Use the divergence theorem.
[tex]\mathbf F(x,y,z)=(x^5+y^5+z^5-2x-3y-4z)\,\mathbf i+\sin2y\,\mathbf j+4z\sin^2y\,\mathbf k[/tex]
[tex]\implies(\nabla\cdot\mathbf F)(x,y,z)=\dfrac{\partial(x^5+y^5+z^5-2x-3y-4z)}{\partial x}+\dfrac{\partial(\sin2y)}{\partial y}+\dfrac{\partial(4z\sin^2y)}{\partial z}=5x^4-2+2\cos2y+4\sin^2y[/tex]
The flux of [tex]\mathbf F[/tex] across the tetrahedron's surface [tex]S[/tex] is then given by the integral of [tex]\nabla\cdot\mathbf F[/tex] over the interior of the tetrahedron [tex]\mathbf R[/tex].
[tex]\displaystyle\iint_S\mathbf F\cdot\mathrm dS=\iiint_T\nabla\cdot\mathbf F\,\mathrm dV[/tex]
[tex]=\displaystyle\int_{x=0}^{x=1}\int_{y=0}^{y=1-x}\int_{z=0}^{z=1-x-y}(5x^4-2+2\cos2y+4\sin^2y)\,\mathrm dz\,\mathrm dy\,\mathrm dx[/tex]
[tex]=\dfrac1{42}[/tex]
