Answer
vertex: $(6, 0)$
$6$-units to the right; vertical stretch by a factor of $\frac{3}{2}$
Work Step by Step
RECALL:
The graph of the function $y=a\cdot |x-h|+k$ has its vertex at $(h, k)$ and involves the following transformations of the parent function $f(x)=|x|$:
(1) a horizontal shift ($h$ units to the right when $h\gt0$, $|h|$ units to the left when $h\lt0$);
(2) a vertical shift ($k$ units up when $k\gt0$, $|k|$ units down when $k\lt0$); and
(3) a vertical stretch (when $a \gt 0$) or vertical compression (when $0\lt a \lt 1$),
The given function has:
$a=\frac{3}{2}$, $h=6$, and $k=0$
Thus, its graph has its vertex at $(6, 0)$ and involves the following transformations of the parent function $f(x)=|x|$:
(1) $6$ units shift to the right; and
(2) a vertical stretch by a factor of $\frac{3}{2}$