I trust this message reaches you well. I am reaching out to request your assistance in solving an intriguing geometry problem that I came across in a recent competitive exam. Despite my best efforts, I have been unable to find a solution. I am eager to gain insights that will surely improve my understanding of this geometric challenge.
$ \textbf{Problem Description:} $
What is the ratio of the length of segment $OA$ to the length of segment $OC$ in a geometric figure where a circle is inscribed within a quadrilateral $ABCD$? The quadrilateral has vertices labeled as points $A, B, C,$ and $D$, with point $O$ as the center of the inscribed circle. Given the lengths of line segments $AB (4)$, $AD (9)$, $CD (12)$, and $BC (7)$, determine the value of $\frac{OA}{OC}$.
My Efforts:
I've tried various analytical approaches, but my results have been inconsistent. A more systematic strategy involving geometric properties, algebraic manipulation, or other mathematical tools seems necessary.
I made a note of this method, and then I tried to determine the values of $x$, $y$, $z$, and $p$, but it turned out that there are a countless number of solutions... I would be extremely grateful for any help or advice in figuring out the intricacies of this problem.
Thank you for your expertise and support.


