Some hints: You have an explicit formula for n. The components of n are (n_1, n_2) = \left( \frac{-t_2}{\sqrt{t_1^2 + t_2^2}}, \frac{t_1}{\sqrt{t_1^2 + t_2^2}} \right) If \phi(s) is a ...

I do not see any way to get rid of the sine to make it linear, but we can use the standard trick to rewrite it as a first order equation: Let \psi = \binom\phi{\phi'}, then \begin{align*} \psi' &= ...

First, about the total/partial derivatives: He's talking about the trajectory of a point at rest, not about a coordinate transformation, so it's appropriate to take the total derivative with respect ...

Pauls notes was not incorrect. What happen was in one problem the normal was found with respect to x,y,z and then converted to spherical coordinates. If you choose to do it this way, you must add ...

Nicely done! The Chain Rule is all you need to prove you first answer correct. Moreover, it's all you can use, given the information provided. The only potential problem is this: \phi was never ...

Here’s a way of looking at the coordinate transformation that might help you develop an intuition for this. Instead of thinking of spherical coordinates as a different way of labeling the points in a ...