In a square ABCD, P is any point on the side BC. The perpendicular drawn on AP from the point B intersects the side DC at the point Q. Let us prove that AP=BQ
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The figure according to given information is as shown:
Mark the intersection point of AP and BQ as O
Consider ∠BQC be x as shown
Consider ΔBCQ
∠C = 90° … ABCD is a square
As sum of angles of a triangle is 180°
⇒ ∠C + ∠BQC + ∠QBC = 180°
⇒ 90° + x + ∠QBC = 180°
⇒ ∠QBC = 90° - x …(i)
Now consider ΔOBP
∠BOP = 90° … given AP perpendicular to BQ
∠OBP = 90° – x … using (i)
As sum of angles of a triangle is 180°
⇒ ∠BOP + ∠OBP + ∠OPB = 180°
⇒ 90° + 90° - x + ∠OPB = 180°
⇒ ∠OPB = x … (ii)
Consider ΔAPB
∠ABP = 90° … ABCD is a square
∠APB = x … using (ii)
As sum of angles of a triangle is 180°
⇒ ∠ABP + ∠APB + ∠BAP = 180°
⇒ 90° + x + ∠BAP = 180°
⇒ ∠BAP = 90° - x … (iii)
Consider ΔAPB and Δ BQC
These two triangles are drawn separately from the same figure given above
(See fig. No. = B)
These angles are written using (i), (ii) and (iii)
∠QCB = ∠ABP = 90° … angles of a square ABCD
BC = AB … sides of a square ABCD
∠QBC = ∠PAB = 90° - x …using (i) and (iii)
Therefore, ΔQCB ≅ ΔPBA … ASA test for congruency
⇒ BQ = AP … corresponding sides of congruent triangles
Hence proved.