Advertisements
Advertisements
प्रश्न
In following figure , chord ED is parallel to the diameter AC of the circle. Given ∠ CBE = 65° , calculate ∠DEC .
उत्तर
Let O be the centre of the cirde on diameter AC of the circle
Since, EC make ∠ EOC at the centre and ∠ EBC on the remaining part of the circle
∴ ∠ EOC = 2 ∠EBC = 2 (65) = 130°
In Δ EOC ,
∠EOC + ∠ OCE + ∠ CEO = 180°
130 + x + x = 180° (OE = OC , ∴ ∠ OEC = ∠ OCE = x)
2x = 50
x = 25
∠ OCE = ∠ OEC = 25°
Also , ∠ OCE = ∠ CED = 25° (alternate interior angles)
APPEARS IN
संबंधित प्रश्न
In the following figure, AD is a straight line. OP ⊥ AD and O is the centre of both the circles. If OA = 34 cm. OB = 20 cm and OP = 16cm; find the length of AB.
In the following figure; P and Q are the points of intersection of two circles with centres O and O’. If straight lines APB and CQD are parallel to O O'; prove that:
(i) O O' = `1/2AB` (ii) AB = CD
The length of common chord of two intersecting circles is 30 cm. If the diameters of these two circles be 50 cm and 34 cm, calculate the distance between their centres.
In the figure, AB is common chord of the two circles. If AC and AD are diameters; prove that D, B and C are in a straight line. O1 and O2 are the centers of two circles.
The diameter and a chord of a circle have a common end-point. If the length of the diameter is 20 cm and the length of the chord is 12 cm, how far is the chord from the centre of the circle?
In the figure, AB is the chord of a circle with centre O and DOC is a line segment such that BC = DO. If ∠C = 20°, find angle AOD.
In the given figure, AB is the diameter. The tangent at C meets AB produced at Q.
If ∠CAB = 34°, Find : ∠CBA
Prove that the line segment joining the midpoints of two parallel chords of a circle passes through its centre.
In following figure . O is the centre of the circle. Find ∠ BAC.
In the given figure, AB and CD are two equal chords of a circle, with centre O. If P is the mid-point of chord AB, Q is the mid-point of chord CD and ∠POQ = 150°, find ∠APQ.
