Question

1. [-/10 Points] DETAILS LARCALC11 15.4.005. 0/6 Submissions Used Verify Green's Theorem by evaluating both integrals Ja yax+ y2 dx + x2 dy дм ду for the given path. C: boundary of the region lying between the graphs of y = x and y = x2 + x2 dy AS COMO an дх aM ду dA =

Answer 1

Verify Greeem's theorem by evaluating both integrals S Mant dA Nedy - Ilu IN ди -JM for the Criven path C: boundary of the region lying between the Graphs of y=n and y = n2 y² du tu?dy ,(1,1) y=h | Any: y=x is a straight line & Y = N² is a Parabola. G Ay=n² C1 x x We can divide path by CĄ and Co Sy²dx + rêdy - Sylantudy + Jyldnt rody C2 intersection Point of y=n and y = n2 n = n² n(n-1)=0 =) n=o, n=1 hence y =1

on : y = 42 - dy= anda 1 y?dn+x?dy = S (x2)?dx +n? (2nda) ci 1 1 (n + 2n3) da 15 tant 5 O +1 5 2 2 + 5 7 10 10 on Cai y=n = dy= du s y? du trady = x² dnt n² dn 1 O O 2 u²dn 3 2 3 Com hence 2 21-20 1 s y ant rady - 7 lo 3 30 30

Now We Calculate. ON JM — da ди д our М= *, N= x² JM IN dn ам, с 2-3 Я . R is the Region bounded by y = n² and y=n и < 3 м оки 1 1 ( ON IM Л dA= П" ди да и – 28) R он2 1 И 25 2У? du п о 12 1 ам” - и” - 2 и+ du о [11- 2x2+y'ja 1 21 1 и 5 З У 3 4

- + Nl- -بیا 5 2 6- 15 +10 30 3o hence Green's theorem is Verified.