Prove that diagonals of a cyclic quadrilateral are perpendicular to each other,show that the line passing through the point of intersection of diagonals and midpoint of a side is perpendicular to the opposite side.
Answers
Answer:
Let us assume that H is the midpoint of AB . Now as we know that in a circle line joining the midpoint of chord and center is perpendicular to the chord.
∠ AHO = 90° (1)
In Δ AHO and Δ BHO,
AH = BH (H s the mid point of AB)
HO = HO (common)
∠AHO = ∠BHO ( 90°) [from 1]
ΔAHO ≅ ΔBHO (SAS congruent)
so ∠ AHO ≅ ∠BHO ( by C.P.C.T.)
Similarly, ∠AOH and ∠ BOH, so ∠AOH + ∠BOH = 90° (given that diagonals are perpendicular)
∠AOH = ∠BOH = 45°
In ΔAHO
∠AOH = 45°, ∠AHO = 90°
so ∠HAO = 45° hence ∠ HAO = ∠ HBO = 45°
Now,
∠OSU= ∠HAO = 45° (angles subtended by same arc) [2]
∠HBO = ∠ORU = 45° (angles subtended by same arc)
∠HOB = ∠SOU = 45° (vertically opp. angles) [3]
∠AOH = ∠ROU = 45° (vertically opp. angles )
Now in Δ OSU,
∠OUS + ∠SOU + ∠OSU= 180° (angle sum property)
∠OUS + 45° +45° = 180° (from Eq 2 and 3)
∠OUS = 180° - 90°
∠OUS = 90°
Hence prove
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