Advertisements
Advertisements
प्रश्न
The chord of a circle is equal to its radius. The angle subtended by this chord at the minor arc of the circle is
पर्याय
60°
75°
120°
150°
Advertisements
उत्तर
150°
We are given that the chord is equal to its radius.
We have to find the angle subtended by this chord at the minor arc.
We have the corresponding figure as follows:
We are given that
AO = OB = AB
So ,
\[\bigtriangleup\] AOB is an equilateral triangle.
Therefore, we have
∠AOB = 60°
Since, the angle subtended by any chord at the centre is twice of the angle subtended at any point on the circle.
So `angleAQB =(angleAOB)/2`
`= 60/2 = 30°`
Take a point P on the minor arc.
Since `square APBQ` is a cyclic quadrilateral
So, opposite angles are supplementary. That is
`angle APB + angleAQB = 180°`
`angle APB + 30° = 180°`
`angleAPB = 180° - 30°`
`= 150°`
APPEARS IN
संबंधित प्रश्न
Fill in the blank:
A circle divides the plane, on which it lies, in ............ parts.
Given an arc of a circle, complete the circle.
If O is the centre of the circle, find the value of x in the following figure
If O is the centre of the circle, find the value of x in the following figure
In the given figure, O and O' are centres of two circles intersecting at B and C. ACD is a straight line, find x.
In the given figure, two circles intersect at A and B. The centre of the smaller circle is Oand it lies on the circumference of the larger circle. If ∠APB = 70°, find ∠ACB.
In the given figure, two congruent circles with centres O and O' intersect at A and B. If ∠AOB = 50°, then find ∠APB.
In the given figure, if ∠AOB = 80° and ∠ABC = 30°, then find ∠CAO.
In the given figure, if O is the circumcentre of ∠ABC, then find the value of ∠OBC + ∠BAC.
A chord of a circle is equal to its radius. Find the angle subtended by this chord at a point in major segment.
