Answer
$0$
Work Step by Step
We know that for a matrix
\[
\left[\begin{array}{rrr}
a & b & c \\
d &e & f \\
g &h & i \\
\end{array} \right]
\]
the determinant, $D=a(ei-fh)-b(di-fg)+c(dh-eg).$
We know that if we have two vectors $v=ai+bj+ck$ and $w=di+ej+fk$, then $v\times w$ can be obtained by the determinant of: \[
\left[\begin{array}{rrr}
i & j & k \\
a &b & c \\
d &e & f \\
\end{array} \right]
\]
Hence here $D=u\times v=i((-3)\cdot2-1\cdot3)-j(2\cdot2-1\cdot(-3))+k(2\cdot3-(-3)\cdot(-3))=-9i-7j-3k.$
$u\cdot(u\times v)=(2i-3j+k)(-9i-7j-3k)=2(-9)+(-3)(-7)+1(-3)=-18+21+(-3)=0$