In a right triangle ABC, right angled at B, a circle is drawn with AB as diameter intersecting the hypotenuse AC at P. Prove that the tangent to the circle at P bisects BC
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OB= OP
so ∠ OBP= ∠ OPB.
∠ OPD is a right angle ( PD is a tangent).
Hence ∠ BPD= 90-∠OPB.
Same as ∠ PBD= 90- ∠ OBP.
as OBP and OPB ar equal, angle BPD= angle PBD and therefore DB=DP.
again.. angle OPX is a right angled and ∠ APX= ∠DPC,
hence ∠ BPC= ∠BPD+∠ APX
as ∠ APX +∠APO =90 and also ∠APO +∠OPB=90,
⇒∠APX=∠OPB.
∴ ∠ BPC = ∠ BPD +∠ APX = ∠ BPD +∠ OPB = ∠OPD =90
BPC is therefor a right triangle and BC is a diameter.
as DB=DP and D lies on the diameter BD would be equal to CD
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