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Question 3
If P, Q and R are the mid-points of the sides BC, CA and AB of a triangle and AD is the perpendicular from A on BC, prove that P, Q, R and D are concyclic.
If P, Q and R are the mid-points of the sides BC, CA and AB of a triangle and AD is the perpendicular from A on BC, prove that P, Q, R and D are concyclic.
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Solution
R is mid point of hypotenuse AB of right ΔADB.
∴RB=RD [midpoint of hypotenuse is equidistant from the three vertices of Δ]
⇒∠2=∠1 ...(I) (isosceles Δ property)
RQ joins midpoints of sides AB and AC.
∴ RQ || BC (midpoint theorem)
⇒ RQ || BP
Similarly, QP || RB
∴BPQR is a parallelogram.
∠1=∠4 ...(II) (opposite angles of a parallelogram)
From (I) and (II),
∠2=∠4
but, ∠2+∠3=180∘ (linear pair axiom)
∴∠3+∠4=180∘
⇒PQRD is cyclic because sum of the opposite angles is 180∘ .
Therefore, points P, Q, R, D are concyclic.
R is mid point of hypotenuse AB of right ΔADB.
∴RB=RD [midpoint of hypotenuse is equidistant from the three vertices of Δ]
⇒∠2=∠1 ...(I) (isosceles Δ property)
RQ joins midpoints of sides AB and AC.
∴ RQ || BC (midpoint theorem)
⇒ RQ || BP
Similarly, QP || RB
∴BPQR is a parallelogram.
∠1=∠4 ...(II) (opposite angles of a parallelogram)
From (I) and (II),
∠2=∠4
but, ∠2+∠3=180∘ (linear pair axiom)
∴∠3+∠4=180∘
⇒PQRD is cyclic because sum of the opposite angles is 180∘ .
Therefore, points P, Q, R, D are concyclic.
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