Question

Use the Divergence Theorem to compute the ux of the vector eld F(x, y, z) = .5x^2i-(1/3)y^3zj+1/2y^2z^2k through the boundary of the cylinder determined by x2 + y 2 ≤ 4, 0 ≤z ≤ 2.

Answer 1

Griven vector field F = 0.5x29 +4y3zġ+2422 À through the boundary of cylinder given by x+y?<4,0<252. According to Gauss-divergence theoremi any enclosing volume Z -2=3 closed For surface s en V. ZE SS F. À ds = 5 ssdivA) av Hence, Flux = ss Ends = SSS dv(f) av S لے رله divef) = dfi +df27df3 da dy dz div(F) dy divlf) = x + y2z+y2z = x+2y2 z In cylindrical co-ordinates a=r Coso y=rsino, z=2 and ososan osr<2 ,O< z <3 dva ror do dz and div' F) = r Cobo +244 Sin? O z

SS5 div(f) dr = J 3" }(676000 + 2272 Sindo) 7:00-070 CodrdOdz) 2 27 3 for? Cos@+ 27 3r? Sinza) dado dz 217 = } 3 reloso z tz²r3 sino lo drdo 27 s (3 r² caso + 9 43 sin²o) dr do 201 2TT dr 3r?cové + quod + gon(.com20)) de de 5 1 3+*sino +9x38 + Ford (-Sir20) 1.3 3 r(0-0) +9xp7 (27-6) +Fp? (0-0) des g greeder SH (16-0) = 19TT. IT r r12 - 136T Answer Flux = 55 F. hds=sSs div(f) dx = 367 o S v
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