Draw in radii OK, OH and OL and let their lengths be r.
Let OA = 4, the perpendicular from O to HK.
Let the red line OB = x, the perpendicular from O to HL, the length
of which is what we are to find.
Triangle OHK is isosceles, so the perpendicular from O to HK, which
is 4, bisects the base HK. HK is given as 16, so AH = AK = 8.
Similarly, triangle OHL is isosceles, so the perpendicular from O to HL,
which is our unknown x, bisects the base HL. HL is given as 10, so
BH = BL = 5.
We use the Pythagorean theorem on either right triangle OAH or OAK:
r² = 8²+4² = 64+16 = 80
We use the Pythagorean theorem on either right triangle OBH or OBL:
r² = x²+5², and we have already found r² = 80, so
80 = x²+25
55 = x²
So the solution is 
Edwin
