Let $C$ be the graph of vector function $r(s)$ parametrized by arc length with $r'(0)= ({2\over3},{1\over3},{2\over3})$ and $r''(0)=(-3,12,-3)$.
I need to find tangent vector $T(0)$, normal vector $N(0)$ and binormal vector $B(0)$.
I found definitions of $T,N$ and $B$ in literature but I don't get how to plug in given values.
Edit: Thanks to anon's explanation I got (revison 2):
$T(0) = {r'(0)\over||r'(0)||} = {r'(0)\over1} = ({2\over3},{1\over3},{2\over3})$
$N(0) = {T'(0)\over||T'(0)||} = {r''(0)\over||r''(0)||} = {{r''(0)}\over{9\sqrt2}} = (-{1\over3\sqrt2},{4\over3\sqrt2},-{1\over3\sqrt2})$
$B(0) = T(0) \times N(0) = (-\sqrt2,0,\sqrt2)$