A parametrization of all the points on the sphere a + y² + z? = 1 that are such that y > 0 is given by r(u, v) = (cos u sin v, sin u sin v, cos v), 0

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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A parametrization of all the points on the sphere a² + y? + z² = 1
that are such that y > 0 is given by
r(u, v) = (cos u sin v, sin u sin v, cos v),
0 <u < a/2,0 < v a
r(u, v) = (cos u sin v, sin u sin v, cos v),
%3D
0 <u < a/2,0 < vS a/2
None of these answers
r(u, v) = (cos u sin v, sin u sin v, cos v),
0 <us1,0 < v < a/2
r(u, v) = (cos u sin v, sin u sin v, cos v),
%3D
0 <u<n,0 < v < a
r(u, v) = (cos u sin v, sin u sin v, cos v),
-a/2 < u < a/2,0 < v < a
Transcribed Image Text:A parametrization of all the points on the sphere a² + y? + z² = 1 that are such that y > 0 is given by r(u, v) = (cos u sin v, sin u sin v, cos v), 0 <u < a/2,0 < v a r(u, v) = (cos u sin v, sin u sin v, cos v), %3D 0 <u < a/2,0 < vS a/2 None of these answers r(u, v) = (cos u sin v, sin u sin v, cos v), 0 <us1,0 < v < a/2 r(u, v) = (cos u sin v, sin u sin v, cos v), %3D 0 <u<n,0 < v < a r(u, v) = (cos u sin v, sin u sin v, cos v), -a/2 < u < a/2,0 < v < a
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