Question

Use Green's theorem to evaluate the line integral S. (sin(22) – 5y) dx + (72 – y cos y) dy, where C is the the counter clockwise oriented closed curve consisting of the upper half of the circle (x – 5)2 + (y – 4)2 = 9 and the line segment between (2, 4) and (8,4).

Answer 1

To Evaluate the line Integral Se (sin(e) by ) dx + (7x - y Cash) dy By Green's theorem So Man Aldy - Spl Jolt where R is the Region bounded the Region bounded by the closed M = Sin (12) – 54, No 76-Y Cos (y) an an an dy Curve G. there 다. 2M . - 5 ON - 7 Also - an ay the region B (1-57²+ (4-4)² = 9, 47,4 by using polar coordinates, put 4= 4+2 Sino then daardedo, osr23, os os T Se ( 3 ) do = S 122 de do - 5+2 Coso 2 T 3 O=0 do

=for (682) do Sot 54 do 54 So do cl 19 54 T So we have I (sin(x? - By John + (=x-Y Cosy) dy = 541