1. Consider the ellipsoid a?a? + B*y? +v°z? = 7? (a) Parametrize the surface S = r(u, v) by x = and z = c cos(v) with appropriate values for a, b and c. b cos(u) sin(v), a sin(u) sin(v), y = (b) Determine the unit normal vector n for the point in (u, v) space. 4 4 (c) Evaluate directly /1 F. dS where F = ay’i – Bz²j+ k 1 (d) Repeat part (c) using the Divergence Theorem.

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
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please solve only C and D:

where,

alpha=1

beta=6

gamma=13

1. Consider the ellipsoid
a?a? + B*y? + y²z²? = y?
(a) Parametrize the surface S =
and z = c cos(v) with appropriate values for a, b and c.
a sin(u) sin(v), y =
b cos(u) sin(v),
r(u, v) by x =
(b) Determine the unit normal vector n for the point ( ) in (u, v) space.
(c) Evaluate directly ||
F. dS where F = ay²i – Bz²j+ yk
1
(d) Repeat part (c) using the Divergence Theorem.
Transcribed Image Text:1. Consider the ellipsoid a?a? + B*y? + y²z²? = y? (a) Parametrize the surface S = and z = c cos(v) with appropriate values for a, b and c. a sin(u) sin(v), y = b cos(u) sin(v), r(u, v) by x = (b) Determine the unit normal vector n for the point ( ) in (u, v) space. (c) Evaluate directly || F. dS where F = ay²i – Bz²j+ yk 1 (d) Repeat part (c) using the Divergence Theorem.
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