1
answer
0
watching
78
views
13 Nov 2019
Please show all work towards final answer. Thanks.
11. Evaluate the line integral where C is the boundary of the triangle whose vertices are (0,0), (3,0), (3,3) with counterclockwise orientation. (a) o (b) -81/4 (c) 9/2 (d) 1 (e) none of the above 12. Set h(z,v)=z2,2 i+zë´j, tet C be the unit curve which is traversed in a h(z,y)=-2 counter-clockwise manner and centered at the origin. Evaluate yeitz2 2,2 J. Let C be the unit curve which is traversed in a 12. Set h (r) dr = (a) 0 (b)-2Ï (c) 2Ï (d) 1 (e) none of the above
Please show all work towards final answer. Thanks.
11. Evaluate the line integral where C is the boundary of the triangle whose vertices are (0,0), (3,0), (3,3) with counterclockwise orientation. (a) o (b) -81/4 (c) 9/2 (d) 1 (e) none of the above 12. Set h(z,v)=z2,2 i+zë´j, tet C be the unit curve which is traversed in a h(z,y)=-2 counter-clockwise manner and centered at the origin. Evaluate yeitz2 2,2 J. Let C be the unit curve which is traversed in a 12. Set h (r) dr = (a) 0 (b)-2Ï (c) 2Ï (d) 1 (e) none of the above
Bunny GreenfelderLv2
22 Jul 2019