So the equation can be written in terms of a,b,c and since a=9, just in terms of b and c.

Desmos shows an ellipse (eq4) which simplifies to 

b^2-(49/29)bc-c^2-81=0 (eq5)

Solving for c (eq6) and reframing for y in terms of x (eq7)

The breakthrough is (eq8) which is the result of simplifying (b^2+c^2-a^2)/(2bc) using the a=9, b=x, and c as a function of b from the above.  It appears to be constant!

(eq10), (eq11), (eq12) are just steps in simplifying.  cos(A)=21/29

The last few equations are elementary solving for sin(A)=20/29