This was a given answer in a STEP question, so is unlikely to be wrong (whereas if it was an answer in our hints and solutions there is a possibility of a typo etc).

SPOILERS!!! OTHER READERS, PLEASE ONLY READ AFTER HAVING HAD AN ATTEMPT AT THIS QUESTION.

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The hints are a little short on detail, so here are a few steps for you to check. When I eliminate $y$ I get the quadratic equation $x^2-50x+98=0$. One of the two solutions of this gives complex $y$ values, so we only want $x=2$.

$x=2$ gives $y=\pm 1$, so the POI are at $(2,1)$ and $(2,-1)$. A sketch will now show you that the centre of the circle lies on the $x$-axis, so can be written as $(a,0)$.

Using $(x-a)^2+y^2=r^2$ and the point $(2,1)$ gives $r^2 = (2-a)^2+1^2=4-4a+a^2+1 = 5-4a+a^2$.

The equation of the circle is hence:
\[
(x-a)^2+y^2=5-4a+a^2
\]
Expanding the brackets and cancelling $a^2$ gives the required equation.