In the figure (i) given below, chords AB, BC and CD of a circle with center O are equal. If ∠BCD = 120°, find
(i) ∠BDC
(ii) ∠BEC
(iii) ∠AEB
(iv) ∠AOB.
Hence, prove that △OAB is equilateral.

Question

In the figure (i) given below, chords AB, BC and CD of a circle with center O are equal. If ∠BCD = 120°, find
(i) ∠BDC
(ii) ∠BEC
(iii) ∠AEB
(iv) ∠AOB.
Hence, prove that △OAB is equilateral.

KnowledgeBoat · Accepted Answer

(i) In △BCD, BC = CD ∴ ∠CBD = ∠BDC (As angles opposite to equal sides are equal.) Since sum of angles in a triangle = 180°. In △BCD, ∠BCD + ∠CBD + ∠CDB = 180° ⇒ 120° + ∠CBD + ∠CBD = 180° ⇒ 120° + 2∠CBD = 180° ⇒ 2∠CBD = 180° - 120° ⇒ ∠CBD = = 30°. As ∠CBD = ∠BDC, ∴ ∠BDC = 30°. Hence, the value of ∠BDC = 30°. (ii) From figure, ∠BDC = ∠BEC (Angles in same segment are equal.) ∴ ∠BEC = 30° Hence, the value of ∠BEC = 30°. (iii) Given AB = CB ∴ ∠BEC = ∠AEB (Equal chords subtend equal angles.) ∴ ∠AEB = 30° Hence, the value of ∠AEB = 30°. (iv) Arc AB subtends ∠AOB at the centre and ∠AEB at the remaining part of the circle. ⇒ ∠AOB = 2∠AEB (As angle subtended on centre is twice the angle subtended on the remaining part of the circle). ⇒ ∠AOB = 2 × 30° ⇒ ∠AOB = 60°. Hence, the value of ∠AOB = 60°. Since, OB = OA (Radius of same circle) ∴ ∠OBA = ∠OAB = x (let) (As angles opposite to equal sides are equal) In △OAB, ⇒ ∠OBA + ∠OAB + ∠AOB = 180° ⇒ x + x + 60° = 180° ⇒ 2x = 180° - 60° ⇒ 2x = 120° ⇒ x = = 60°. ∠OBA = ∠OAB = 60°. Since, ∠AOB = ∠OBA = ∠OAB = 60° As, each angle of equilateral triangle = 60°. Hence, proved that OAB is an equilateral triangle.

Mathematics

In the figure (i) given below, chords AB, BC and CD of a circle with center O are equal. If ∠BCD = 120°, find
(i) ∠BDC
(ii) ∠BEC
(iii) ∠AEB
(iv) ∠AOB.
Hence, prove that △OAB is equilateral.

Circles

Related Questions

In the figure (i) given below, ∠CBP = 40°, ∠CPB = q° and ∠DAB = p°. Obtain an equation connecting p and q. If AC and BD meet at Q so that ∠AQD = 2q° and the points C, P, B and Q are concyclic, find the values of p and q.

In the figure (ii) given below, AC is a diameter of the circle with centre O. If CD || BE, ∠AOB = 130° and ∠ACE = 20°, find :
(i) ∠BEC
(ii) ∠ACB
(iii) ∠BCD
(iv) ∠CED.

In the figure (i) given below, AB and XY are diameters of a circle with centre O. If ∠APX = 30°, find
(i) ∠AOX
(ii) ∠APY
(iii) ∠BPY
(iv) ∠OAX.

In the figure (ii) given below, AP and BP are tangents to the circle with centre O. If ∠CBP = 25° and ∠CAP = 40°, find
(i) ∠ADB
(ii) ∠AOB
(iii) ∠ACB
(iv) ∠APB.

Mathematics

In the figure (i) given below, chords AB, BC and CD of a circle with center O are equal. If ∠BCD = 120°, find(i) ∠BDC(ii) ∠BEC(iii) ∠AEB(iv) ∠AOB.Hence, prove that △OAB is equilateral.

Circles

Related Questions

In the figure (i) given below, ∠CBP = 40°, ∠CPB = q° and ∠DAB = p°. Obtain an equation connecting p and q. If AC and BD meet at Q so that ∠AQD = 2q° and the points C, P, B and Q are concyclic, find the values of p and q.

In the figure (ii) given below, AC is a diameter of the circle with centre O. If CD || BE, ∠AOB = 130° and ∠ACE = 20°, find :(i) ∠BEC(ii) ∠ACB(iii) ∠BCD(iv) ∠CED.

In the figure (i) given below, AB and XY are diameters of a circle with centre O. If ∠APX = 30°, find(i) ∠AOX(ii) ∠APY(iii) ∠BPY(iv) ∠OAX.

In the figure (ii) given below, AP and BP are tangents to the circle with centre O. If ∠CBP = 25° and ∠CAP = 40°, find(i) ∠ADB(ii) ∠AOB(iii) ∠ACB(iv) ∠APB.

In the figure (i) given below, chords AB, BC and CD of a circle with center O are equal. If ∠BCD = 120°, find
(i) ∠BDC
(ii) ∠BEC
(iii) ∠AEB
(iv) ∠AOB.
Hence, prove that △OAB is equilateral.

In the figure (ii) given below, AC is a diameter of the circle with centre O. If CD || BE, ∠AOB = 130° and ∠ACE = 20°, find :
(i) ∠BEC
(ii) ∠ACB
(iii) ∠BCD
(iv) ∠CED.

In the figure (i) given below, AB and XY are diameters of a circle with centre O. If ∠APX = 30°, find
(i) ∠AOX
(ii) ∠APY
(iii) ∠BPY
(iv) ∠OAX.

In the figure (ii) given below, AP and BP are tangents to the circle with centre O. If ∠CBP = 25° and ∠CAP = 40°, find
(i) ∠ADB
(ii) ∠AOB
(iii) ∠ACB
(iv) ∠APB.