Mathematics
The given figure shows a square ABCD and an equilateral triangle ABP. Calculate :
(i) ∠AOB
(ii) ∠BPC
(iii) ∠PCD
(iv) reflex ∠APC
Rectilinear Figures
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Answer
(i) Given,
ABP is an equilateral triangle.
∴ ∠PAB = 60°
From figure,
⇒ ∠OAB = ∠PAB = 60°.
We know that,
Each interior angle of a square equals 90° and diagonals bisect interior angles.
∴ ∠DBA = = 45°.
From figure,
⇒ ∠OBA = ∠DBA = 45°.
In △ AOB,
By angle sum property of triangle,
⇒ ∠OBA + ∠OAB + ∠AOB = 180°
⇒ 45° + 60° + ∠AOB = 180°
⇒ ∠AOB + 105° = 180°
⇒ ∠AOB = 180° - 105° = 75°.
Hence, ∠AOB = 75°.
(ii) From figure,
⇒ ∠PBA = 60° [Each angle of an equilateral triangle equals to 60°.]
⇒ ∠CBP = ∠CBA - ∠PBA = 90° - 60° = 30°.
We know that,
⇒ BP = AB (Sides of equilateral triangle) ………(1)
⇒ AB = BC (Sides of square ABCD are equal) ……..(2)
From equation (1) and (2), we get :
⇒ BP = BC.
In △ BPC,
⇒ BP = BC
⇒ ∠BCP = ∠BPC = x (let) [Angles opposite to equal sides are equal]
By angle sum property of triangle,
⇒ ∠BCP + ∠BPC + ∠CBP = 180°
⇒ x + x + 30° = 180°
⇒ 2x = 180° - 30°
⇒ 2x = 150°
⇒ x = = 75°.
Hence, ∠BPC = 75°.
(iii) As,
⇒ ∠BCP = ∠BPC = 75°
From figure,
⇒ ∠C = ∠BCP + ∠PCD
⇒ 90° = 75° + ∠PCD
⇒ ∠PCD = 90° - 75° = 15°.
Hence, ∠PCD = 15°.
(iv) From figure,
⇒ ∠APC = ∠APB + ∠BPC
⇒ ∠APC = 60° + 75° = 135°
⇒ Reflex ∠APC = 360° - ∠APC = 360° - 135° = 225°.
Hence, reflex ∠APC = 225°.
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