Physics for Scientists and Engineers, Volume 2
Physics for Scientists and Engineers, Volume 2
10th Edition
ISBN: 9781337553582
Author: Raymond A. Serway, John W. Jewett
Publisher: Cengage Learning
bartleby

Concept explainers

bartleby

Videos

Textbook Question
Book Icon
Chapter 23, Problem 5P

Example 23.3 derives the exact expression for the electric field at a point on the axis of a uniformly charged disk. Consider a disk of radius R = 3.00 cm having a uniformly distributed charge of +5.20 μC. (a) Using the result of Example 23.3, compute the electric field at a point on the axis and 3.00 mm from the center. (b) What If? Explain how the answer to part (a) compares with the field computed from the near-field approximation E = σ/2ϵ0. (We derived this expression in Example 23.3.) (c) Using the result of Example 23.3, compute the electric field at a point on the axis and 30.0 cm from the center of the disk. (d) What If? Explain how the answer to part (c) compares with the electric field obtained by treating the disk as a +5.20-μC charged particle at a distance of 30.0 cm.

(a)

Expert Solution
Check Mark
To determine

The electric field at a point on the axis at a distance 3.00mm from the center of the disk.

Answer to Problem 5P

The electric field at a point on the axis and 3.00mm from the center is 9.36×107N/C away from the center of the disk.

Explanation of Solution

 The value of the charge is +5.20μC, radius of the disk is 3.00cm, distance from center of the disk is 3.00mm.

The formula to calculate the surface charge density is,

    σ=qA                                                                                        (1)

The formula to calculate the area is,

    A=πR2                                                                                     (2)

Substitute πR2 for A from equation (2) in equation (1).

    σ=qπR2                                                                                 (3)

Substitute +5.20μC for the value of q, 3.00cm for R in equation (3) to calculate σ.

    =5.20μC×106C1μC3.14×(3.00cm×10-2m1cm)2=0.184005662×102C/m2

The formula to calculate the electric field at a point from the center of a uniformly charged disk is,

    E=σ2ε(1xR2+x2)                                                                (4)

Here, E is the electric field at that point, σ is the surface charge density, εo is the permittivity of the free space, x is the distance of the point from the center of the disk and R is the radius of the disk.

Conclusion:

Substitute 0.184005662×102C/m2 for σ, 8.85×1012C2/Nm2 for εo, 3.00cm for R , 3.00mm for x in equation (4).

    E=0.184005662×102C/m22×8.85×1012C2/Nm2×(13mm×103m1mm((3mm×103m1mm)2+(3cm×102m1cm)2))=9.36×107N/C

Therefore, the electric field at a point on the axis and 3.00mm from the center is 9.36×107N/C away from the center of the disk.

(b)

Expert Solution
Check Mark
To determine

The change in electric field when calculated using near field approximation.

Answer to Problem 5P

The magnitude of electric field when computed from near field approximation is 1.04×108N/C and this value is 11% higher.

Explanation of Solution

The formula to calculate the electric field at a point from the center of a uniformly charged disk is,

    E=σ2ε                                                                                                   (5)

Here, E is the electric field at that point, σ is the surface charge density and εo is the permittivity of the free space.

Conclusion:

Substitute 0.184005662×102C/m2 for σ, 8.85×1012C2/Nm2 for εo, in equation (5) as,

    E=0.184005662×102C/m22×8.85×1012C2/N.m2=1.04×108N/C

The value of electric field for uniformly charged disk for a point 3mm from the center is 9.36×107N/C.

The formula to calculate the percentage change with respect to the field computed from near field approximation is,

    % change=(1.04×1089.36×107)9.36×107×100%11% higher

Therefore, the magnitude of electric field when computed from near field approximation is 1.04×108N/C and this value is 11% higher.

(c)

Expert Solution
Check Mark
To determine

The electric field at a point on the axis at a distance 30.0cm from the center of the disk.

Answer to Problem 5P

The electric field at a point on the axis and 30cm from the center is 5.16×105N/C.

Explanation of Solution

 The value of the charge is +5.2μC, radius of the disk is 3.00cm, distance from center of the disk is 30cm.

The formula to calculate the surface charge density is,

    σ=qA                                                                                        (6)

The formula to calculate the area is,

    A=π×R2                                                                                  (7)

Substitute A=π×R2 from equation (2) in equation (1).

    σ=qπ×R2                                                                                 (8)

Substitute +5.20μC for the value of q, 3.00cm for R in equation (8) to calculate σ.

    =5.20μC×106C1μC3.14×(3.00cm×10-2m1cm)2=0.184005662×102C/m2

The formula to calculate the electric field at a point from the center of a uniformly charged disk is,

    E=σ2ε(1xR2+x2)                                                                 (9)

Here, E is the electric field at that point, σ is the surface charge density, εo is the permittivity of the free space, x is the distance of the point from the center of the disk and R is the radius of the disk.

Conclusion:

Substitute 0.184005662×102C/m2 for σ, 8.85×1012C2/Nm2 for εo, 3.00cm for R , 30cm for x in equation (9).

    E=0.184005662×102C/m22×8.85×1012C2/Nm2×(130cm×102m1cm((30cm×102m1cm)2+(3cm×102m1cm)2))=5.16×105N/C

Therefore, the electric field at a point on the axis and 30cm from the center is 5.16×105N/C.

(d)

Expert Solution
Check Mark
To determine

The change in electric field at 30cm away from the center of the disc when the disc is considered to be a charge of +5.20μC.

Answer to Problem 5P

The magnitude of electric field obtained by treating the disk as a +5.20μC charged particle at a distance of 30cm is 5.19×105N/C and this value is 0.7% higher.

Explanation of Solution

The formula to calculate the electric field of a charged particle is,

    E=keQR2

Here, ke is the electrostatic constant, Q is the electric charge and R is the radius of the hollow sphere.

Substitute 8.99×109Nm2/C for ke, 5.20μC for the value of Q, 30.0cm for R, in the above formula.

    E=keQR2=((8.99×109Nm2/C)(5.20μC×106C1μC)30cm×(102m1cm))=5.19×105N/C

the percentage change when part (c) is compared with the field obtained by treating the disk as a +5.20μC charged particle.

The value of electric field for uniformly charged disk at a point 30cm from the center is 5.16×105N/C.

The value of the electric field while approximating the disc to be a point charge is 5.19×105N/C.

Conclusion:

The formula to calculate the percentage change when part (c) is compared with the field obtained by treating the disk as a +5.20μC charged particle is,

    % change=(5.195.16)×1055.16×105×100=0.03×1055.16×105×100=0.6% higher

Therefore, the magnitude of electric field obtained by treating the disk as a point charge at a distance of 30cm is 5.19×105N/C and this value is 0.6% higher.

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!
Students have asked these similar questions
q.7
Consider a ring of charge.  The ring is in the x-y plane and has a radius of 3.5 m.  The charge per angle as a function of angle α (in radians) around the ring is given by dQ/dα = 6.9 α  (nC/rad). Calculate the z-component of the electric field, in N/C, at the coordinate (0, 0, 9 m).  Use k = 9 x 109 N m2 / C2. (Please answer to the fourth decimal place - i.e 14.3225)
A semicircular wire of radius R is uniformly charged with Q₁ = 4.4Q and located in a two dimensional coordinate system as shown in the figure. A point charge Q₂ = 0.4Q is placed at 0.7R on the y-axis. Determine the electric field at point o in terms of kQ/R² where is the unit vector. Take rt-3.14 and provide your answer with two decimal places. Answer: Q₁ Q₂❤ 0 R Xx

Chapter 23 Solutions

Physics for Scientists and Engineers, Volume 2

Ch. 23 - (a) Consider a uniformly charged, thin-walled,...Ch. 23 - A vertical electric field of magnitude 2.00 104...Ch. 23 - A flat surface of area 3.20 m2 is rotated in a...Ch. 23 - A nonuniform electric field is given by the...Ch. 23 - An uncharged, nonconducting, hollow sphere of...Ch. 23 - Find the net electric flux through the spherical...Ch. 23 - Four closed surfaces, S1 through S4 together with...Ch. 23 - A charge of 170 C is at the center of a cube of...Ch. 23 - (a) Find the net electric flux through the cube...Ch. 23 - A particle with charge of 12.0 C is placed at the...Ch. 23 - A particle with charge Q = 5.00 C is located at...Ch. 23 - A particle with charge Q is located at the center...Ch. 23 - (a) A panicle with charge q is located a distance...Ch. 23 - Find the net electric flux through (a) the closed...Ch. 23 - Figure P23.23 represents the top view of a cubic...Ch. 23 - Determine the magnitude of the electric field at...Ch. 23 - In nuclear fission, a nucleus of uranium-238,...Ch. 23 - Suppose you fill two rubber balloons with air,...Ch. 23 - A large, flat, horizontal sheet of charge has a...Ch. 23 - A nonconducting wall carries charge with a uniform...Ch. 23 - A uniformly charged, straight filament 7.00 m in...Ch. 23 - You are working on a laboratory device that...Ch. 23 - Consider a long, cylindrical charge distribution...Ch. 23 - Assume the magnitude of the electric field on each...Ch. 23 - A solid sphere of radius 40.0 cm has a total...Ch. 23 - A cylindrical shell of radius 7.00 cm and length...Ch. 23 - You are working for the summer at a research...Ch. 23 - You are working for the summer at a research...Ch. 23 - Find the electric flux through the plane surface...Ch. 23 - Three solid plastic cylinders all have radius 2.50...Ch. 23 - A line of charge starts at x = +x0 and extends to...Ch. 23 - Show that the maximum magnitude Emax of the...Ch. 23 - A line of positive charge is formed into a...Ch. 23 - A very large conducting plate lying in the xy...Ch. 23 - A sphere of radius R = 1.00 m surrounds a particle...Ch. 23 - A sphere of radius R surrounds a particle with...Ch. 23 - A slab of insulating material has a nonuniform...Ch. 23 - A sphere of radius 2a is made of a nonconducting...Ch. 23 - An infinitely long insulating cylinder of radius R...Ch. 23 - A particle with charge Q is located on the axis of...Ch. 23 - Review. A slab of insulating material (infinite in...Ch. 23 - Identical thin rods of length 2a carry equal...Ch. 23 - A solid insulating sphere of radius R has a...
Knowledge Booster
Background pattern image
Physics
Learn more about
Need a deep-dive on the concept behind this application? Look no further. Learn more about this topic, physics and related others by exploring similar questions and additional content below.
Similar questions
SEE MORE QUESTIONS
Recommended textbooks for you
Text book image
Physics for Scientists and Engineers: Foundations...
Physics
ISBN:9781133939146
Author:Katz, Debora M.
Publisher:Cengage Learning
Text book image
Principles of Physics: A Calculus-Based Text
Physics
ISBN:9781133104261
Author:Raymond A. Serway, John W. Jewett
Publisher:Cengage Learning
Text book image
Physics for Scientists and Engineers with Modern ...
Physics
ISBN:9781337553292
Author:Raymond A. Serway, John W. Jewett
Publisher:Cengage Learning
Text book image
Physics for Scientists and Engineers
Physics
ISBN:9781337553278
Author:Raymond A. Serway, John W. Jewett
Publisher:Cengage Learning
Text book image
University Physics Volume 2
Physics
ISBN:9781938168161
Author:OpenStax
Publisher:OpenStax
Electric Fields: Crash Course Physics #26; Author: CrashCourse;https://www.youtube.com/watch?v=mdulzEfQXDE;License: Standard YouTube License, CC-BY