3.52 Verify Stokes's theorem for the vector field = (fr cos p+ sin o) by evaluating the following: fB.d B dl over the semicircular contour shown in (a) √ B C Fig. P3.52(a). (b) f(V x S (V x B) ds over the surface of the semicircle. -2 B = y 2 0 (a) 2 y 2 1 1 (b) 2 X Figure P3.52 Contour paths for (a) Problem 3.52 and (b) Problem 3.53. 3.53 Repeat Problem 3.52 for the contour shown in Fig. P3.52(b).
3.52 Verify Stokes's theorem for the vector field = (fr cos p+ sin o) by evaluating the following: fB.d B dl over the semicircular contour shown in (a) √ B C Fig. P3.52(a). (b) f(V x S (V x B) ds over the surface of the semicircle. -2 B = y 2 0 (a) 2 y 2 1 1 (b) 2 X Figure P3.52 Contour paths for (a) Problem 3.52 and (b) Problem 3.53. 3.53 Repeat Problem 3.52 for the contour shown in Fig. P3.52(b).
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Question 3.53 please. Why does Bartleby keep saying my question does not align with the question submitted. This is literally and electrical engineering class.
Transcribed Image Text:3.52 Verify Stokes's theorem for the vector field
B = (fr cos + 4 sin o)
by evaluating the following:
(a) B.
B. dl over the semicircular contour shown in
C
Fig. P3.52(a).
(b) (V x B) - ds over the surface of the semicircle.
S
-2
y
2
0
(a)
2
X
y
2
12
(b)
X
Figure P3.52 Contour paths for (a) Problem 3.52 and (b)
Problem 3.53.
3.53 Repeat Problem 3.52 for the contour shown in
Fig. P3.52(b).
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