Show that the circulation of the field F = 2 x i + 2 y j + 2 z k around the boundary of any smooth orientable surface is zero by using ∇ × ∇ f = 0 and Stoke’s theorem.

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Answer 1

Question

Chapter 15.7, Problem 21E

(a)

To determine

Show that the circulation of the field F=2xi+2yj+2zk around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

(b)

To determine

Show that the circulation of the field F=∇(xy2z3) around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

(c)

To determine

Show that the circulation of the field F=∇×(xi+yj+zk) around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

(d)

To determine

Show that the circulation of the field F=∇f around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

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Answer 2

Question

Chapter 15.7, Problem 21E

(a)

To determine

Show that the circulation of the field F=2xi+2yj+2zk around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

(b)

To determine

Show that the circulation of the field F=∇(xy2z3) around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

(c)

To determine

Show that the circulation of the field F=∇×(xi+yj+zk) around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

(d)

To determine

Show that the circulation of the field F=∇f around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

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See solution

Answer 3

Question

Chapter 15.7, Problem 21E

(a)

To determine

Show that the circulation of the field F=2xi+2yj+2zk around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

(b)

To determine

Show that the circulation of the field F=∇(xy2z3) around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

(c)

To determine

Show that the circulation of the field F=∇×(xi+yj+zk) around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

(d)

To determine

Show that the circulation of the field F=∇f around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

Expert Solution & Answer

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Check out a sample textbook solution

See solution

Answer 4

Question

Chapter 15.7, Problem 21E

(a)

To determine

Show that the circulation of the field F=2xi+2yj+2zk around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

(b)

To determine

Show that the circulation of the field F=∇(xy2z3) around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

(c)

To determine

Show that the circulation of the field F=∇×(xi+yj+zk) around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

(d)

To determine

Show that the circulation of the field F=∇f around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

Expert Solution & Answer

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Check out a sample textbook solution

See solution

Answer 5

Chapter 15.7, Problem 21E

(a)

To determine

Show that the circulation of the field F=2xi+2yj+2zk around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

(b)

To determine

Show that the circulation of the field F=∇(xy2z3) around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

(c)

To determine

Show that the circulation of the field F=∇×(xi+yj+zk) around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

(d)

To determine

Show that the circulation of the field F=∇f around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

Answer 6

Chapter 15.7, Problem 21E

(a)

To determine

Show that the circulation of the field F=2xi+2yj+2zk around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

Answer 7

Chapter 15.7, Problem 21E

(a)

To determine

Show that the circulation of the field F=2xi+2yj+2zk around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

Answer 8

(b)

To determine

Show that the circulation of the field F=∇(xy2z3) around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

Answer 9

(b)

To determine

Show that the circulation of the field F=∇(xy2z3) around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

Answer 10

(c)

To determine

Show that the circulation of the field F=∇×(xi+yj+zk) around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

Answer 11

(c)

To determine

Show that the circulation of the field F=∇×(xi+yj+zk) around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

Answer 12

(d)

To determine

Show that the circulation of the field F=∇f around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

Answer 13

(d)

To determine

Show that the circulation of the field F=∇f around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

Answer 14

Expert Solution & Answer

Answer 15

Expert Solution & Answer

Answer 16

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Answer 17

Ch. 15.1 - Match the vector equations in Exercises 1–8 with...Ch. 15.1 - Match the vector equations in Exercises 1–8 with...Ch. 15.1 - Match the vector equations in Exercises 1–8 with...Ch. 15.1 - Match the vector equations in Exercises 1–8 with...Ch. 15.1 - Match the vector equations in Exercises 1–8 with...Ch. 15.1 - Match the vector equations in Exercises 1–8 with...Ch. 15.1 - Match the vector equations in Exercises 1–8 with...Ch. 15.1 - Prob. 8E Ch. 15.1 - Evaluate ∫C (x + y) ds, where C is the...Ch. 15.1 - Evaluate ∫C (x − y + z − 2) ds, where C is the...

Show that the circulation of the field F = 2 x i + 2 y j + 2 z k around the boundary of any smooth orientable surface is zero by using ∇ × ∇ f = 0 and Stoke’s theorem.

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Show that the circulation of the field F=2xi+2yj+2zk around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

Show that the circulation of the field F=∇(xy2z3) around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

Show that the circulation of the field F=∇×(xi+yj+zk) around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

Show that the circulation of the field F=∇f around the boundary of any smooth orientable surface is zero by using ∇×∇f=0 and Stoke’s theorem.

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