Thats not necessarily true. Take a counterexample x = r \cos \theta, \quad y= r \sin \theta With x^1=x, x^2=y and s^1=r, s^2=\theta, you'll have \frac{\partial}{\partial y}\frac{\partial x}{\partial r} = \frac{\partial}{\partial y}(\cos \theta) = \Bigg(\frac{\partial r}{\partial y} \frac{\partial}{\partial r}+ \frac{\partial \theta}{\partial y} \frac{\partial}{\partial \theta}\Bigg) (\cos \theta) = 0 + \frac{\partial \theta}{\partial y} (-\sin \theta) ...

If you assume that no torque is imparted to the object during flight then you are entirely correct about the fact that the spear direction can not match the velocity direction. It may cross, perhaps ...

Yes,you are absolutely right in your procedure to find first dy/dx and then,as it denotes the slope of the tangent at a point,equating it to -(infinity) is the right way....however,let's see if anyone ...

This is what the vector field looks like in between the eigenvectors. Red dot is the origin. The eigenvalues are positive, so your solution cannot have decay like that for any initial value (see note) ...

Hint: Start with \sqrt x+1=u\implies x=(u-1)^2,dx=2(u-1)\ du

\int \frac{dz}{z^2+25} = \frac 1 5\int \frac{dz/5}{(z/5)^2+1} = \frac 1 5 \int \frac{du}{u^2+1} = \frac 1 5 \arctan u + C. As z\to\pm\infty then u\to\pm\infty, so recall from trigonometry ...