4. Consider now the vector field G(r, y, z) = (r – 4ry? – 1, 2y – 4r²y, z).(i) Is the vector field G conservative? If yes, compute the associated scalar potential.(ii) Compute the line integral of G along the boundary of the region D, assuming Ď iscontained in the plane z = 1 and that it is positively oriented.(iii) Compute the surface area of the surface parameterized by R(u, v) = G(2u +1,0, 2v)over the region D = {{u, v) € R° | u² < v < v2 – ²} (Hint: Ď= D).

Hello. Since your question has multiple parts, we will solve first question for you. If you want…

4. Consider now the vector field G(xr, y, 2) = (x – 4xy? – 1, 2y – 4x*y, z). (i) Is the vector field G conservative? If yes, compute the associated scalar potential. (ii) Compute the line integral of G along the boundary of the region Ď, assuming Ď is contained in the plane z = 1 and that it is positively oriented. (iii) Compute the surface area of the surface parameterized by R(u, v) = G(2u+1,0, 2v) over the region D = {(4, v) € R° | u² < v< v2 – u²} (Hint: Ď= D).

4. Consider now the vector field G(xr, y, 2) = (x – 4xy? – 1, 2y – 4x*y, z). (i) Is the vector field G conservative? If yes, compute the associated scalar potential. (ii) Compute the line integral of G along the boundary of the region Ď, assuming Ď is contained in the plane z = 1 and that it is positively oriented. (iii) Compute the surface area of the surface parameterized by R(u, v) = G(2u+1,0, 2v) over the region D = {(4, v) € R° | u² < v< v2 – u²} (Hint: Ď= D).

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Concept explainers

Arc Length

Arc length can be thought of as the distance you would travel if you walked along the path of a curve. Arc length is used in a wide range of real applications. We might be interested in knowing how far a rocket travels if it is launched along a parabolic path. Alternatively, if a curve on a map represents a road, we might want to know how far we need to drive to get to our destination. The distance between two points along a curve is known as arc length.

Line Integral

A line integral is one of the important topics that are discussed in the calculus syllabus. When we have a function that we want to integrate, and we evaluate the function alongside a curve, we define it as a line integral. Evaluation of a function along a curve is very important in mathematics. Usually, by a line integral, we compute the area of the function along the curve. This integral is also known as curvilinear, curve, or path integral in short. If line integrals are to be calculated in the complex plane, then the term contour integral can be used as well.

Triple Integral

Examples:

Question

4. Consider now the vector field G(r, y, z) = (r – 4ry? – 1, 2y – 4r²y, z).
(i) Is the vector field G conservative? If yes, compute the associated scalar potential.
(ii) Compute the line integral of G along the boundary of the region D, assuming Ď is
contained in the plane z = 1 and that it is positively oriented.
(iii) Compute the surface area of the surface parameterized by R(u, v) = G(2u +1,0, 2v)
over the region D = {{u, v) € R° | u² < v < v2 – ²} (Hint: Ď= D).

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ISBN:

9780470458365

Author:

Erwin Kreyszig

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