Question

Let F(x,y,z) = <7x, 5y, 2z > be a vector field. Find the flux of F through surface S. Surface S is that portion of 3x + 5y + 72 = 9 in the first octant. Answer: Finish attempt

Answer 1

Ans Here F(x, y, z) <72, 54, 2Z) is a rector dield. 7x i +54 û t2 ZR s is the surface of portion of 3x+54 +7Z=9 in the first octant. دد the unit normal The vector perpendicular to the geven surface s (3x+54 +7Z-9) 3 i +53 +7 R. Then to any point on this plane is 3î t5 û +7 3 + 5 +72 Hence ñR 7/783 V Ves (3î + 55+7R) .. ds = dady IñRI A 32 +50 F. 5h +7R √83 183 dxdy (7xî + 5 4 9 + 2 ZR) ( Ves (21X +254 +147) tes ( 21x + 254 + 2(9–3– 5) equation Vos (15 15% + 15y +18 from the of the plane from 0 and SS - F. hds = SS ₃ (15x+159 +18) dedy To integrate this, we find the limits of y and a on s' ie, the co-ordinate plane Z=o.

org From the geven equation of the plane, we have when Zoo 3x + 5y = g-32 5 Here to integrate with respect to y from y co to 9-32 and then to integrate with respect to rom x=0 to x = (which is the intersection of the plane with the x-asis) This required flux SSF ñ ds = ESS (15x+154 +18) dy dre - 9-32 s 9-32 9-3x 5 3 (9-3x du. § 1°(54 +54 +6) dy din = 2 8 [ sxy + 50 / + 6y] in (5x+* ***+5) An (3x + 2 (2+26) + 54 -31-20 ja pole * (*********** Joke tos (-212"+189) de 27% [ - 21 % 189x] to -7.3 + 18913 (367–189) (378) gox +81-278 + 108 - 30x²_27x + 9x - 364 10 תן 3 to +189 27 81 Ang