EBK COLLEGE PHYSICS, VOLUME 2
EBK COLLEGE PHYSICS, VOLUME 2
11th Edition
ISBN: 9781337514644
Author: Vuille
Publisher: CENGAGE LEARNING - CONSIGNMENT
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Chapter 17, Problem 66AP

When a straight wire is heated, its resistance changes according to the equation

R = R0 [1 + α(TT0)]

(Eq. 17.7), where α is the temperature coefficient of resistivity. (a) Show that a more precise result, which includes the length and area of a wire change when it is heated, is

R = R 0 [ 1   +   α ( T T 0 ) ] [ 1   +   α ( T T 0 ) ] [ 1   +   2 α ( T T 0 ) ]

where α′ is the coefficient of linear expansion. (See Topic 10.) (b) Compare the two results for a 2.00-m-long copper wire of radius 0.100 mm, starting at 20.0°C and heated to 100.0°C.

(a)

Expert Solution
Check Mark
To determine
The formula to calculate the variation of resistance with change in temperature on taking into account the variation of length and area of cross section of resistor with respect to temperature.

Answer to Problem 66AP

It is proved that the required formula is R=R0[(1+α(TT0))][(1+α(TT0))][(1+2α(TT0))]

Explanation of Solution

Given Info: Variation of resistance with respect to temperature is given by R=R0(1+α(TT0)) .

Explanation:

Formula to calculate the resistance at temperature T0 is,

R0=ρ0L0A0 (I)

  • R0 is the resistance at temperature T0
  • ρ0 is the resistivity of the material of resistor at temperature T0
  • L0 is the length of the resistor at temperature T0
  • A0 is the area of cross section of the resistor at temperature T0

Formula to calculate the resistance at temperature T is,

R=ρLA (II)

  • R is the resistance at temperature T
  • ρ is the resistivity of the material of resistor at temperature T
  • L is the length of the resistor at temperature T
  • A is the area of cross section of the resistor at temperature T

Formula to calculate the variation of resistivity with respect to temperature is,

ρ=ρ0(1+α(TT0)) (III)

  • ρ is the resistivity at temperature T ,
  • ρ0 is the resistivity at temperature T0 ,
  • α is the temperature coefficient of resistivity,

Formula to calculate the variation of L with respect to temperature is,

L=L0(1+α(TT0)) (IV)

  • L0 is the length of the resistor at temperature T0 ,
  • α is the coefficient of linear expansion,

Formula to calculate the variation of L with respect to temperature is,

A=A0(1+2α(TT0)) (V)

  • A0 is the area of cross section of the resistor at temperature T0

Substitute equation (II), equation (III) and equation (IV) in equation (I) and rewrite R .

R=(ρ0L0A0)[(1+α(TT0))][(1+α(TT0))][(1+2α(TT0))] .(VI)

Substitute R0 for ρ0L0A0 from eq.(I) in the above formula and rewrite R

R=R0[(1+α(TT0))][(1+α(TT0))][(1+2α(TT0))]

is the required formula.

Conclusion: It is proved that the formula to calculate the variation of resistance with change in temperature on taking into account the variation of length and area of cross section of resistor with respect to temperature is R=R0[(1+α(TT0))][(1+α(TT0))][(1+2α(TT0))]

(b)

Expert Solution
Check Mark
To determine
The resistance of copper wire at 100.0°C using formulas with and without considering the temperature dependence of length and area. Compare the results.

Answer to Problem 66AP

The resistance of copper wire at 100.0°C without considering the temperature dependence of length and area of cross section is 1.42Ω . The resistance of copper wire at 100.0°C on considering the temperature dependence of length and area of cross section is 1.418Ω .

Explanation of Solution

Given Info: The length of copper wire is 2.00m and radius is 0.100mm . The copper wire is heated from 20.0°C to 100.0°C

Explanation:

Formula to calculate the variation of resistance with respect to temperature without considering the temperature dependence of length and area of cross section is

R=(ρ0L0πr02)(1+α(TT0))

  • r0 is the radius of copper wire at 20.0°C

Substitute 1.7×108Ωm for ρ0 , 2.00m for L0 , 3.14 for π , 0.100mm for r0 , 3.9×103°C for α , 100.0°C for T and 20.0°C for T0 in the above equation to find R .

R=(1.7×108Ωm)(2.00m)(3.14)(0.100mm)(10-6m21mm2)(1+[(3.9×103°C)(100.0°C20.0°C)])=1.420Ω

The resistance is 1.42Ω

Formula to calculate the variation of resistance with respect to temperature on considering the temperature dependence of length and area of cross section is

R=(ρ0L0πr02)[(1+α(TT0))][(1+α(TT0))][(1+2α(TT0))]

Substitute 1.7×108Ωm for ρ0 , 2.00m for L0 , 3.14 for π , 0.100mm for r0 , 3.9×103°C for α , 17×106(°C)1 for α , 100.0°C for T and 20.0°C for T0 in the above equation to find R .

R={[(1.7×108Ωm)(2.00m)(3.14)(0.100mm)(10-6m21mm2)][[(1+(3.9×103°C)(100.0°C20.0°C))][(1+(17×106(°C)1)(100.0°C20.0°C))][(1+2((17×106(°C)1))(100.0°C20.0°C))]]}=1.418Ω

The resistance is 1.418Ω

Conclusion: The resistance of copper wire at 100.0°C without considering the temperature dependence of length and area of cross section is 1.42Ω . The resistance of copper wire at 100.0°C on considering the temperature dependence of length and area of cross section is 1.418Ω .

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Chapter 17 Solutions

EBK COLLEGE PHYSICS, VOLUME 2

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