Answer
$div\left( {\bf{F}} \right) = y\cos xy - z\sin yz + x\cos xz$
$curl\left( {\bf{F}} \right) = \left( {y\sin yz} \right){\bf{i}} - \left( {z\cos xz} \right){\bf{j}} + \left( { - x\cos xy} \right){\bf{k}}$
Work Step by Step
We have ${\bf{F}} = \left( {{F_1},{F_2},{F_3}} \right) = \left( {\sin xy,\cos yz,\sin xz} \right)$.
1. $div\left( {\bf{F}} \right) = \frac{{\partial {F_1}}}{{\partial x}} + \frac{{\partial {F_2}}}{{\partial y}} + \frac{{\partial {F_3}}}{{\partial z}}$
$div\left( {\bf{F}} \right) = y\cos xy - z\sin yz + x\cos xz$
2. $curl\left( {\bf{F}} \right) = \left| {\begin{array}{*{20}{c}}
{\bf{i}}&{\bf{j}}&{\bf{k}}\\
{\frac{\partial }{{\partial x}}}&{\frac{\partial }{{\partial y}}}&{\frac{\partial }{{\partial z}}}\\
{\sin xy}&{\cos yz}&{\sin xz}
\end{array}} \right|$
$curl\left( {\bf{F}} \right) = \left( {y\sin yz} \right){\bf{i}} - \left( {z\cos xz} \right){\bf{j}} + \left( { - x\cos xy} \right){\bf{k}}$