Let F(x, y, z)=4z²zi+(³+tan(=))j + (42²2-4y")k. Use the Divergence Theorem to evaluate , P. ds where S is the top half of the sphere ² + y² +22=1 oriented upwards JS, F. ds = PART#B (1 point) Let M be the capped cylindrical surface which is the union of two surfaces, a cylinder given by z² + y²-64, 05:51, and a hemispherical cap defined by z² + y² +(2-1)2-64, > 1. For the vector field F compute dS in any way you like. (zz + ²y + 7y, syz + 7z, a'2³). (VxF) JM (V x F) ds = PART#C (1 point) Three small circles C₁, C₂, and C₂, each with radius 0.2 and centered at the origin are in the xy, yz, and xz-planes respectively. The circles are oriented counterclockwise when viewed from the positive z-, x, and y-axes, respectively. A vector field F has circulation around C₁ of 0.09, around C₂ of 0.1m, and around C₂ of 3m Estimate curl(F) at the origin curl(F(0,0,0)) COMMENTS: Please solve all parts this is my request because all part related to each of one it my humble request please solve all parts