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प्रश्न
In the square PQRS, the diagonals intersect at O. M is a point on PS such that PM = PO. Show that ∠POM = 3∠MOS.
बेरीज
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उत्तर
Let’s consider the following square PQRS.
Let ∠MOS = x
Since, diagonals of a square bisect the angles
∴ ∠OSM = ∠OPM = `90^circ/2` = 45°
Using exterior angle property for ΔOMS,
∠OMP = ∠OMS + ∠MOS
∠OMP = ∠OMS + ∠MOS
∠OMP = 45° + x ...(i)
In ΔOPM,
OP = MP ...(Given)
∴ ∠OMP = ∠POM ...(Angles opposite to equal sides are equal)
⇒ ∠POM = 45° + x ...(ii) [From (i)]
Diagonals of a square are perpendicular to each other.
∴ ∠POM + ∠MOS = 90°
⇒ 45° + x + x = 90°
⇒ x = 22.5° = `(22 1/2)^circ`
And ∠POM = 45° + x ...[From (ii)]
⇒ ∠POM = 45° + 22.5° = 3 × 22.5° = 3∠MOS
Hence, proved.
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