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20.3: Resistance and Resistivity

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    2681
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    Learning Objectives

    By the end of this section, you will be able to:

    • Explain the concept of resistivity.
    • Use resistivity to calculate the resistance of specified configurations of material.
    • Use the thermal coefficient of resistivity to calculate the change of resistance with temperature.

    Material and Shape Dependence of Resistance

    The resistance of an object depends on its shape and the material of which it is composed. The cylindrical resistor in Figure 1 is easy to analyze, and, by so doing, we can gain insight into the resistance of more complicated shapes. As you might expect, the cylinder’s electric resistance \(R\) is directly proportional to its length \(L\), similar to the resistance of a pipe to fluid flow. The longer the cylinder, the more collisions charges will make with its atoms. The greater the diameter of the cylinder, the more current it can carry (again similar to the flow of fluid through a pipe). In fact, \(R\) is inversely proportional to the cylinder’s cross-sectional area \(A\).

    A cylindrical conductor of length L and cross section A is shown. The resistivity of the cylindrical section is represented as rho. The resistance of this cross section R is equal to rho L divided by A. The section of length L of cylindrical conductor is shown equivalent to a resistor represented by symbol R.
    Figure \(\PageIndex{1}\): A uniform cylinder of length \(L\) and cross-sectional area \(A\). Its resistance to the flow of current is similar to the resistance posed by a pipe to fluid flow. The longer the cylinder, the greater its resistance. The larger its cross-sectional area \(A\), the smaller its resistance.

    For a given shape, the resistance depends on the material of which the object is composed. Different materials offer different resistance to the flow of charge. We define the resistivity \(\rho\) of a substance so that the resistance \(R\) of an object is directly proportional to \(\rho\). Resistivity \(\rho\) is an intrinsic property of a material, independent of its shape or size. The resistance \(R\) of a uniform cylinder of length \(L\), of cross-sectional area \(A\), and made of a material with resistivity \(\rho\), is \[R = \frac{\rho L}{A}. \label{20.4.1}\] The table below gives representative values of \(\rho\). The materials listed in the table are separated into categories of conductors, semiconductors, and insulators, based on broad groupings of resistivities. Conductors have the smallest resistivities, and insulators have the largest; semiconductors have intermediate resistivities. Conductors have varying but large free charge densities, whereas most charges in insulators are bound to atoms and are not free to move. Semiconductors are intermediate, having far fewer free charges than conductors, but having properties that make the number of free charges depend strongly on the type and amount of impurities in the semiconductor. These unique properties of semiconductors are put to use in modern electronics, as will be explored in later chapters.

    Table \(\PageIndex{1}\) gives representative values of ρ. The materials listed in the table are separated into categories of conductors, semiconductors, and insulators, based on broad groupings of resistivities. Conductors have the smallest resistivities, and insulators have the largest; semiconductors have intermediate resistivities. Conductors have varying but large free charge densities, whereas most charges in insulators are bound to atoms and are not free to move. Semiconductors are intermediate, having far fewer free charges than conductors, but having properties that make the number of free charges depend strongly on the type and amount of impurities in the semiconductor. These unique properties of semiconductors are put to use in modern electronics, as will be explored in later chapters.

    Table \(\PageIndex{1}\): Resistivities ρ of Various materials at 20ºC
    Material Resistivity ρ ( Ω⋅m )
    Conductors  
    Silver \(1.59x10^{−8}\)
    Copper \(1.72x10^{−8}\)
    Gold \(2.44x10^{−8}\)
    Aluminum \(2.65x10^{−8}\)
    Tungsten \(5.6x10^{−8}\)
    Iron \(9.71x10^{−8}\)
    Platinum \(10.6x10^{−8}\)
    Steel \(20x10^{−8}\)
    Lead \(22x10^{−8}\)
    Manganin (Cu, Mn, Ni alloy) \(44x10^{−8}\)
    Constantan (Cu, Ni alloy) \(49x10^{−8}\)
    Mercury \(96x10^{−8}\)
    Nichrome (Ni, Fe, Cr alloy) \(100x10^{−8}\)
    Semiconductors  
    Carbon (pure) \(3.5x10^{−5}\)
    Carbon \((3.5−6.0)x10^{−5}\)
    Germanium (pure) \(600x10^{−3}\)
    Germanium \((1−600)x10^{−3}\)
    Silicon (pure) 2300
    Silion 0.1−2300
    Insulators  
    Amber \(5x10^{14}\)
    Glass \(10^{9}−10^{14}\)
    Lucite \(>10^{13}\)
    Mica \(10^{11}−10^{15}\)
    Quartz (fused) \(75x10^{16}\)
    Rubber (hard) \(10^{13}−10^{16}\)
    Sulfur \(10^{15}\)
    Teflon \(>10^{13}\)
    Wood \(10^{8}−10^{11}\)

    Example \(\PageIndex{1}\):Calculating Resistor Diameter: A Headlight Filament

    A car headlight filament is made of tungsten and has a cold resistance of 0.350Ω. If the filament is a cylinder 4.00 cm long (it may be coiled to save space), what is its diameter?

    Strategy

    We can rearrange the equation \(R=\frac{ρL}{A}\) to find the cross-sectional area \(A\) of the filament from the given information. Then its diameter can be found by assuming it has a circular cross-section.

    Solution

    The cross-sectional area, found by rearranging the expression for the resistance of a cylinder given in \(R=\frac{ρL}{A}\), is

    \(A=\frac{ρL}{R}\).

    Substituting the given values, and taking ρ from Table \(\PageIndex{1}\), yields

    \(A=\frac{(5.6×10^{–8}Ω⋅m)(4.00×10^{–2}m)}{0.350Ω}=6.40×10^{–9}m^2\).

    The area of a circle is related to its diameter \(D\) by

    \(A=\frac{πD^2}{4}\).

    Solving for the diameter \(D\), and substituting the value found for \(A\), gives

    \(D=2(\frac{A}{p})^{\frac{1}{2}}=2(\frac{6.40×10^{–9}m^2}{3.14})^{\frac{1}{2}}=9.0×10^{–5}m\).

    Discussion

    The diameter is just under a tenth of a millimeter. It is quoted to only two digits, because ρ is known to only two digits.

    Temperature Variation of Resistance

    The resistivity of all materials depends on temperature. Some even become superconductors (zero resistivity) at very low temperatures. (See Figure 2.) Conversely, the resistivity of conductors increases with increasing temperature. Since the atoms vibrate more rapidly and over larger distances at higher temperatures, the electrons moving through a metal make more collisions, effectively making the resistivity higher. Over relatively small temperature changes (about \(100^{\circ} C \) or less), resistivity \(\rho\) varies with temperature change \(\Delta T\) as expressed in the following equation \[\rho = \rho_{0} \left( 1 + \alpha \Delta T \right) , \label{20.4.2}\] where \(\rho_{0}\) is the original resistivity and \(\alpha\) is the temperature coefficient of resistivity. (See the values of \(\alpha\) in the table below.) For larger temperature changes, \(\alpha\) may vary or a nonlinear equation may be needed to find \(\rho\). Note that \(\alpha\) is positive for metals, meaning their resistivity increases with temperature. Some alloys have been developed specifically to have a small temperature dependence. Manganin (which is made of copper, manganese and nickel), for example, has \(\alpha\) close to zero (to three digits on the scale in the table), and so its resistivity varies only slightly with temperature. This is useful for making a temperature-independent resistance standard, for example.

    A graph for variation of resistance R with temperature T for a mercury sample is shown. The temperature T is plotted along the x axis and is measured in Kelvin, and the resistance R is plotted along the y axis and is measured in ohms. The curve starts at x equals zero and y equals zero, and coincides with the X axis until the value of temperature is four point two Kelvin, known as the critical temperature T sub c. At temperature T sub c, the curve shows a vertical rise, represented by a dotted line, until the resistance is about zero point one one ohms. After this temperature the resistance shows a nearly linear increase with temperature T.
    Figure \(\PageIndex{2}\): The resistance of a sample of mercury is zero at very low temperatures—it is a superconductor up to about 4.2 K. Above that critical temperature, its resistance makes a sudden jump and then increases nearly linearly with temperature.
    Table \(\PageIndex{2}\): Tempature Coefficients of Resistivity α
    Material Coefficient α(1/°C)
    Conductors  
    Silver \(3.8x10^{−3}\)
    Copper \(3.9x10^{−3}\)
    Gold \(3.4x10^{−3}\)
    Aluminum \(3.9x10^{−3}\)
    Tungsten \(4.5x10^{−3}\)
    Iron \(5.0x10^{−3}\)
    Platinum \(3.93x10^{−3}\)
    Lead \(3.9x10^{−3}\)
    Manganin (Cu, Mn, Ni alloy) \(0.000x10^{−3}\)
    Constantan (Cu, Ni, alloy) \(0.002x10^{−3}\)
    Mercury \(0.89x10^{−3}\)
    Nichrome (Ni, Fe, Cr alloy) \(0.4x10^{−3}\)
    Semiconductors  
    Carbon (pure) \(−0.5x10^{−3}\)
    Germanium (pure) \(−50x10^{−3}\)
    Silicon (pure) \(−70x10^{−3}\)

    Note also that \(\alpha\) is negative for the semiconductors listed in the table, meaning that their resistivity decreases with increasing temperature. They become better conductors at higher temperature, because increased thermal agitation increases the number of free charges available to carry current. This property of decreasing \(\rho\) with temperature is also related to the type and amount of impurities present in the semiconductors.

    The resistance of an object also depends on temperature, since \(R_{0}\) is directly proportional to \(\rho\). For a cylinder we know \(R = \rho L / A\), and so, if \(L\) and \(A\) do not change greatly with temperature, \(R\) will have the same temperature dependence as \(\rho\). (Examination of the coefficients of linear expansion shows them to be about two orders of magnitude less than typical temperature coefficients of resistivity, and so the effect of temperature on \(L\) and \(A\) is about two orders of magnitude less than on \(\rho\).) Thus, \[R = R_{0} \left( 1 + \alpha \Delta T \right) \label{20.4.3}\] is the temperature dependence of the resistance of an object, where \(R_{0}\) is the original resistance and \(R\) is the resistance after a temperature change \(\Delta T\). Numerous thermometers are based on the effect of temperature on resistance. (See Figure 3.) One of the most common is the thermistor, a semiconductor crystal with a strong temperature dependence, the resistance of which is measured to obtain its temperature. The device is small, so that it quickly comes into thermal equilibrium with the part of a person it touches.

    A photograph showing two digital thermometers used for measuring body temperature.
    Figure \(\PageIndex{3}\):These familiar thermometers are based on the automated measurement of a thermistor’s temperature-dependent resistance. (credit: Biol, Wikimedia Commons)

    Example \(\PageIndex{2}\):Calculating Resistance: Hot-Filament Resistance:

    Although caution must be used in applying \(\rho = \rho_{0} \left( 1 + \alpha \Delta T \right) \) and \(R = R_{0} \left( 1+ \alpha \Delta T \right) \) for temperature changes greater than \(100^{\circ}C\), for tungsten the equations work reasonably well for very large temperature changes. What, then, is the resistance of the tungsten filament in the previous example if its temperature is increased from room temperature (\(20^{\circ}C\)) to a typical operating temperature of \(2850^{\circ}C\)?

    Strategy

    This is a straightforward application of \(R = R_{0} \left(1+ \alpha \Delta T\right)\), since the original resistance of the filament was givent o eb \(R_{0} = 0.350 \Omega\), and the temperature change is \(\Delta T = 2830^{\circ}C\).

    Solution

    The hot resistance \(R\) is obtained by entering known values into the above equation:

    \[\begin{align*} R &= R_{0} \left(1+\alpha\Delta T\right) \\[4pt] &= \left(0.350 \Omega\right)\left[1+\left(4.5 \times 10^{-3} /^{\circ}C\right)\right] \\[4pt] &= 4.8 \Omega \end{align*}\]

    Discussion

    This value is consistent with the headlight resistance example in 20.3.

    PHET EXPLORATIONS: RESISTANCE IN A WIRE

    Learn about the physics of resistance in a wire. Change its resistivity, length, and area to see how they affect the wire's resistance. The sizes of the symbols in the equation change along with the diagram of a wire.

    PhET_Icon.png
    Figure \(\PageIndex{4}\): Resistance in a Wire

    Summary

    • The resistance \(R\) of a cylinder of length \(L\) and cross-sectional area \(A\) is \(R = \frac{\rho L}{A}\), where \(\rho\) is the resistivity of the material.
    • Values of \(\rho\) in the Table show that materials fall into three groups—conductors, semiconductors, and insulators.
    • Temperature affects resistivity; for relatively small temperature changes \(\Delta T\), resistivity is \(\rho = \rho_{0}\left(1+\alpha\Delta T\right), where \(\rho_{0}\) is the original resistivity and \(\alpha\) is the temperature coefficient of resistivity.
    • The Table gives values for \(\alpha\), the temperature coefficient of resistivity.
    • The resistance \(R\) of an object also varies with temperature: \(R = R_{0} \left(1+\alpha \Delta T\right)\), where \(R_{0}\) is the original resistance, and \(R\) is the resistance after the temperature change.

    Footnotes

    1 Values depend strongly on amounts and types of impurities

    2 Values at 20°C.

    Glossary

    resistivity
    an intrinsic property of a material, independent of its shape or size, directly proportional to the resistance, denoted by ρ
    temperature coefficient of resistivity
    an empirical quantity, denoted by α, which describes the change in resistance or resistivity of a material with temperature

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