Multivariable & Vectorhard
0:00.0

Let SS be the surface of an open box with five faces: the bottom at z=0z=0 and four sides, defined over the domain 0x10 \le x \le 1, 0y10 \le y \le 1, and 0z20 \le z \le 2 (excluding the top face z=2z=2). If SS is oriented outwards, evaluate the surface integral S(×F)dS\iint_S (\nabla \times \mathbf{F}) \cdot d\mathbf{S} for the vector field F=y2cosz,x+ez,x2y\mathbf{F} = \langle y^2 \cos z, x + e^z, x^2 y \rangle.