For $P$ a plane in $\mathbb{R^3}$, let $\pi_P:\mathbb{R}^3 \to P$ denote the orthogonal projection onto $P$. Suppose that $g: S^1 \to \mathbb{R}^3$ is a smooth embedding. Show that there exists a plane $P$ for which $\pi_{P}\circ g$ is an immersion.
Let $\psi: S^1 \to\mathbb{RP}^2$ be a map defined by $p \to [g_{*}(\frac{d}{dt}|_p)]$. I claim that $\psi$ is not onto. Since $\dim(S^1) \lt \dim (\mathbb{RP}^2)$, every point of $S^1$ is a critical point and by Sard's Theorem, $\psi(S^1)$ has measure zero in $\mathbb{RP}^2$. Hence $\psi(S^1)$ can't be whole of $\mathbb{RP}^2$. Let $L \in \mathbb{RP}^2 \setminus \psi(S^1)$. Now consider the projection $\pi_L$. I think that $\pi_L \circ g$ is an immersion. I am kind of stuck here. How do I show this??
Thanks for the help!!
You're right there.
Note, however, that you've defined $\pi_P$ for planes $P$, not lines $L$. So, having chosen $L$, you want to write $\pi_P$ where $P$ is the plane orthogonal to $L$.
What's the derivative of $\pi_P\circ g$? The chain rule says it's $(\pi_P\circ g)'(t)=d\pi_P(g'(t))= \pi_P(g'(t))$. Why is this everywhere nonzero? The kernel of $\pi_P$ is, as you said, the set of vectors orthogonal to $P$.