(c) 2 : 1
Let ABC be the given triangle whose circumcentre is O.
Produce CO to meet the circle at G ⇒ COG is the diameter of the circle.
⇒ ∠GAC = ∠GBC = 90º (Angles in a semicircle)
Let AF and BE be the perpendiculars from vertex A and B respectively on sides BC and AC.
∴ H is the orthocentre of DABC. We need to find the ratio AH : OD, where OD is the perpendicular distance of the circumcentre O from side BC.
OD ⊥ BC ⇒ BD = DC (Perpendicular from the centre of the circle bisects the chord)
Also, GB ⊥ BC and OD ⊥ BC ⇒ OD || GB.
∴ In ΔBGC, by the midpoint theorem, O and D being the mid-points of sides GC and BC, OD || GB and OD = \(\frac{1}{2}\) GB
From (i)
Now GA and BE are both perpendiculars to AC
⇒ GA || BE ⇒ GA || BH
Also, GB || AF ⇒ GB || AH
⇒ GAHB is a parallelogram
⇒ GB = AH = 2OD
∴ \(\frac{AH}{OD} = \frac{2OD}{OD}\) = \(\frac{2}{1}\).
