[tex]\mathbf r(t)=x(t)\,\mathbf i+y(t)\,\mathbf j+z(t)\,\mathbf k[/tex]
[tex]\implies\begin{cases}x(t)=t^3\\y(t)=-t^2\\z(t)=t\end{cases}[/tex]
[tex]\implies\dfrac{\mathrm d\mathbf r}{\mathrm dt}=3t^2\,\mathbf i-2t\,\mathbf j+\mathbf k[/tex]
with [tex]0\le t\le1[/tex]. With this parameterization, the vector field can be written as
[tex]\mathbf F(x,y,z)=\mathbf F(x(t),y(t),z(t))=5\sin(t^3)\,\mathbf i+4\cos(t^2)\,\mathbf j-2t^4\,\mathbf k[/tex]
Now the line integral is given by
[tex]\displaystyle\int_C\mathbf F\cdot\mathrm d\mathbf r=\int_{t=0}^{t=1}\mathbf F(x(t),y(t),z(t))\cdot\dfrac{\mathrm d\mathbf r(t)}{\mathrm dt}\,\mathrm dt[/tex]
[tex]=\displaystyle\int_0^1(15t^2\sin(t^3)-8t\cos(t^2)-2t^4)\,\mathrm dt[/tex]
[tex]=-5\cos1-4\sin1+\dfrac{23}5[/tex]
