In a square ABCD, diagonals meet at O. P is a point on BC, such that OB = BP. Show that : (i) ∠POC = (ii) ∠BDC = 2 ∠POC (iii) ∠BOP = 3 ∠COP

Question

KnowledgeBoat · Accepted Answer

(i) Let ∠POC = x°. We know that, Each interior angle equals to 90°. Diagonals of square bisect the interior angles. From figure, ⇒ ∠OCP = ∠OBP = = 45°. We know that, In a triangle, an exterior angle is equal to sum of two opposite interior angles. ∴ ∠OPB = ∠OCP + ∠POC ⇒ ∠OPB = 45° + x° .........(1) In △ OBP, ⇒ OB = BP (Given) ⇒ ∠OPB = ∠BOP (Angles opposite to equal sides are equal) .........(2) From equation (1) and (2), we get : ⇒ ∠BOP = 45° + x° ............(3) We know that, Diagonals of square are perpendicular to each other. ∴ ∠BOC = 90° ⇒ ∠BOP + ∠POC = 90° ⇒ 45° + x° + x° = 90° ⇒ 2x° = 90° - 45° ⇒ 2x° = 45° ⇒ x° = ⇒ x° = ⇒ ∠POC = . Hence, proved that ∠POC = . (ii) From figure, ⇒ ∠BDC = 45° (Diagonals of a square bisect the interior angles) ⇒ ∠BDC = 2 × ⇒ ∠BDC = 2 × ∠POC ⇒ ∠BDC = 2 ∠POC. Hence, proved that ∠BDC = 2 ∠POC. (iii) From equation (3), ⇒ ∠BOP = 45° + x° ⇒ ∠BOP = 45° + 22.5° ⇒ ∠BOP = 67.5° ⇒ ∠BOP = 3 × 22.5° ⇒ ∠BOP = 3 × ∠POC ⇒ ∠BOP = 3 ∠POC. Hence, proved that ∠BOP = 3 ∠COP.

Mathematics

In a square ABCD, diagonals meet at O. P is a point on BC, such that OB = BP. Show that : (i) ∠POC = (ii) ∠BDC = 2 ∠POC (iii) ∠BOP = 3 ∠COP

Rectilinear Figures

Related Questions

In the figure, given alongside, AM bisects angle A and DM bisects angle D of parallelogram ABCD. Prove that : ∠AMD = 90°.

In the following figure, AE and BC are equal and parallel and the three sides AB, CD and DE are equal to one another. If angle A is 102°. Find angles AEC and BCD.

The given figure shows a square ABCD and an equilateral triangle ABP. Calculate :
(i) ∠AOB
(ii) ∠BPC
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Mathematics

In a square ABCD, diagonals meet at O. P is a point on BC, such that OB = BP. Show that : (i) ∠POC = (ii) ∠BDC = 2 ∠POC (iii) ∠BOP = 3 ∠COP

Rectilinear Figures

Related Questions

In the figure, given alongside, AM bisects angle A and DM bisects angle D of parallelogram ABCD. Prove that : ∠AMD = 90°.

In the following figure, AE and BC are equal and parallel and the three sides AB, CD and DE are equal to one another. If angle A is 102°. Find angles AEC and BCD.

The given figure shows a square ABCD and an equilateral triangle ABP. Calculate :(i) ∠AOB(ii) ∠BPC(iii) ∠PCD(iv) reflex ∠APC

In the given figure; ABCD is a rhombus with angle A = 67°. If DEC is an equilateral triangle, calculate :(i) ∠CBE(ii) ∠DBE

The given figure shows a square ABCD and an equilateral triangle ABP. Calculate :
(i) ∠AOB
(ii) ∠BPC
(iii) ∠PCD
(iv) reflex ∠APC

In the given figure; ABCD is a rhombus with angle A = 67°. If DEC is an equilateral triangle, calculate :
(i) ∠CBE
(ii) ∠DBE