Question

Problem #8: Use Stokes' Theorem to evaluate | F• dr where F = (x + 52)i + (6x + y)j + (7y - -)k and C is the curve of intersection of the plane x + 3y += = 12 with the coordinate planes. (Assume that C is oriented counterclockwise as viewed from above.) Problem #8: Just Save Submit Problem #8 for Grading Attempt #1 Attempt #2 Attempt #3 Attempt #4 Attempt #5 Problem #8 Your Answer: Your Mark: Problem #9: Use Stokes' Theorem (in reverse) to evaluate Side (curl F). n ds where F = 6yzi + 10x j +9yzet" k ,S is the portion of the paraboloid = = 3x2 + 1ő v2 for 0 < = 55, and the unit normal on Spoints away from the z-axis. Problem #9: Enter your answer symbolically, as in these examples Just Save Submit Problem #9 for Grading

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Answer 1

Problem #8 Answero - Coriven ( 15 ) + ( 44 ) È +(74-52) land C is the curve of intersection of the blane x + 3y +7 with the coordinate planes lie, k=0,9 = 0, 4220) -34+2 =12 Stokes theorem & Fody IS CurlFonds C S. where T is the bound oundry of the open surface s. To gr) So here we need ñ & Carl E. A S.40 gry, z) = x+3y +2 -12 (

then 12932929 स DM १) +1(3) 1 +3+ î+39 + %3D तेन पर काम 4 की +31+2 how > vi Curl=ji The colto प 4 f at IN where ² = <f, fity? 02-0452,6x+y 7y-st A Koy 01 Carl F = 3 x 2 = 12 x y 22 46rry

Canl î (7.0) -] (o-s) + pc (6.0) 7 i tsh to going to how we are Rull projection of surface on to xy plane as= 1 +228 + 8? ? Bir dedy Coo x 3y +7=12 - Z = 12-2-3 dx dy 427 - - 3 By Pds=1+1 toe diedy 12-- a) az= -1 - Vil an اليها ff. dr = {curls nas C S affaith+6€).Vingj tha dety R

- 11(7 +35+6) dxdy dady - 48 f dedy R Where Ris - R Argection of s onto plane how limits of x & 109) clearly 7 variles from 12-1 x + 3y = 2 x=0 to x=12 &y=0 to y = (making Strip i to y-axis) & lines x=0 xyzo (coordinates 60 "how from eg 12 012-4 48 dudy

12 =48 (५) 3 du 48 12-xdn .3 o (42-uldu d 2 S 12 -1 16 = [6] 6[(24 24-२)- (० Seart 5 -16X22 = न 35 352