Question

3. Using Stokes theorem evaluate fa.dr. where A = (x² + y - 4)i + 3ryj + (2x2 + 2?)k and C is the curve bounding the surface S given by (a) the hemisphere IP + y2 + z2 = 16 above the ry plane (b) the paraboloid z = 4 - (z? + y²) above the ry plane.

Answer 1

에 using Stokes theorem evaluate A-dr nehere A= (4²7y-4) +3xy F +222 +2² and c is the curve bounding the surface s given by the hemisphere set ty? + z2 = 16 above the ny-plane. " the arabelold z=4-(*² tyny above the ny - plane. Z s 90 s is the surface of hemisphere rty? 72 = 16 above the ney-plane and bounded the cirete C nry 2 = 16. in by 2 xy-plane. on C . let x = 4lofo ,daa-4 sino do y = 4 sino dy= 4 caso do. zzo dz=0.

Adr = [(*++3.4) 1 say Î +(3x2+z32) ( dx it dy j + dz €) = (x²ty-4) dx + (3 xy) dy + (212 +2²) dz flc log tot 40168 -Y) [-4.6'no) de)+ p(4.6ot o) (.46MB)(4630) dB) to 4 ( -64 sino cagle - 16 hino +16 6ino +192605?timelde E-8 Jordi V I fin 20.00 +0. i-Cosco -16TT. 2 Z 12B sino Coslo - 16 sinho + 16 rino) do By stoke's theorem Txands=farar 28 Sino cos26-16 sine + losino l do 0-16 5-16 do an # o

ny plane bounded ("s is the surface of paraboloid above by Curve cinny phone circle n'y' = 4 and centore at origin. mtyy, on e IS of radius 2 2 19 ne=2coso dx = -2 sino do dy= a coso do - ๕ 6 7 8 Z=0 idzzo Adš= (x²+y-4) dat (327) dy +222 +2²d2 (4685 20 +2 51v0-y)((-251 940) + ( 26010) (2010) (26010 elo) to =(-18 18 f'no coglo - 4 sim 0 + 8 o'no +248'nolog20) do =/16 &no costo-usine + 8 sino) do 3

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