Question

Suppose C is a curve parametrized by r(t)=<cost,sint,1> and S is the portion of z=x^2+y^2 enclosed by C, located in the vector field F=<z,-x,y>.

25. Suppose C is the curve parametrized by F(t) = (cost, sint, 1) and S is the portion of z = x2 + y2 enclosed by C, located in the vector field F = (2, -,y). Verify Stokes' theorem. That is, find show they are, in fact, the same. fe dr and SIC (curl ) ñds individually and

Answer 1

SF. de oferta de de frt = f ( wst, sint, 1) = (1, wst, sint). rt & -sint, wst, o) frtort= -sint-wit to ostsan I F. de 2 21 8-sinst - wit at an w St st]. 720 It wsat dt 2 0 - 2012 - 1 2 wst= It wszt) 2 vo... So normal to z=2274² 15 ( -2x, -2x, -24, 1)

K wrh F = So hormal to 2= 274² 13 ( -27, -24, 1) n ay s 2 wyf = (1 + i -k).(-zxî - 2} +4] -22-24-1 È il 1)-3 (0-1) tê (-1-0) <x< 1 Vers 4 < 1-22 +J So Norrisal ( of a surtau. 2=f66;y) Is. (.tx-ty, 1 by = 24 SS cur fonds -22-24-1 day da at fx = at an * x- zdy die ${-2x [41 -G) de -VI-R2 VI-X2 - 2x [4] Vigez zina

= {Faxrix -o-281x2) da 1.-4x V1 -2² dx = +2 (ax Vi ne da 3/2 3 rix dx = In ²+1 sinn So & 4-5 (1-1) – 4 (1-1) -2(4 sinto 12 sin (1) =-2 (r = 7 henu both the answer is -