Calculus: Early Transcendentals (2nd Edition)
2nd Edition
ISBN: 9780321947345
Author: William L. Briggs, Lyle Cochran, Bernard Gillett
Publisher: PEARSON
expand_more
expand_more
format_list_bulleted
Textbook Question
Chapter 14.8, Problem 20E
Computing flux Use the Divergence Theorem to compute the net outward flux of the following fields across the given surfaces S.
20. F = 〈x2, y2, z2〉; S is the sphere {(x, y, z): x2 + y2 + z2 = 25}.
Expert Solution & Answer
Want to see the full answer?
Check out a sample textbook solutionStudents have asked these similar questions
Q4: Write the parametric equation of revolution surface in matrix
form only which generated by rotate a Bezier curve defined by the
coefficient parameter in one plane only, for the x-axis [0,5, 10,4],
y-axis [1,4,2,2] respectively, for u-0.5 and 0 = 45° Note: [the
rotation about y-axis].
Two small charged objects attract each other with a force F when separated by a distance d.If the charge on each object is reduced to one-fourth of its original value and the distance between them is reduced to d/2,the force becomes?
llowing function on the axes provided. f(x)={(-2 for x<=-4),(2x+1 for x>0):}
Chapter 14 Solutions
Calculus: Early Transcendentals (2nd Edition)
Ch. 14.1 - How is a vector field F = f, g, h used to describe...Ch. 14.1 - Sketch the vector field F = x, y.Ch. 14.1 - Prob. 3ECh. 14.1 - Prob. 4ECh. 14.1 - Interpret the gradient field of the temperature...Ch. 14.1 - Two-dimensional vector fields Sketch the following...Ch. 14.1 - Two-dimensional vector fields Sketch the following...Ch. 14.1 - Two-dimensional vector fields Sketch the following...Ch. 14.1 - Two-dimensional vector fields Sketch the following...Ch. 14.1 - Two-dimensional vector fields Sketch the following...
Ch. 14.1 - Two-dimensional vector fields Sketch the following...Ch. 14.1 - Two-dimensional vector fields Sketch the following...Ch. 14.1 - Two-dimensional vector fields Sketch the following...Ch. 14.1 - Two-dimensional vector fields Sketch the following...Ch. 14.1 - Two-dimensional vector fields Sketch the following...Ch. 14.1 - Matching vector Fields with graphs Match vector...Ch. 14.1 - Prob. 17ECh. 14.1 - Prob. 18ECh. 14.1 - Prob. 19ECh. 14.1 - Prob. 20ECh. 14.1 - Three-dimensional vector fields Sketch a few...Ch. 14.1 - Prob. 22ECh. 14.1 - Three-dimensional vector fields Sketch a few...Ch. 14.1 - Three-dimensional vector fields Sketch a few...Ch. 14.1 - Gradient fields Find the gradient field F = for...Ch. 14.1 - Gradient fields Find the gradient field F = for...Ch. 14.1 - Gradient fields Find the gradient field F = for...Ch. 14.1 - Gradient fields Find the gradient field F = for...Ch. 14.1 - Gradient fields Find the gradient field F = for...Ch. 14.1 - Gradient fields Find the gradient field F = for...Ch. 14.1 - Gradient fields Find the gradient field F = for...Ch. 14.1 - Gradient fields Find the gradient field F = for...Ch. 14.1 - Gradient fields Find the gradient field F = for...Ch. 14.1 - Gradient fields Find the gradient field F = for...Ch. 14.1 - Gradient fields Find the gradient field F = for...Ch. 14.1 - Gradient fields Find the gradient field F = for...Ch. 14.1 - Equipotential curves Consider the following...Ch. 14.1 - Equipotential curves Consider the following...Ch. 14.1 - Equipotential curves Consider the following...Ch. 14.1 - Equipotential curves Consider the following...Ch. 14.1 - Explain why or why not Determine whether the...Ch. 14.1 - Prob. 42ECh. 14.1 - Prob. 43ECh. 14.1 - Design your own vector field Specify the component...Ch. 14.1 - Design your own vector field Specify the component...Ch. 14.1 - Design your own vector field Specify the component...Ch. 14.1 - Design your own vector field Specify the component...Ch. 14.1 - Electric field due to a point charge The electric...Ch. 14.1 - Electric field due to a line of charge The...Ch. 14.1 - Gravitational force due to a mass The...Ch. 14.1 - Flow curves in the plane Let...Ch. 14.1 - Flow curves in the plane Let...Ch. 14.1 - Flow curves in the plane Let...Ch. 14.1 - Flow curves in the plane Let...Ch. 14.1 - Flow curves in the plane Let...Ch. 14.1 - Prob. 56ECh. 14.1 - Prob. 57ECh. 14.1 - Prob. 58ECh. 14.1 - Prob. 59ECh. 14.1 - Prob. 60ECh. 14.1 - Cartesian-to-polar vector field Write the vector...Ch. 14.2 - How does a line integral differ from the...Ch. 14.2 - Prob. 2ECh. 14.2 - If a curve C is given by r(t) = t, t2, what is...Ch. 14.2 - Prob. 4ECh. 14.2 - Prob. 5ECh. 14.2 - Prob. 6ECh. 14.2 - Prob. 7ECh. 14.2 - Prob. 8ECh. 14.2 - Prob. 9ECh. 14.2 - Prob. 10ECh. 14.2 - Scalar line integrals with arc length as parameter...Ch. 14.2 - Prob. 12ECh. 14.2 - Scalar line integrals with arc length as parameter...Ch. 14.2 - Prob. 14ECh. 14.2 - Scalar line integrals in the plane a.Find a...Ch. 14.2 - Prob. 16ECh. 14.2 - Scalar line integrals in the plane a.Find a...Ch. 14.2 - Scalar line integrals in the plane a.Find a...Ch. 14.2 - Scalar line integrals in the plane a.Find a...Ch. 14.2 - Prob. 20ECh. 14.2 - Average values Find the average value of the...Ch. 14.2 - Average values Find the average value of the...Ch. 14.2 - Prob. 23ECh. 14.2 - Average values Find the average value of the...Ch. 14.2 - Scalar line integrals in 3Convert the line...Ch. 14.2 - Scalar line integrals in 3Convert the line...Ch. 14.2 - Prob. 27ECh. 14.2 - Scalar line integrals in 3Convert the line...Ch. 14.2 - Prob. 29ECh. 14.2 - Prob. 30ECh. 14.2 - Length of curves Use a scalar line integral to...Ch. 14.2 - Length of curves Use a scalar line integral to...Ch. 14.2 - Line integrals of vector fields in the plane Given...Ch. 14.2 - Line integrals of vector fields in the plane Given...Ch. 14.2 - Line integrals of vector fields in the plane Given...Ch. 14.2 - Line integrals of vector fields in the plane Given...Ch. 14.2 - Line integrals of vector fields in the plane Given...Ch. 14.2 - Line integrals of vector fields in the plane Given...Ch. 14.2 - Work integrals Given the force field F, find the...Ch. 14.2 - Work integrals Given the force field F, find the...Ch. 14.2 - Work integrals Given the force field F, find the...Ch. 14.2 - Work integrals Given the force field F, find the...Ch. 14.2 - Work integrals in 3 Given the force field F, find...Ch. 14.2 - Work integrals in 3 Given the force field F, find...Ch. 14.2 - Work integrals in 3 Given the force field F, find...Ch. 14.2 - Work integrals in 3 Given the force field F, find...Ch. 14.2 - Circulation Consider the following vector fields F...Ch. 14.2 - Prob. 48ECh. 14.2 - Flux Consider the vector fields and curves in...Ch. 14.2 - Prob. 50ECh. 14.2 - Explain why or why not Determine whether the...Ch. 14.2 - Flying into a headwind An airplane flies in the...Ch. 14.2 - Prob. 53ECh. 14.2 - Prob. 54ECh. 14.2 - Changing orientation Let f(x, y) = x and let C be...Ch. 14.2 - Prob. 56ECh. 14.2 - Zero circulation fields 57.Consider the vector...Ch. 14.2 - Zero flux fields 58.For what values of a and d...Ch. 14.2 - Zero flux fields 59.Consider the vector field F =...Ch. 14.2 - Work in a rotation field Consider the rotation...Ch. 14.2 - Prob. 61ECh. 14.2 - Mass and density A thin wire represented by the...Ch. 14.2 - Mass and density A thin wire represented by the...Ch. 14.2 - Heat flux in a plate A square plate R = {(x, y): 0...Ch. 14.2 - Prob. 65ECh. 14.2 - Flux across curves in a vector field Consider the...Ch. 14.2 - Looking ahead: Area from line integrals The area...Ch. 14.2 - Looking ahead: Area from line integrals The area...Ch. 14.3 - What does it mean for a function to have an...Ch. 14.3 - What are local maximum and minimum values of a...Ch. 14.3 - What conditions must be met to ensure that a...Ch. 14.3 - How do you determine whether a vector field in 3...Ch. 14.3 - Briefly describe how to find a potential function ...Ch. 14.3 - If F is a conservative vector field on a region R,...Ch. 14.3 - If F is a conservative vector field on a region R,...Ch. 14.3 - Give three equivalent properties of conservative...Ch. 14.3 - How do you determine the absolute maximum and...Ch. 14.3 - Explain how a function can have an absolute...Ch. 14.3 - Testing for conservative vector fields Determine...Ch. 14.3 - Testing for conservative vector fields Determine...Ch. 14.3 - Testing for conservative vector fields Determine...Ch. 14.3 - Testing for conservative vector fields Determine...Ch. 14.3 - Finding potential functions Determine whether the...Ch. 14.3 - Finding potential functions Determine whether the...Ch. 14.3 - Finding potential functions Determine whether the...Ch. 14.3 - Finding potential functions Determine whether the...Ch. 14.3 - Designing a function Sketch a graph of a function...Ch. 14.3 - Prob. 20ECh. 14.3 - Designing a function Sketch a graph of a function...Ch. 14.3 - Designing a function Sketch a graph of a function...Ch. 14.3 - Finding potential functions Determine whether the...Ch. 14.3 - Finding potential functions Determine whether the...Ch. 14.3 - Finding potential functions Determine whether the...Ch. 14.3 - Finding potential functions Determine whether the...Ch. 14.3 - Evaluating line integrals Evaluate the line...Ch. 14.3 - Prob. 28ECh. 14.3 - Evaluating line integrals Evaluate the line...Ch. 14.3 - Evaluating line integrals Evaluate the line...Ch. 14.3 - Evaluating line integrals Evaluate the line...Ch. 14.3 - Evaluating line integrals Evaluate the line...Ch. 14.3 - Line integrals of vector fields on closed curves...Ch. 14.3 - Line integrals of vector fields on closed curves...Ch. 14.3 - Line integrals of vector fields on closed curves...Ch. 14.3 - Line integrals of vector fields on closed curves...Ch. 14.3 - Line integrals of vector fields on closed curves...Ch. 14.3 - Line integrals of vector fields on closed curves...Ch. 14.3 - Explain why or why not Determine whether the...Ch. 14.3 - Line integrals Evaluate each line integral using a...Ch. 14.3 - Prob. 41ECh. 14.3 - Line integrals Evaluate each line integral using a...Ch. 14.3 - Line integrals Evaluate each line integral using a...Ch. 14.3 - Prob. 44ECh. 14.3 - Work in force fields Find the work required to...Ch. 14.3 - Work in force fields Find the work required to...Ch. 14.3 - Work in force fields Find the work required to...Ch. 14.3 - Work in force fields Find the work required to...Ch. 14.3 - Prob. 49ECh. 14.3 - Prob. 50ECh. 14.3 - Prob. 51ECh. 14.3 - Conservation of energy Suppose an object with mass...Ch. 14.3 - Gravitational potential The gravitational force...Ch. 14.3 - Radial Fields in 3 are conservative Prove that the...Ch. 14.3 - 55.Rotation fields are usually not conservative...Ch. 14.3 - Linear and quadratic vector fields a.For what...Ch. 14.3 - Prob. 57ECh. 14.3 - Prob. 58ECh. 14.3 - Prob. 59ECh. 14.3 - Alternative construction of potential functions...Ch. 14.3 - Prob. 61ECh. 14.4 - Explain why the two forms of Greens Theorem are...Ch. 14.4 - Referring to both forms of Greens Theorem, match...Ch. 14.4 - Prob. 3ECh. 14.4 - Prob. 4ECh. 14.4 - Prob. 5ECh. 14.4 - Why does a two-dimensional vector field with zero...Ch. 14.4 - Why does a two-dimensional vector field with zero...Ch. 14.4 - Sketch a two-dimensional vector field that has...Ch. 14.4 - Sketch a two-dimensional vector field that has...Ch. 14.4 - Discuss one of the parallels between a...Ch. 14.4 - Greens Theorem, circulation form Consider the...Ch. 14.4 - Prob. 12ECh. 14.4 - Greens Theorem, circulation form Consider the...Ch. 14.4 - Greens Theorem, circulation form Consider the...Ch. 14.4 - Greens Theorem, circulation form Consider the...Ch. 14.4 - Prob. 16ECh. 14.4 - Area of regions Use a line integral on the...Ch. 14.4 - Area of regions Use a line integral on the...Ch. 14.4 - Area of regions Use a line integral on the...Ch. 14.4 - Area of regions Use a line integral on the...Ch. 14.4 - Area of regions Use a line integral on the...Ch. 14.4 - Area of regions Use a line integral on the...Ch. 14.4 - Greens Theorem, flux form Consider the following...Ch. 14.4 - Prob. 24ECh. 14.4 - Greens Theorem, flux form Consider the following...Ch. 14.4 - Greens Theorem, flux form Consider the following...Ch. 14.4 - Greens Theorem, flux form Consider the following...Ch. 14.4 - Greens Theorem, flux form Consider the following...Ch. 14.4 - Line integrals Use Greens Theorem to evaluate the...Ch. 14.4 - Line integrals Use Greens Theorem to evaluate the...Ch. 14.4 - Prob. 31ECh. 14.4 - Line integrals Use Greens Theorem to evaluate the...Ch. 14.4 - Prob. 33ECh. 14.4 - Line integrals Use Greens Theorem to evaluate the...Ch. 14.4 - General regions For the following vector fields,...Ch. 14.4 - General regions For the following vector fields,...Ch. 14.4 - General regions For the following vector fields,...Ch. 14.4 - General regions For the following vector fields,...Ch. 14.4 - Explain why or why not Determine whether the...Ch. 14.4 - Circulation and flux For the following vector...Ch. 14.4 - Circulation and flux For the following vector...Ch. 14.4 - Circulation and flux For the following vector...Ch. 14.4 - Prob. 43ECh. 14.4 - Special line integrals Prove the following...Ch. 14.4 - Special line integrals Prove the following...Ch. 14.4 - Prob. 46ECh. 14.4 - Area line integral Show that the value of...Ch. 14.4 - Area line integral In terms of the parameters a...Ch. 14.4 - Stream function Recall that if the vector field F...Ch. 14.4 - Stream function Recall that if the vector field F...Ch. 14.4 - Stream function Recall that if the vector field F...Ch. 14.4 - Stream function Recall that if the vector field F...Ch. 14.4 - Applications 5356. Ideal flow A two-dimensional...Ch. 14.4 - Applications 5356. Ideal flow A two-dimensional...Ch. 14.4 - Applications 5356. Ideal flow A two-dimensional...Ch. 14.4 - Applications 5356. Ideal flow A two-dimensional...Ch. 14.4 - Prob. 57ECh. 14.4 - Greens Theorem as a Fundamental Theorem of...Ch. 14.4 - Greens Theorem as a Fundamental Theorem of...Ch. 14.4 - Whats wrong? Consider the rotation field...Ch. 14.4 - Whats wrong? Consider the radial field...Ch. 14.4 - Prob. 62ECh. 14.4 - Flux integrals Assume the vector field F = (f, g)...Ch. 14.4 - Streamlines are tangent to the vector field Assume...Ch. 14.4 - Streamlines and equipotential lines Assume that on...Ch. 14.4 - Channel flow The flow in a long shallow channel is...Ch. 14.5 - Explain how to compute the divergence of the...Ch. 14.5 - Interpret the divergence of a vector field.Ch. 14.5 - What does it mean if the divergence of a vector...Ch. 14.5 - Explain how to compute the curl of the vector...Ch. 14.5 - Interpret the curl of a general rotation vector...Ch. 14.5 - What does it mean if the curl of a vector field is...Ch. 14.5 - What is the value of ( F)?Ch. 14.5 - What is the value of u?Ch. 14.5 - Divergence of vector fields Find the divergence of...Ch. 14.5 - Divergence of vector fields Find the divergence of...Ch. 14.5 - Divergence of vector fields Find the divergence of...Ch. 14.5 - Divergence of vector fields Find the divergence of...Ch. 14.5 - Divergence of vector fields Find the divergence of...Ch. 14.5 - Divergence of vector fields Find the divergence of...Ch. 14.5 - Divergence of vector fields Find the divergence of...Ch. 14.5 - Divergence of vector fields Find the divergence of...Ch. 14.5 - Divergence of radial fields Calculate the...Ch. 14.5 - Prob. 18ECh. 14.5 - Prob. 19ECh. 14.5 - Prob. 20ECh. 14.5 - Divergence and flux from graphs Consider the...Ch. 14.5 - Divergence and flux from graphs Consider the...Ch. 14.5 - Curl of a rotational field Consider the following...Ch. 14.5 - Curl of a rotational field Consider the following...Ch. 14.5 - Curl of a rotational field Consider the following...Ch. 14.5 - Curl of a rotational field Consider the following...Ch. 14.5 - Curl of a vector field Compute the curl of the...Ch. 14.5 - Curl of a vector field Compute the curl of the...Ch. 14.5 - Curl of a vector field Compute the curl of the...Ch. 14.5 - Curl of a vector field Compute the curl of the...Ch. 14.5 - Curl of a vector field Compute the curl of the...Ch. 14.5 - Curl of a vector field Compute the curl of the...Ch. 14.5 - Curl of a vector field Compute the curl of the...Ch. 14.5 - Curl of a vector field Compute the curl of the...Ch. 14.5 - Prob. 35ECh. 14.5 - Prob. 36ECh. 14.5 - Prob. 37ECh. 14.5 - Prob. 38ECh. 14.5 - Explain why or why not Determine whether the...Ch. 14.5 - Another derivative combination Let F = (f, g, h)...Ch. 14.5 - Does it make sense? Are the following expressions...Ch. 14.5 - Zero divergence of the rotation field Show that...Ch. 14.5 - General rotation fields a.Let a = (0, 1, 0), r =...Ch. 14.5 - Prob. 44ECh. 14.5 - Curl of the rotation field For the general...Ch. 14.5 - Inward to outward Find the exact points on the...Ch. 14.5 - Maximum divergence Within the cube {(x, y, z): |x|...Ch. 14.5 - Prob. 48ECh. 14.5 - Zero component of the curl For what vectors n is...Ch. 14.5 - Prob. 50ECh. 14.5 - Find a vector Field Find a vector field F with the...Ch. 14.5 - Prob. 52ECh. 14.5 - Paddle wheel in a vector field Let F = z, 0, 0 and...Ch. 14.5 - Angular speed Consider the rotational velocity...Ch. 14.5 - Angular speed Consider the rotational velocity...Ch. 14.5 - Heat flux Suppose a solid object in 3 has a...Ch. 14.5 - Heat flux Suppose a solid object in 3 has a...Ch. 14.5 - Prob. 58ECh. 14.5 - Gravitational potential The potential function for...Ch. 14.5 - Electric potential The potential function for the...Ch. 14.5 - Navier-Stokes equation The Navier-Stokes equation...Ch. 14.5 - Stream function and vorticity The rotation of a...Ch. 14.5 - Amperes Law One of Maxwells equations for...Ch. 14.5 - Prob. 64ECh. 14.5 - Properties of div and curl Prove the following...Ch. 14.5 - Prob. 66ECh. 14.5 - Identities Prove the following identities. Assume...Ch. 14.5 - Identities Prove the following identities. Assume...Ch. 14.5 - Prob. 69ECh. 14.5 - Prob. 70ECh. 14.5 - Prob. 71ECh. 14.5 - Prob. 72ECh. 14.5 - Prob. 73ECh. 14.5 - Gradients and radial fields Prove that for a real...Ch. 14.5 - Prob. 75ECh. 14.6 - Give a parametric description for a cylinder with...Ch. 14.6 - Prob. 2ECh. 14.6 - Give a parametric description for a sphere with...Ch. 14.6 - Prob. 4ECh. 14.6 - Explain how to compute the surface integral of a...Ch. 14.6 - Prob. 6ECh. 14.6 - Prob. 7ECh. 14.6 - Explain what it means for a surface to be...Ch. 14.6 - Describe the usual orientation of a closed surface...Ch. 14.6 - Why is the upward flux of a vertical vector field...Ch. 14.6 - Parametric descriptions Give a parametric...Ch. 14.6 - Parametric descriptions Give a parametric...Ch. 14.6 - Parametric descriptions Give a parametric...Ch. 14.6 - Parametric descriptions Give a parametric...Ch. 14.6 - Parametric descriptions Give a parametric...Ch. 14.6 - Parametric descriptions Give a parametric...Ch. 14.6 - Identify the surface Describe the surface with the...Ch. 14.6 - Identify the surface Describe the surface with the...Ch. 14.6 - Identify the surface Describe the surface with the...Ch. 14.6 - Identify the surface Describe the surface with the...Ch. 14.6 - Surface area using a parametric description Find...Ch. 14.6 - Surface area using a parametric description Find...Ch. 14.6 - Surface area using a parametric description Find...Ch. 14.6 - Surface area using a parametric description Find...Ch. 14.6 - Surface area using a parametric description Find...Ch. 14.6 - Surface area using a parametric description Find...Ch. 14.6 - Surface integrals using a parametric description...Ch. 14.6 - Surface integrals using a parametric description...Ch. 14.6 - Surface integrals using a parametric description...Ch. 14.6 - Surface integrals using a parametric description...Ch. 14.6 - Surface area using an explicit description Find...Ch. 14.6 - Surface area using an explicit description Find...Ch. 14.6 - Prob. 33ECh. 14.6 - Prob. 34ECh. 14.6 - Surface integrals using an explicit description...Ch. 14.6 - Prob. 36ECh. 14.6 - Surface integrals using an explicit description...Ch. 14.6 - Surface integrals using an explicit description...Ch. 14.6 - Prob. 39ECh. 14.6 - Average values 40.Find the average squared...Ch. 14.6 - Average values 41.Find the average value of the...Ch. 14.6 - Average values 42.Find the average value of the...Ch. 14.6 - Surface integrals of vector fields Find the flux...Ch. 14.6 - Surface integrals of vector fields Find the flux...Ch. 14.6 - Surface integrals of vector fields Find the flux...Ch. 14.6 - Surface integrals of vector fields Find the flux...Ch. 14.6 - Surface integrals of vector fields Find the flux...Ch. 14.6 - Surface integrals of vector fields Find the flux...Ch. 14.6 - Explain why or why not Determine whether the...Ch. 14.6 - Miscellaneous surface integrals Evaluate the...Ch. 14.6 - Miscellaneous surface integrals Evaluate the...Ch. 14.6 - Miscellaneous surface integrals Evaluate the...Ch. 14.6 - Miscellaneous surface integrals Evaluate the...Ch. 14.6 - Cone and sphere The cone z2 = x2 + y2 for z 0,...Ch. 14.6 - Cylinder and sphere Consider the sphere x2 + y2 +...Ch. 14.6 - Flux on a tetrahedron Find the upward flux of the...Ch. 14.6 - Flux across a cone Consider the field F = x, y, z...Ch. 14.6 - Surface area formula for cones Find the general...Ch. 14.6 - Surface area formula for spherical cap A sphere of...Ch. 14.6 - Radial fields and spheres Consider the radial...Ch. 14.6 - Heat flux The heat flow vector field for...Ch. 14.6 - Heat flux The heat flow vector field for...Ch. 14.6 - Prob. 63ECh. 14.6 - Flux across a cylinder Let S be the cylinder x2 +...Ch. 14.6 - Flux across concentric spheres Consider the radial...Ch. 14.6 - Mass and center of mass Let S be a surface that...Ch. 14.6 - Mass and center of mass Let S be a surface that...Ch. 14.6 - Mass and center of mass Let S be a surface that...Ch. 14.6 - Mass and center of mass Let S be a surface that...Ch. 14.6 - Outward normal to a sphere Show that...Ch. 14.6 - Special case of surface integrals of scalar-valued...Ch. 14.6 - Surfaces of revolution Suppose y = f(x) is a...Ch. 14.6 - Rain on roofs Let z = s(x, y) define a surface...Ch. 14.6 - Surface area of a torus a.Show that a torus with...Ch. 14.6 - Prob. 75ECh. 14.7 - Explain the meaning of the integral S(F)ndS in...Ch. 14.7 - Explain the meaning of the integral S(F)ndS in...Ch. 14.7 - Explain the meaning of Stokes Theorem.Ch. 14.7 - Why does a conservative vector field produce zero...Ch. 14.7 - Verifying Stokes Theorem Verify that the line...Ch. 14.7 - Verifying Stokes Theorem Verify that the line...Ch. 14.7 - Verifying Stokes Theorem Verify that the line...Ch. 14.7 - Verifying Stokes Theorem Verify that the line...Ch. 14.7 - Verifying Stokes Theorem Verify that the line...Ch. 14.7 - Verifying Stokes Theorem Verify that the line...Ch. 14.7 - Stokes Theorem for evaluating line integrals...Ch. 14.7 - Stokes Theorem for evaluating line integrals...Ch. 14.7 - Stokes Theorem for evaluating line integrals...Ch. 14.7 - Stokes Theorem for evaluating line integrals...Ch. 14.7 - Stokes Theorem for evaluating line integrals...Ch. 14.7 - Stokes Theorem for evaluating line integrals...Ch. 14.7 - Stokes Theorem for evaluating surface integrals...Ch. 14.7 - Stokes Theorem for evaluating surface integrals...Ch. 14.7 - Stokes Theorem for evaluating surface integrals...Ch. 14.7 - Stokes Theorem for evaluating surface integrals...Ch. 14.7 - Interpreting and graphing the curl For the...Ch. 14.7 - Interpreting and graphing the curl For the...Ch. 14.7 - Interpreting and graphing the curl For the...Ch. 14.7 - Interpreting and graphing the curl For the...Ch. 14.7 - Explain why or why not Determine whether the...Ch. 14.7 - Conservative fields Use Stokes Theorem to find the...Ch. 14.7 - Conservative fields Use Stokes Theorem to find the...Ch. 14.7 - Conservative fields Use Stokes Theorem to find the...Ch. 14.7 - Conservative fields Use Stokes Theorem to find the...Ch. 14.7 - Tilted disks Let S be the disk enclosed by the...Ch. 14.7 - Tilted disks Let S be the disk enclosed by the...Ch. 14.7 - Tilted disks Let S be the disk enclosed by the...Ch. 14.7 - Tilted disks Let S be the disk enclosed by the...Ch. 14.7 - Prob. 34ECh. 14.7 - Circulation in a plane A circle C in the plane x +...Ch. 14.7 - No integrals Let F = (2z, z, 2y + x) and let S be...Ch. 14.7 - Compound surface and boundary Begin with the...Ch. 14.7 - Ampres Law The French physicist AndrMarie Ampre...Ch. 14.7 - Maximum surface integral Let S be the paraboloid z...Ch. 14.7 - Area of a region in a plane Let R be a region in a...Ch. 14.7 - Choosing a more convenient surface The goal is to...Ch. 14.7 - Radial fields and zero circulation Consider the...Ch. 14.7 - Zero curl Consider the vector field...Ch. 14.7 - Average circulation Let S be a small circular disk...Ch. 14.7 - Proof of Stokes Theorem Confirm the following step...Ch. 14.7 - Stokes Theorem on closed surfaces Prove that if F...Ch. 14.7 - Rotated Greens Theorem Use Stokes Theorem to write...Ch. 14.8 - Review Questions 1.Explain the meaning of the...Ch. 14.8 - Interpret the volume integral in the Divergence...Ch. 14.8 - Explain the meaning of the Divergence Theorem.Ch. 14.8 - What is the net outward flux of the rotation field...Ch. 14.8 - What is the net outward flux of the radial field F...Ch. 14.8 - What is the divergence of an inverse square vector...Ch. 14.8 - Suppose div F = 0 in a region enclosed by two...Ch. 14.8 - If div F 0 in a region enclosed by a small cube,...Ch. 14.8 - Verifying the Divergence Theorem Evaluate both...Ch. 14.8 - F = x, y, z; D = {(x, y, z): |x| 1, |y| 1, |z| ...Ch. 14.8 - Basic Skills 912.Verifying the Divergence Theorem...Ch. 14.8 - F = x2, y2, z2; D = {(x, y, z): |x| 1, |y| 2,...Ch. 14.8 - Rotation fields 13.Find the net outward flux of...Ch. 14.8 - Rotation fields 14.Find the net outward flux of...Ch. 14.8 - Find the net outward flux of the field F = bz cy,...Ch. 14.8 - Rotation fields 16.Find the net outward flux of F...Ch. 14.8 - Computing flux Use the Divergence Theorem to...Ch. 14.8 - Computing flux Use the Divergence Theorem to...Ch. 14.8 - F = x, 2y, z; S is the boundary of the tetrahedron...Ch. 14.8 - Computing flux Use the Divergence Theorem to...Ch. 14.8 - F = y 2x, x3 y, y2 z; S is the sphere {(x, y,...Ch. 14.8 - Computing flux Use the Divergence Theorem to...Ch. 14.8 - Computing flux Use the Divergence Theorem to...Ch. 14.8 - Computing flux Use the Divergence Theorem to...Ch. 14.8 - Divergence Theorem for more general regions Use...Ch. 14.8 - Divergence Theorem for more general regions Use...Ch. 14.8 - Divergence Theorem for more general regions Use...Ch. 14.8 - Divergence Theorem for more general regions Use...Ch. 14.8 - F = x2, y2, z2); D is the region in the first...Ch. 14.8 - Divergence Theorem for more general regions Use...Ch. 14.8 - Explain why or why not Determine whether the...Ch. 14.8 - Flux across a sphere Consider the radial field F =...Ch. 14.8 - Flux integrals Compute the outward flux of the...Ch. 14.8 - Flux integrals Compute the outward flux of the...Ch. 14.8 - Flux integrals Compute the outward flux of the...Ch. 14.8 - Prob. 36ECh. 14.8 - Singular radial field Consider the radial field...Ch. 14.8 - Logarithmic potential Consider the potential...Ch. 14.8 - Gauss Law for electric fields The electric field...Ch. 14.8 - Gauss Law for gravitation The gravitational force...Ch. 14.8 - Heat transfer Fouriers Law of heat transfer (or...Ch. 14.8 - Heat transfer Fouriers Law of heat transfer (or...Ch. 14.8 - Heat transfer Fouriers Law of heat transfer (or...Ch. 14.8 - Heat transfer Fouriers Law of heat transfer (or...Ch. 14.8 - Heat transfer Fouriers Law of heat transfer (or...Ch. 14.8 - Inverse square fields are special Let F be a...Ch. 14.8 - A beautiful flux integral Consider the potential...Ch. 14.8 - Integration by parts (Gauss' Formula) Recall the...Ch. 14.8 - Prob. 49ECh. 14.8 - Prob. 50ECh. 14.8 - Greens Second Identity Prose Greens Second...Ch. 14.8 - Prob. 52ECh. 14.8 - Prob. 53ECh. 14.8 - Prob. 54ECh. 14 - Explain why or why not Determine whether the...Ch. 14 - Matching vector fields Match vector fields a-f...Ch. 14 - Gradient fields in 2 Find the vector field F = ...Ch. 14 - Gradient fields in 2 Find the vector field F = ...Ch. 14 - Gradient fields in 3 Find the vector field F = ...Ch. 14 - Gradient fields in 3 Find the vector field F = ...Ch. 14 - Normal component Let C be the circle of radius 2...Ch. 14 - Line integrals Evaluate the following line...Ch. 14 - Prob. 9RECh. 14 - Line integrals Evaluate the following line...Ch. 14 - Two parameterizations Verify that C(x2y+3z)ds has...Ch. 14 - Work integral Find the work done in moving an...Ch. 14 - Work integrals in R3 Given the following force...Ch. 14 - Work integrals in 3 Given the following force...Ch. 14 - Circulation and flux Find the circulation and the...Ch. 14 - Circulation and flux Find the circulation and the...Ch. 14 - Circulation and flux Find the circulation and the...Ch. 14 - Circulation and flux Find the circulation and the...Ch. 14 - Flux in channel flow Consider the flow of water in...Ch. 14 - Conservative vector fields and potentials...Ch. 14 - Conservative vector fields and potentials...Ch. 14 - Conservative vector fields and potentials...Ch. 14 - Conservative vector fields and potentials...Ch. 14 - Evaluating line integrals Evaluate the line...Ch. 14 - Evaluating line integrals Evaluate the line...Ch. 14 - Evaluating line integrals Evaluate the line...Ch. 14 - Evaluating line integrals Evaluate the line...Ch. 14 - Radial fields in R2 are conservative Prove that...Ch. 14 - Greens Theorem for line integrals Use either form...Ch. 14 - Greens Theorem for line integrals Use either form...Ch. 14 - Greens Theorem for line integrals Use either form...Ch. 14 - Greens Theorem for line integrals Use either form...Ch. 14 - Areas of plane regions Find the area of the...Ch. 14 - Areas of plane regions Find the area of the...Ch. 14 - Circulation and flux Consider the following vector...Ch. 14 - Circulation and flux Consider the following vector...Ch. 14 - Parameters Let F = ax + by, cx + dy, where a, b,...Ch. 14 - Divergence and curl Compute the divergence and...Ch. 14 - Divergence and curl Compute the divergence and...Ch. 14 - Divergence and curl Compute the divergence and...Ch. 14 - Divergence and curl Compute the divergence and...Ch. 14 - Identities Prove that (1|r|4)=4r|r|6 and use the...Ch. 14 - Prob. 43RECh. 14 - Paddle wheel in a vector field Let F = 0, 2x, 0...Ch. 14 - Surface areas Use a surface integral to find the...Ch. 14 - Surface areas Use a surface integral to find the...Ch. 14 - Surface areas Use a surface integral to find the...Ch. 14 - Surface areas Use a surface integral to find the...Ch. 14 - Surface integrals Evaluate the following surface...Ch. 14 - Surface integrals Evaluate the following surface...Ch. 14 - Surface integrals Evaluate the following surface...Ch. 14 - Flux integrals Find the flux of the following...Ch. 14 - Flux integrals Find the flux of the following...Ch. 14 - Three methods Find the surface area of the...Ch. 14 - Flux across hemispheres and paraboloids Let S be...Ch. 14 - Surface area of an ellipsoid Consider the...Ch. 14 - Stokes Theorem for line integrals Evaluate the...Ch. 14 - Stokes Theorem for line integrals Evaluate the...Ch. 14 - Stokes Theorem for surface integrals Use Stokes...Ch. 14 - Stokes Theorem for surface integrals Use Stokes...Ch. 14 - Conservative fields Use Stokes Theorem to find the...Ch. 14 - Computing fluxes Use the Divergence Theorem to...Ch. 14 - Computing fluxes Use the Divergence Theorem to...Ch. 14 - Computing fluxes Use the Divergence Theorem to...Ch. 14 - General regions Use the Divergence Theorem to...Ch. 14 - General regions Use the Divergence Theorem to...Ch. 14 - Flux integrals Compute the outward flux of the...Ch. 14 - Stokes Theorem on a compound surface Consider the...
Additional Math Textbook Solutions
Find more solutions based on key concepts
In Exercises 13–16, find the margin of error for the values of c, ?, and n.
16. e = 0.975, ? = 4.6, n = 100
Elementary Statistics: Picturing the World (7th Edition)
For years, telephone area codes in the United States and Canada consisted of a sequence of three digits. The fi...
A First Course in Probability (10th Edition)
Snow Depth (Example 3) Eric wants to go skiing tomorrow, but only if there are 3 inches or more of new snow. Ac...
Introductory Statistics
Emptying a conical tank A water tank is shaped like an inverted cone with height 6 m and base radius 1.5 m (see...
Calculus: Early Transcendentals (2nd Edition)
Assessment 71A Write each of the following as a sum in expanded place value form. a. 0.023 b. 206.06 c. 312.010...
A Problem Solving Approach To Mathematics For Elementary School Teachers (13th Edition)
In Exercises 11-20, express each decimal as a percent.
11. 0.59
Thinking Mathematically (6th Edition)
Knowledge Booster
Learn more about
Need a deep-dive on the concept behind this application? Look no further. Learn more about this topic, calculus and related others by exploring similar questions and additional content below.Similar questions
- The electric flux density D at the point M (0,4,0) in the region about a uniform line charge of 1 nC/m lying along the z axis in free space is: Select one: a. None of the above b. 0.6366 nC/m c. 0.2387 nC/m d. 0.039 nC/m e. 0.1 nC/marrow_forward5. The derivative is the gradient of the tangent to the function. In the case of a semi-circle, this means that the gradient vector (1, dy/d.r) should be orthogonal to the vector(arn, Y0). Verify this using the dot product and also by plotting both vectors (normalise the gradient vector).arrow_forwardThis is a Computer Graphics Question on Phong's Lighting Model. Question: A light source with intensity 50 and radius of influence 100 is located at (4,2,93) from which you are called to calculate the illumination of a point on the yz plane. For no shiny surface and negligible ambient light, find the point on the surface with the highest illumination and light intensity at that point. Given the diffuse coefficient is 0.7.arrow_forward
- Let v be a vector whose coordinates are given as v = [vx, Vy, Vz. If the quaternion Q represents a rotation, show that the new, rotated coordinates of v are given by Q(0, Vx, Vy, Vz)Q*, where (0, vx, Vy, Vz) is a quaternion with zero as its real component.arrow_forwardFind the curvature of r(t)=(3t,t^2,t^3) and the point (3,1,1).arrow_forwardGiven two squares on a two-dimensional plane, find a line that would cut these twosquares in half. Assume that the top and the bottom sides of the square run parallel to the x-axisarrow_forward
- Q1: Consider a surface of revolution generated by a Bezier curve defined by the four control points P(0,0,0), (2,1,2), P₂ (3,3,0) P, (2,2,3) respectively, rotating about the X-axis. Calculate the point on the surface at u = 0.25, 0= π/2.arrow_forwardWhat is the length of the polar curve below? 3π r = 6 cos (0) for 00< 4arrow_forwardBu = ƒ and Cu = f might be solvable even though B and C are singular. Show that every vector f = Bu has ƒ1 + ƒ2+ ……. +fn = 0. Physical meaning: the external forces balance. Linear algebra meaning: Bu = ƒ is solvable when ƒ is perpendicular to the all – ones column vector e = (1, 1, 1, 1…) = ones (n, 1).arrow_forward
- 4. Represent the given Boolean function geometrically, using Carnaugh map and Unit cube, and minimize it. f = y² + (x → ÿ).arrow_forwardThe two blocks of Figure 6.17 are attached to each other by a massless string that is wrapped around a frictionless pulley. When the bottom 4.00-kg block is pulled to the left by the constant force P, the top 2.00-kg block slides across it to the right. Find the magnitude of the force necessary to move the blocks at constant speed. Assume that the coefficient of kinetic friction between all surfaces is 0.400.arrow_forwardGiven two particles with Q = 4.30-µC charges as shown in the figure below and a particle with charge q = 1.39 x 10-18 C at the origin. (Note: Assume a reference level of potential V = 0 at r = co.) x = -0.800 m x = 0.800 m (a) What is the net force (in N) exerted by the two 4.30-µC charges on the charge q? (Enter the magnitude.) N (b) What is the electric field (in N/C) at the origin due to the two 4.30-pC particles? (Enter the magnitude.) V N/C (c) What is the electrical potential (in kV) at the origin due to the two 4.30-uC particles? 96.75 V kV (d) What If? What would be the change in electric potential energy (in J) of the system if the charge g were moved a distance d = 0.400 m closer to either of the 4.30-µC particles?arrow_forward
arrow_back_ios
SEE MORE QUESTIONS
arrow_forward_ios
Recommended textbooks for you
- C++ for Engineers and ScientistsComputer ScienceISBN:9781133187844Author:Bronson, Gary J.Publisher:Course Technology PtrOperations Research : Applications and AlgorithmsComputer ScienceISBN:9780534380588Author:Wayne L. WinstonPublisher:Brooks Cole
C++ for Engineers and Scientists
Computer Science
ISBN:9781133187844
Author:Bronson, Gary J.
Publisher:Course Technology Ptr
Operations Research : Applications and Algorithms
Computer Science
ISBN:9780534380588
Author:Wayne L. Winston
Publisher:Brooks Cole
Basic Differentiation Rules For Derivatives; Author: The Organic Chemistry Tutor;https://www.youtube.com/watch?v=IvLpN1G1Ncg;License: Standard YouTube License, CC-BY