The locus of vertex of a parabola, given that an orthogonal intersection is made with another having specified latus rectum and orientation.

Imposing only one solution for $t$ is not requested: it may well happen that for a given value of $k$ two different values of $t$ (and thus of $h$) be found.

Your approach is correct, but you forgot that your goal is that of finding vertex $(h,k)$ as a function of $t$, and from your equation $2at^2-tk+2b=0$ one immediately gets: $$ k=2at+{2bover t}. $$ To find $h$ just use $$ h=x-{(y-k)^2over4b}=at^2-{bover t^2}. $$ These are then the parametric equations of the locus.

Notice that the parabolas, if $ane b$, also have another intersection point, where they are not orthogonal: probably the text of the problem should have mentioned that, to avoid confusion.

EDIT.

You can see below a diagram, with $a=1$ (black parabola) and $b=4$ (red parabola). Parabolas meet at $P=(4,4)$, where they are orthogonal (dashed lines are the tangents at $P$), but they also meet at $Q$. Green curve is the locus of vertex $V$ as $P$ varies on the black parabola: as you can see, for a given value of $k$ there are in general two possible values for $h$.

Note also that focus $F'$ of the variable parabola lies on line $PF$ (this is required by orthogonality). It is in fact possible to construct focus $F'$ (and vertex $V$) in a purely geometrical way.