pdf |title=Battery internal resistance |publisher=Energizer Corp.}}</ref>}} | 0.1{{efn|For a fresh Energizer E91 AA alkaline battery, the internal resistance varies from {{val|0.9|u=Ω}} at {{val|−40|u=°C}}, to {{val|0.1|u=Ω}} at {{val|+40|u=°C}}.<ref>{{cite report |url=http://data.energizer.com/PDFs/BatteryIR.pdf |title=Battery internal resistance |publisher=Energizer Corp. |access-date=13 December 2011 |archive-date=11 January 2012 |archive-url=https://web.archive.org/web/20120111122430/http://data.energizer.com/PDFs/BatteryIR.pdf |url-status=dead }}</ref>}}
|- |-
| ] filament (''typical'') | ] filament (''typical'')
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{{glossary start}} {{glossary start}}
{{term|Static resistance}} {{term|Static resistance}}
{{defn|1=
{{ghat|Also called '''chordal''' or '''DC resistance'''}} {{ghat|Also called '''chordal''' or '''DC resistance'''}}
{{defn|This corresponds to the usual definition of resistance; the voltage divided by the current This corresponds to the usual definition of resistance; the voltage divided by the current
<math display=block>R_\mathrm{static} = \frac{U}{I} \,.</math> <math display=block>R_\mathrm{static} = {V\over I} .</math>


It is the slope of the line (]) from the origin through the point on the curve. Static resistance determines the power dissipation in an electrical component. Points on the current–voltage curve located in the 2nd or 4th quadrants, for which the slope of the chordal line is negative, have ''negative static resistance''. ] devices, which have no source of energy, cannot have negative static resistance. However active devices such as transistors or ]s can synthesize negative static resistance with feedback, and it is used in some circuits such as ]s. It is the slope of the line (]) from the origin through the point on the curve. Static resistance determines the power dissipation in an electrical component. Points on the current–voltage curve located in the 2nd or 4th quadrants, for which the slope of the chordal line is negative, have ''negative static resistance''. ] devices, which have no source of energy, cannot have negative static resistance. However active devices such as transistors or ]s can synthesize negative static resistance with feedback, and it is used in some circuits such as ]s.
}} }}
{{term|Differential resistance}} {{term|Differential resistance}}
{{defn|1=
{{ghat|Also called '''dynamic''', '''incremental''', or '''small-signal resistance'''}} {{ghat|Also called '''dynamic''', '''incremental''', or '''small-signal resistance'''}}
{{defn|] is the derivative of the voltage with respect to the current; the ] of the current–voltage curve at a point It is the derivative of the voltage with respect to the current; the ] of the current–voltage curve at a point
<math display=block>R_\mathrm{diff} = \frac {{\mathrm d}U}{{\mathrm d}I} \,.</math> <math display=block>R_\mathrm{diff} = {{\mathrm dV}\over{\mathrm dI}} .</math>


If the current–voltage curve is non] (with peaks and troughs), the curve has a negative slope in some regions—so in these regions the device has '']''. Devices with negative differential resistance can amplify a signal applied to them, and are used to make amplifiers and oscillators. These include ]s, ]s, ]s, ] tubes, and ]s. If the current–voltage curve is non-] (with peaks and troughs), the curve has a negative slope in some regions—so in these regions the device has '']''. Devices with negative differential resistance can amplify a signal applied to them, and are used to make amplifiers and oscillators. These include ]s, ]s, ]s, ] tubes, and ]s.
}} }}
{{glossary end}} {{glossary end}}
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] (top) and ] (bottom). Since the ] of the current and voltage ] are the same, the ] of ] is 1 for both the capacitor and the inductor (in whatever units the graph is using). On the other hand, the ] between current and voltage is −90° for the capacitor; therefore, the ] of the ] of the capacitor is −90°. Similarly, the ] between current and voltage is +90° for the inductor; therefore, the complex phase of the impedance of the inductor is +90°.]] ] (top) and ] (bottom). Since the ] of the current and voltage ] are the same, the ] of ] is 1 for both the capacitor and the inductor (in whatever units the graph is using). On the other hand, the ] between current and voltage is −90° for the capacitor; therefore, the ] of the ] of the capacitor is −90°. Similarly, the ] between current and voltage is +90° for the inductor; therefore, the complex phase of the impedance of the inductor is +90°.]]


When an alternating current flows through a circuit, the relation between current and voltage across a circuit element is characterized not only by the ratio of their magnitudes, but also the difference in their ]. For example, in an ideal resistor, the moment when the voltage reaches its maximum, the current also reaches its maximum (current and voltage are oscillating in phase). But for a ] or ], the maximum current flow occurs as the voltage passes through zero and vice versa (current and voltage are oscillating 90° out of phase, see image below). ]s are used to keep track of both the phase and magnitude of current and voltage: When an alternating current flows through a circuit, the relation between current and voltage across a circuit element is characterized not only by the ratio of their magnitudes, but also the difference in their ]. For example, in an ideal ], the moment when the voltage reaches its maximum, the current also reaches its maximum (current and voltage are oscillating in phase). But for a ] or ], the maximum current flow occurs as the voltage passes through zero and vice versa (current and voltage are oscillating 90° out of phase, see image below). ]s are used to keep track of both the phase and magnitude of current and voltage:


<math display=block>\begin{array}{cl} <math display=block>\begin{array}{cl}
u(t) &= \mathfrak{Re}\left(U_0 \cdot e^{j\omega t}\right) \\ u(t) &= \operatorname\mathcal{R_e} \left( U_0 \cdot e^{j\omega t}\right) \\
i(t) &= \mathfrak{Re}\left(I_0 \cdot e^{j(\omega t + \varphi)}\right) \\ i(t) &= \operatorname\mathcal{R_e} \left( I_0 \cdot e^{j(\omega t + \varphi)}\right) \\
Z &= \frac{U}{I} \\ Z &= \frac{U}{\ I\ } \\
Y &= \frac{1}{Z} = \frac{I}{U} Y &= \frac{\ 1\ }{Z} = \frac{\ I\ }{U}
\end{array}</math> \end{array}</math>


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* {{mvar|U}} and {{mvar|I}} are the complex-valued voltage and current, respectively; * {{mvar|U}} and {{mvar|I}} are the complex-valued voltage and current, respectively;
* {{mvar|Z}} and {{mvar|Y}} are the complex ] and ], respectively; * {{mvar|Z}} and {{mvar|Y}} are the complex ] and ], respectively;
* <math>\mathfrak{Re}</math> indicates the ] of a complex number; and * <math>\mathcal{R_e}</math> indicates the ] of a ]; and
* <math>j=\sqrt{-1}</math> is the ]. * <math>j \equiv \sqrt{-1\ }</math> is the ].


The impedance and admittance may be expressed as complex numbers that can be broken into real and imaginary parts: The impedance and admittance may be expressed as complex numbers that can be broken into real and imaginary parts:
<math display=block>\begin{align} <math display=block>\begin{align}
Z &= R + jX \\ Z &= R + jX \\
Y &= G + jB Y &= G + jB ~.
\end{align}</math>

where {{mvar|R}} is resistance, {{mvar|G}} is conductance, {{mvar|X}} is ], and {{mvar|B}} is ]. These lead to the ] identities
<math display=block>\begin{align}
R &= \frac{G}{\ G^2 + B^2\ }\ , \qquad & X = \frac{-B~}{\ G^2 + B^2\ }\ , \\
G &= \frac{R}{\ R^2 + X^2\ }\ , \qquad & B = \frac{-X~}{\ R^2 + X^2\ }\ ,
\end{align}</math> \end{align}</math>
which are true in all cases, whereas <math>\ R = 1/G\ </math> is only true in the special cases of either DC or reactance-free current.


The ] <math>\ \theta = \arg(Z) = -\arg(Y)\ </math> is the phase difference between the voltage and current passing through a component with impedance {{mvar|Z}}. For ]s and ]s, this angle is exactly -90° or +90°, respectively, and {{mvar|X}} and {{mvar|B}} are nonzero. Ideal resistors have an angle of 0°, since {{mvar|X}} is zero (and hence {{mvar|B}} also), and {{mvar|Z}} and {{mvar|Y}} reduce to {{mvar|R}} and {{mvar|G}} respectively. In general, AC systems are designed to keep the phase angle close to 0° as much as possible, since it reduces the ], which does no useful work at a load. In a simple case with an inductive load (causing the phase to increase), a capacitor may be added for compensation at one frequency, since the capacitor's phase shift is negative, bringing the total impedance phase closer to 0° again.
where {{mvar|R}} is resistance, {{mvar|G}} is conductance, {{mvar|X}} is ], and {{mvar|B}} is ]. For ideal resistors, {{mvar|Z}} and {{mvar|Y}} reduce to {{mvar|R}} and {{mvar|G}} respectively. But for AC networks containing ]s and ]s, {{mvar|X}} and {{mvar|B}} are nonzero.


<math>Z = 1/Y</math> for AC circuits, just as <math>R = 1/G</math> for DC circuits. {{mvar|Y}} is the reciprocal of {{mvar|Z}} (<math>\ Z = 1/Y\ </math>) for all circuits, just as <math>R = 1/G</math> for DC circuits containing only resistors, or AC circuits for which either the reactance or susceptance happens to be zero ({{mvar|X}} or {{math|''B'' {{=}} 0}}, respectively) (if one is zero, then for realistic systems both must be zero).


===Frequency dependence === ===Frequency dependence ===
A key feature of AC circuits is that the resistance and conductance can be frequency-dependent, a phenomenon known as the ].<ref>{{cite journal |title=Stress-dependent electrical transport and its universal scaling in granular materials |journal=Extreme Mechanics Letters |volume=22 |pages=83–88 |doi=10.1016/j.eml.2018.05.005 |year=2018 |last1=Zhai |first1=Chongpu |last2=Gan |first2=Yixiang |last3=Hanaor |first3=Dorian |last4=Proust |first4=Gwénaëlle |arxiv=1712.05938 |s2cid=51912472 }}</ref> One reason, mentioned above is the ] (and the related ]). Another reason is that the resistivity itself may depend on frequency (see ], ]s, ], ], etc.) A key feature of AC circuits is that the resistance and conductance can be frequency-dependent, a phenomenon known as the ].<ref>{{cite journal |title=Stress-dependent electrical transport and its universal scaling in granular materials |journal=Extreme Mechanics Letters |volume=22 |pages=83–88 |doi=10.1016/j.eml.2018.05.005 |year=2018 |last1=Zhai |first1=Chongpu |last2=Gan |first2=Yixiang |last3=Hanaor |first3=Dorian |last4=Proust |first4=Gwénaëlle |arxiv=1712.05938 |bibcode=2018ExML...22...83Z |s2cid=51912472 }}</ref> One reason, mentioned above is the ] (and the related ]). Another reason is that the resistivity itself may depend on frequency (see ], ]s, ], ], etc.)


==Energy dissipation and Joule heating== ==Energy dissipation and Joule heating==
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As a consequence, the resistance of wires, resistors, and other components often change with temperature. This effect may be undesired, causing an electronic circuit to malfunction at extreme temperatures. In some cases, however, the effect is put to good use. When temperature-dependent resistance of a component is used purposefully, the component is called a ] or ]. (A resistance thermometer is made of metal, usually platinum, while a thermistor is made of ceramic or polymer.) As a consequence, the resistance of wires, resistors, and other components often change with temperature. This effect may be undesired, causing an electronic circuit to malfunction at extreme temperatures. In some cases, however, the effect is put to good use. When temperature-dependent resistance of a component is used purposefully, the component is called a ] or ]. (A resistance thermometer is made of metal, usually platinum, while a thermistor is made of ceramic or polymer.)


Resistance thermometers and thermistors are generally used in two ways. First, they can be used as ]s: By measuring the resistance, the temperature of the environment can be inferred. Second, they can be used in conjunction with ] (also called self-heating): If a large current is running through the resistor, the resistor's temperature rises and therefore its resistance changes. Therefore, these components can be used in a circuit-protection role similar to ], or for ] in circuits, or for many other purposes. In general, self-heating can turn a resistor into a ] and ] circuit element. For more details see ]. Resistance thermometers and thermistors are generally used in two ways. First, they can be used as ]s: by measuring the resistance, the temperature of the environment can be inferred. Second, they can be used in conjunction with ] (also called self-heating): if a large current is running through the resistor, the resistor's temperature rises and therefore its resistance changes. Therefore, these components can be used in a circuit-protection role similar to ], or for ] in circuits, or for many other purposes. In general, self-heating can turn a resistor into a ] and ] circuit element. For more details see ].


If the temperature {{mvar|T}} does not vary too much, a ] is typically used: If the temperature {{mvar|T}} does not vary too much, a ] is typically used:
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=== Strain dependence === === Strain dependence ===
{{main|Strain gauge}} {{main|Strain gauge}}
Just as the resistance of a conductor depends upon temperature, the resistance of a conductor depends upon ].<ref>{{Citation|last=Meyer|first=Sebastian|display-authors = etal|date=2022|pages=114712|language=en|doi=10.1016/j.scriptamat.2022.114712|title=Volume 215|series=Scripta Materialia|chapter=Characterization of the deformation state of magnesium by electrical resistance}}</ref> By placing a conductor under ] (a form of ] that leads to strain in the form of stretching of the conductor), the length of the section of conductor under tension increases and its cross-sectional area decreases. Both these effects contribute to increasing the resistance of the strained section of conductor. Under ] (strain in the opposite direction), the resistance of the strained section of conductor decreases. See the discussion on ]s for details about devices constructed to take advantage of this effect. Just as the resistance of a conductor depends upon temperature, the resistance of a conductor depends upon ].<ref>{{Citation|last=Meyer|first=Sebastian|display-authors = etal|date=2022|pages=114712|language=en|doi=10.1016/j.scriptamat.2022.114712|title=Volume 215|series=Scripta Materialia|chapter=Characterization of the deformation state of magnesium by electrical resistance|volume=215 |s2cid=247959452 |doi-access=free}}</ref> By placing a conductor under ] (a form of ] that leads to strain in the form of stretching of the conductor), the length of the section of conductor under tension increases and its cross-sectional area decreases. Both these effects contribute to increasing the resistance of the strained section of conductor. Under ] (strain in the opposite direction), the resistance of the strained section of conductor decreases. See the discussion on ]s for details about devices constructed to take advantage of this effect.


=== Light illumination dependence === === Light illumination dependence ===
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] ]
] ]
] ]
]

Latest revision as of 19:45, 27 September 2024

Opposition to the passage of an electric current This article is about specific applications of conductivity and resistivity in electrical elements. For other types of conductivity, see Conductivity. For electrical conductivity in general, see Electrical resistivity and conductivity. "Resistive" redirects here. For the term used when referring to touchscreens, see Resistive touchscreen.

Articles about
Electromagnetism
Solenoid
Electrostatics
Magnetostatics
Electrodynamics
Electrical network
Magnetic circuit
Covariant formulation
Scientists
Electric resistance
Common symbolsR
SI unitohm (Ω)
In SI base unitskg⋅m⋅s⋅A
Dimension M L 2 T 3 I 2 {\displaystyle {\mathsf {M}}{\mathsf {L}}^{2}{\mathsf {T}}^{-3}{\mathsf {I}}^{-2}}
Electric conductance
Common symbolsG
SI unitsiemens (S)
In SI base unitskg⋅m⋅s⋅A
Derivations from
other quantities
G = 1 R {\displaystyle G={\frac {1}{R}}}
Dimension M 1 L 2 T 3 I 2 {\displaystyle {\mathsf {M}}^{-1}{\mathsf {L}}^{-2}{\mathsf {T}}^{3}{\mathsf {I}}^{2}}

The electrical resistance of an object is a measure of its opposition to the flow of electric current. Its reciprocal quantity is electrical conductance, measuring the ease with which an electric current passes. Electrical resistance shares some conceptual parallels with mechanical friction. The SI unit of electrical resistance is the ohm (Ω), while electrical conductance is measured in siemens (S) (formerly called the 'mho' and then represented by ℧).

The resistance of an object depends in large part on the material it is made of. Objects made of electrical insulators like rubber tend to have very high resistance and low conductance, while objects made of electrical conductors like metals tend to have very low resistance and high conductance. This relationship is quantified by resistivity or conductivity. The nature of a material is not the only factor in resistance and conductance, however; it also depends on the size and shape of an object because these properties are extensive rather than intensive. For example, a wire's resistance is higher if it is long and thin, and lower if it is short and thick. All objects resist electrical current, except for superconductors, which have a resistance of zero.

The resistance R of an object is defined as the ratio of voltage V across it to current I through it, while the conductance G is the reciprocal: R = V I , G = I V = 1 R . {\displaystyle R={\frac {V}{I}},\qquad G={\frac {I}{V}}={\frac {1}{R}}.}

For a wide variety of materials and conditions, V and I are directly proportional to each other, and therefore R and G are constants (although they will depend on the size and shape of the object, the material it is made of, and other factors like temperature or strain). This proportionality is called Ohm's law, and materials that satisfy it are called ohmic materials.

In other cases, such as a transformer, diode or battery, V and I are not directly proportional. The ratio ⁠V/I⁠ is sometimes still useful, and is referred to as a chordal resistance or static resistance, since it corresponds to the inverse slope of a chord between the origin and an I–V curve. In other situations, the derivative d V d I {\textstyle {\frac {\mathrm {d} V}{\mathrm {d} I}}} may be most useful; this is called the differential resistance.

Introduction

analogy of resistance
The hydraulic analogy compares electric current flowing through circuits to water flowing through pipes. When a pipe (left) is filled with hair (right), it takes a larger pressure to achieve the same flow of water. Pushing electric current through a large resistance is like pushing water through a pipe clogged with hair: It requires a larger push (electromotive force) to drive the same flow (electric current).

In the hydraulic analogy, current flowing through a wire (or resistor) is like water flowing through a pipe, and the voltage drop across the wire is like the pressure drop that pushes water through the pipe. Conductance is proportional to how much flow occurs for a given pressure, and resistance is proportional to how much pressure is required to achieve a given flow.

The voltage drop (i.e., difference between voltages on one side of the resistor and the other), not the voltage itself, provides the driving force pushing current through a resistor. In hydraulics, it is similar: the pressure difference between two sides of a pipe, not the pressure itself, determines the flow through it. For example, there may be a large water pressure above the pipe, which tries to push water down through the pipe. But there may be an equally large water pressure below the pipe, which tries to push water back up through the pipe. If these pressures are equal, no water flows. (In the image at right, the water pressure below the pipe is zero.)

The resistance and conductance of a wire, resistor, or other element is mostly determined by two properties:

  • geometry (shape), and
  • material

Geometry is important because it is more difficult to push water through a long, narrow pipe than a wide, short pipe. In the same way, a long, thin copper wire has higher resistance (lower conductance) than a short, thick copper wire.

Materials are important as well. A pipe filled with hair restricts the flow of water more than a clean pipe of the same shape and size. Similarly, electrons can flow freely and easily through a copper wire, but cannot flow as easily through a steel wire of the same shape and size, and they essentially cannot flow at all through an insulator like rubber, regardless of its shape. The difference between copper, steel, and rubber is related to their microscopic structure and electron configuration, and is quantified by a property called resistivity.

In addition to geometry and material, there are various other factors that influence resistance and conductance, such as temperature; see below.

Conductors and resistors

A 75 Ω resistor, as identified by its electronic color code (violet–green–black–gold–red). An ohmmeter could be used to verify this value.

Substances in which electricity can flow are called conductors. A piece of conducting material of a particular resistance meant for use in a circuit is called a resistor. Conductors are made of high-conductivity materials such as metals, in particular copper and aluminium. Resistors, on the other hand, are made of a wide variety of materials depending on factors such as the desired resistance, amount of energy that it needs to dissipate, precision, and costs.

Ohm's law

Main article: Ohm's law
The current–voltage characteristics of four devices: Two resistors, a diode, and a battery. The horizontal axis is voltage drop, the vertical axis is current. Ohm's law is satisfied when the graph is a straight line through the origin. Therefore, the two resistors are ohmic, but the diode and battery are not.

For many materials, the current I through the material is proportional to the voltage V applied across it: I V {\displaystyle I\propto V} over a wide range of voltages and currents. Therefore, the resistance and conductance of objects or electronic components made of these materials is constant. This relationship is called Ohm's law, and materials which obey it are called ohmic materials. Examples of ohmic components are wires and resistors. The current–voltage graph of an ohmic device consists of a straight line through the origin with positive slope.

Other components and materials used in electronics do not obey Ohm's law; the current is not proportional to the voltage, so the resistance varies with the voltage and current through them. These are called nonlinear or non-ohmic. Examples include diodes and fluorescent lamps.

Relation to resistivity and conductivity

Main article: Electrical resistivity and conductivity
A piece of resistive material with electrical contacts on both ends.

The resistance of a given object depends primarily on two factors: what material it is made of, and its shape. For a given material, the resistance is inversely proportional to the cross-sectional area; for example, a thick copper wire has lower resistance than an otherwise-identical thin copper wire. Also, for a given material, the resistance is proportional to the length; for example, a long copper wire has higher resistance than an otherwise-identical short copper wire. The resistance R and conductance G of a conductor of uniform cross section, therefore, can be computed as

R = ρ A , G = σ A . {\displaystyle {\begin{aligned}R&=\rho {\frac {\ell }{A}},\\G&=\sigma {\frac {A}{\ell }}\,.\end{aligned}}}

where {\displaystyle \ell } is the length of the conductor, measured in metres (m), A is the cross-sectional area of the conductor measured in square metres (m), σ (sigma) is the electrical conductivity measured in siemens per meter (S·m), and ρ (rho) is the electrical resistivity (also called specific electrical resistance) of the material, measured in ohm-metres (Ω·m). The resistivity and conductivity are proportionality constants, and therefore depend only on the material the wire is made of, not the geometry of the wire. Resistivity and conductivity are reciprocals: ρ = 1 / σ {\displaystyle \rho =1/\sigma } . Resistivity is a measure of the material's ability to oppose electric current.

This formula is not exact, as it assumes the current density is totally uniform in the conductor, which is not always true in practical situations. However, this formula still provides a good approximation for long thin conductors such as wires.

Another situation for which this formula is not exact is with alternating current (AC), because the skin effect inhibits current flow near the center of the conductor. For this reason, the geometrical cross-section is different from the effective cross-section in which current actually flows, so resistance is higher than expected. Similarly, if two conductors near each other carry AC current, their resistances increase due to the proximity effect. At commercial power frequency, these effects are significant for large conductors carrying large currents, such as busbars in an electrical substation, or large power cables carrying more than a few hundred amperes.

The resistivity of different materials varies by an enormous amount: For example, the conductivity of teflon is about 10 times lower than the conductivity of copper. Loosely speaking, this is because metals have large numbers of "delocalized" electrons that are not stuck in any one place, so they are free to move across large distances. In an insulator, such as Teflon, each electron is tightly bound to a single molecule so a great force is required to pull it away. Semiconductors lie between these two extremes. More details can be found in the article: Electrical resistivity and conductivity. For the case of electrolyte solutions, see the article: Conductivity (electrolytic).

Resistivity varies with temperature. In semiconductors, resistivity also changes when exposed to light. See below.

Measurement

Main article: Ohmmeter
photograph of an ohmmeter
An ohmmeter

An instrument for measuring resistance is called an ohmmeter. Simple ohmmeters cannot measure low resistances accurately because the resistance of their measuring leads causes a voltage drop that interferes with the measurement, so more accurate devices use four-terminal sensing.

Typical values

See also: Electrical resistivities of the elements (data page) and Electrical resistivity and conductivity
Typical resistance values for selected objects
Component Resistance (Ω)
1 meter of copper wire with 1 mm diameter 0.02
1 km overhead power line (typical) 0.03
AA battery (typical internal resistance) 0.1
Incandescent light bulb filament (typical) 200–1000
Human body 1000–100,000

Static and differential resistance

See also: Small-signal model Differential versus chordal resistanceThe current–voltage curve of a non-ohmic device (purple). The static resistance at point A is the inverse slope of line B through the origin. The differential resistance at A is the inverse slope of tangent line C.Negative differential resistanceThe current–voltage curve of a component with negative differential resistance, an unusual phenomenon where the current–voltage curve is non-monotonic.

Many electrical elements, such as diodes and batteries do not satisfy Ohm's law. These are called non-ohmic or non-linear, and their current–voltage curves are not straight lines through the origin.

Resistance and conductance can still be defined for non-ohmic elements. However, unlike ohmic resistance, non-linear resistance is not constant but varies with the voltage or current through the device; i.e., its operating point. There are two types of resistance:

Static resistance

Also called chordal or DC resistance

This corresponds to the usual definition of resistance; the voltage divided by the current R s t a t i c = V I . {\displaystyle R_{\mathrm {static} }={V \over I}.}

It is the slope of the line (chord) from the origin through the point on the curve. Static resistance determines the power dissipation in an electrical component. Points on the current–voltage curve located in the 2nd or 4th quadrants, for which the slope of the chordal line is negative, have negative static resistance. Passive devices, which have no source of energy, cannot have negative static resistance. However active devices such as transistors or op-amps can synthesize negative static resistance with feedback, and it is used in some circuits such as gyrators.
Differential resistance

Also called dynamic, incremental, or small-signal resistance

It is the derivative of the voltage with respect to the current; the slope of the current–voltage curve at a point R d i f f = d V d I . {\displaystyle R_{\mathrm {diff} }={{\mathrm {d} V} \over {\mathrm {d} I}}.}

If the current–voltage curve is non-monotonic (with peaks and troughs), the curve has a negative slope in some regions—so in these regions the device has negative differential resistance. Devices with negative differential resistance can amplify a signal applied to them, and are used to make amplifiers and oscillators. These include tunnel diodes, Gunn diodes, IMPATT diodes, magnetron tubes, and unijunction transistors.

AC circuits

Impedance and admittance

Main articles: Electrical impedance and Admittance
The voltage (red) and current (blue) versus time (horizontal axis) for a capacitor (top) and inductor (bottom). Since the amplitude of the current and voltage sinusoids are the same, the absolute value of impedance is 1 for both the capacitor and the inductor (in whatever units the graph is using). On the other hand, the phase difference between current and voltage is −90° for the capacitor; therefore, the complex phase of the impedance of the capacitor is −90°. Similarly, the phase difference between current and voltage is +90° for the inductor; therefore, the complex phase of the impedance of the inductor is +90°.

When an alternating current flows through a circuit, the relation between current and voltage across a circuit element is characterized not only by the ratio of their magnitudes, but also the difference in their phases. For example, in an ideal resistor, the moment when the voltage reaches its maximum, the current also reaches its maximum (current and voltage are oscillating in phase). But for a capacitor or inductor, the maximum current flow occurs as the voltage passes through zero and vice versa (current and voltage are oscillating 90° out of phase, see image below). Complex numbers are used to keep track of both the phase and magnitude of current and voltage:

u ( t ) = R e ( U 0 e j ω t ) i ( t ) = R e ( I 0 e j ( ω t + φ ) ) Z = U   I   Y =   1   Z =   I   U {\displaystyle {\begin{array}{cl}u(t)&=\operatorname {\mathcal {R_{e}}} \left(U_{0}\cdot e^{j\omega t}\right)\\i(t)&=\operatorname {\mathcal {R_{e}}} \left(I_{0}\cdot e^{j(\omega t+\varphi )}\right)\\Z&={\frac {U}{\ I\ }}\\Y&={\frac {\ 1\ }{Z}}={\frac {\ I\ }{U}}\end{array}}}

where:

  • t is time;
  • u(t) and i(t) are the voltage and current as a function of time, respectively;
  • U0 and I0 indicate the amplitude of the voltage and current, respectively;
  • ω {\displaystyle \omega } is the angular frequency of the AC current;
  • φ {\displaystyle \varphi } is the displacement angle;
  • U and I are the complex-valued voltage and current, respectively;
  • Z and Y are the complex impedance and admittance, respectively;
  • R e {\displaystyle {\mathcal {R_{e}}}} indicates the real part of a complex number; and
  • j 1   {\displaystyle j\equiv {\sqrt {-1\ }}} is the imaginary unit.

The impedance and admittance may be expressed as complex numbers that can be broken into real and imaginary parts: Z = R + j X Y = G + j B   . {\displaystyle {\begin{aligned}Z&=R+jX\\Y&=G+jB~.\end{aligned}}}

where R is resistance, G is conductance, X is reactance, and B is susceptance. These lead to the complex number identities R = G   G 2 + B 2     , X = B     G 2 + B 2     , G = R   R 2 + X 2     , B = X     R 2 + X 2     , {\displaystyle {\begin{aligned}R&={\frac {G}{\ G^{2}+B^{2}\ }}\ ,\qquad &X={\frac {-B~}{\ G^{2}+B^{2}\ }}\ ,\\G&={\frac {R}{\ R^{2}+X^{2}\ }}\ ,\qquad &B={\frac {-X~}{\ R^{2}+X^{2}\ }}\ ,\end{aligned}}} which are true in all cases, whereas   R = 1 / G   {\displaystyle \ R=1/G\ } is only true in the special cases of either DC or reactance-free current.

The complex angle   θ = arg ( Z ) = arg ( Y )   {\displaystyle \ \theta =\arg(Z)=-\arg(Y)\ } is the phase difference between the voltage and current passing through a component with impedance Z. For capacitors and inductors, this angle is exactly -90° or +90°, respectively, and X and B are nonzero. Ideal resistors have an angle of 0°, since X is zero (and hence B also), and Z and Y reduce to R and G respectively. In general, AC systems are designed to keep the phase angle close to 0° as much as possible, since it reduces the reactive power, which does no useful work at a load. In a simple case with an inductive load (causing the phase to increase), a capacitor may be added for compensation at one frequency, since the capacitor's phase shift is negative, bringing the total impedance phase closer to 0° again.

Y is the reciprocal of Z (   Z = 1 / Y   {\displaystyle \ Z=1/Y\ } ) for all circuits, just as R = 1 / G {\displaystyle R=1/G} for DC circuits containing only resistors, or AC circuits for which either the reactance or susceptance happens to be zero (X or B = 0, respectively) (if one is zero, then for realistic systems both must be zero).

Frequency dependence

A key feature of AC circuits is that the resistance and conductance can be frequency-dependent, a phenomenon known as the universal dielectric response. One reason, mentioned above is the skin effect (and the related proximity effect). Another reason is that the resistivity itself may depend on frequency (see Drude model, deep-level traps, resonant frequency, Kramers–Kronig relations, etc.)

Energy dissipation and Joule heating

Main article: Joule heating
Running current through a material with resistance creates heat, in a phenomenon called Joule heating. In this picture, a cartridge heater, warmed by Joule heating, is glowing red hot.

Resistors (and other elements with resistance) oppose the flow of electric current; therefore, electrical energy is required to push current through the resistance. This electrical energy is dissipated, heating the resistor in the process. This is called Joule heating (after James Prescott Joule), also called ohmic heating or resistive heating.

The dissipation of electrical energy is often undesired, particularly in the case of transmission losses in power lines. High voltage transmission helps reduce the losses by reducing the current for a given power.

On the other hand, Joule heating is sometimes useful, for example in electric stoves and other electric heaters (also called resistive heaters). As another example, incandescent lamps rely on Joule heating: the filament is heated to such a high temperature that it glows "white hot" with thermal radiation (also called incandescence).

The formula for Joule heating is: P = I 2 R {\displaystyle P=I^{2}R} where P is the power (energy per unit time) converted from electrical energy to thermal energy, R is the resistance, and I is the current through the resistor.

Dependence on other conditions

Temperature dependence

Main article: Electrical resistivity and conductivity § Temperature dependence

Near room temperature, the resistivity of metals typically increases as temperature is increased, while the resistivity of semiconductors typically decreases as temperature is increased. The resistivity of insulators and electrolytes may increase or decrease depending on the system. For the detailed behavior and explanation, see Electrical resistivity and conductivity.

As a consequence, the resistance of wires, resistors, and other components often change with temperature. This effect may be undesired, causing an electronic circuit to malfunction at extreme temperatures. In some cases, however, the effect is put to good use. When temperature-dependent resistance of a component is used purposefully, the component is called a resistance thermometer or thermistor. (A resistance thermometer is made of metal, usually platinum, while a thermistor is made of ceramic or polymer.)

Resistance thermometers and thermistors are generally used in two ways. First, they can be used as thermometers: by measuring the resistance, the temperature of the environment can be inferred. Second, they can be used in conjunction with Joule heating (also called self-heating): if a large current is running through the resistor, the resistor's temperature rises and therefore its resistance changes. Therefore, these components can be used in a circuit-protection role similar to fuses, or for feedback in circuits, or for many other purposes. In general, self-heating can turn a resistor into a nonlinear and hysteretic circuit element. For more details see Thermistor#Self-heating effects.

If the temperature T does not vary too much, a linear approximation is typically used: R ( T ) = R 0 [ 1 + α ( T T 0 ) ] {\displaystyle R(T)=R_{0}} where α {\displaystyle \alpha } is called the temperature coefficient of resistance, T 0 {\displaystyle T_{0}} is a fixed reference temperature (usually room temperature), and R 0 {\displaystyle R_{0}} is the resistance at temperature T 0 {\displaystyle T_{0}} . The parameter α {\displaystyle \alpha } is an empirical parameter fitted from measurement data. Because the linear approximation is only an approximation, α {\displaystyle \alpha } is different for different reference temperatures. For this reason it is usual to specify the temperature that α {\displaystyle \alpha } was measured at with a suffix, such as α 15 {\displaystyle \alpha _{15}} , and the relationship only holds in a range of temperatures around the reference.

The temperature coefficient α {\displaystyle \alpha } is typically +3×10 K−1 to +6×10 K−1 for metals near room temperature. It is usually negative for semiconductors and insulators, with highly variable magnitude.

Strain dependence

Main article: Strain gauge

Just as the resistance of a conductor depends upon temperature, the resistance of a conductor depends upon strain. By placing a conductor under tension (a form of stress that leads to strain in the form of stretching of the conductor), the length of the section of conductor under tension increases and its cross-sectional area decreases. Both these effects contribute to increasing the resistance of the strained section of conductor. Under compression (strain in the opposite direction), the resistance of the strained section of conductor decreases. See the discussion on strain gauges for details about devices constructed to take advantage of this effect.

Light illumination dependence

Main articles: Photoresistor and Photoconductivity

Some resistors, particularly those made from semiconductors, exhibit photoconductivity, meaning that their resistance changes when light is shining on them. Therefore, they are called photoresistors (or light dependent resistors). These are a common type of light detector.

Superconductivity

Main article: Superconductivity

Superconductors are materials that have exactly zero resistance and infinite conductance, because they can have V = 0 and I ≠ 0. This also means there is no joule heating, or in other words no dissipation of electrical energy. Therefore, if superconductive wire is made into a closed loop, current flows around the loop forever. Superconductors require cooling to temperatures near 4 K with liquid helium for most metallic superconductors like niobium–tin alloys, or cooling to temperatures near 77 K with liquid nitrogen for the expensive, brittle and delicate ceramic high temperature superconductors. Nevertheless, there are many technological applications of superconductivity, including superconducting magnets.

See also

Footnotes

  1. The resistivity of copper is about 1.7×10 Ω⋅m.
  2. For a fresh Energizer E91 AA alkaline battery, the internal resistance varies from 0.9 Ω at −40 °C, to 0.1 Ω at +40 °C.
  3. A 60 W light bulb (in the USA, with 120 V mains electricity) draws RMS current ⁠60 W/120 V⁠ = 500 mA, so its resistance is ⁠120 V/500 mA⁠ = 240 Ω. The resistance of a 60 W light bulb in Europe (230 V mains) is 900 Ω. The resistance of a filament is temperature-dependent; these values are for when the filament is already heated up and the light is already glowing.
  4. 100 kΩ for dry skin contact, 1 kΩ for wet or broken skin contact. High voltage breaks down the skin, lowering resistance to 500 Ω. Other factors and conditions are relevant as well. For more details, see the electric shock article, and NIOSH 98-131.
  5. See Electrical resistivity and conductivity for a table. The temperature coefficient of resistivity is similar but not identical to the temperature coefficient of resistance. The small difference is due to thermal expansion changing the dimensions of the resistor.

References

  1. ^ Brown, Forbes T. (2006). Engineering System Dynamics: A Unified Graph-Centered Approach (2nd ed.). Boca Raton, Florida: CRC Press. p. 43. ISBN 978-0-8493-9648-9.
  2. ^ Kaiser, Kenneth L. (2004). Electromagnetic Compatibility Handbook. Boca Raton, Florida: CRC Press. pp. 13–52. ISBN 978-0-8493-2087-3.
  3. Fink & Beaty (1923). "Standard Handbook for Electrical Engineers". Nature. 111 (2788) (11th ed.): 17–19. Bibcode:1923Natur.111..458R. doi:10.1038/111458a0. hdl:2027/mdp.39015065357108. S2CID 26358546.
  4. Cutnell, John D.; Johnson, Kenneth W. (1992). Physics (2nd ed.). New York: Wiley. p. 559. ISBN 978-0-471-52919-4.
  5. McDonald, John D. (2016). Electric Power Substations Engineering (2nd ed.). Boca Raton, Florida: CRC Press. pp. 363ff. ISBN 978-1-4200-0731-2.
  6. Battery internal resistance (PDF) (Report). Energizer Corp. Archived from the original (PDF) on 11 January 2012. Retrieved 13 December 2011.
  7. "Worker Deaths by Electrocution" (PDF). National Institute for Occupational Safety and Health. Publication No. 98-131. Retrieved 2 November 2014.
  8. Zhai, Chongpu; Gan, Yixiang; Hanaor, Dorian; Proust, Gwénaëlle (2018). "Stress-dependent electrical transport and its universal scaling in granular materials". Extreme Mechanics Letters. 22: 83–88. arXiv:1712.05938. Bibcode:2018ExML...22...83Z. doi:10.1016/j.eml.2018.05.005. S2CID 51912472.
  9. Ward, M.R. (1971). Electrical Engineering Science. McGraw-Hill. pp. 36–40.
  10. Meyer, Sebastian; et al. (2022), "Characterization of the deformation state of magnesium by electrical resistance", Volume 215, Scripta Materialia, vol. 215, p. 114712, doi:10.1016/j.scriptamat.2022.114712, S2CID 247959452

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