Advertisements
Advertisements
प्रश्न
In the following figure, AD is a straight line, OP ⊥ AD and O is the centre of both circles. If OA = 34cm, OB = 20 cm and OP = 16 cm;
find the length of AB.
उत्तर
For the inner circle, BC is a chord and OP ⊥ BC.
We know that the perpendicular to a chord, from the center of a circle, bisects the chord.
∴ BP = PC
By Pythagoras theorem,
OB2 = OP2 + BP2
⇒ BP2 = 202 - 162 = 144
∴ BP = 12 cm
For the outer circle, AD is the chord and OP ⊥ AD.
We know that the perpendicular to a chord, from the center of a circle, bisects the chord.
∴ AP = PD
By Pythagoras Theorem,
OA2 = OP2 + AP2
⇒ AP2 = (34)2 - (16)2 = 900
⇒ AP = 30 cm
AB = AP - BP = 30 - 12 = 18 cm
APPEARS IN
संबंधित प्रश्न
A chord of length 6 cm is drawn in a circle of radius 5 cm. Calculate its distance from the centre of the circle.
A chord CD of a circle whose centre is O, is bisected at P by a diameter AB.
Given OA = OB = 15 cm and OP = 9 cm. calculate the length of:
(i) CD (ii) AD (iii) CB
In the given figure, M is the centre of the circle. Chords AB and CD are perpendicular to each other. If ∠MAD = x and ∠BAC = y :
- express ∠AMD in terms of x.
- express ∠ABD in terms of y.
- prove that : x = y.
The given figure shows two circles with centres A and B; and radii 5 cm and 3 cm respectively, touching each other internally. If the perpendicular bisector of AB meets the bigger circle in P and Q, find the length of PQ.
In the given figure, M is the centre of the circle. Chords AB and CD are perpendicular to each other.
If ∠MAD = x and ∠BAC = y : express ∠ABD in terms of y.
In the given figure, O is the center of the circle. AB and CD are two chords of the circle. OM is perpendicular to AB and ON is perpendicular to CD. AB = 24 cm, OM = 5 cm, ON = 12 cm, 
Find the :
(i) the radius of the circle
(ii) length of chord CD.
A chord of length 6 cm is drawn in a circle of radius 5 cm.
Calculate its distance from the center of the circle.
A chord of length 8 cm is drawn at a distance of 3 cm from the center of the circle.
Calculate the radius of the circle.
AB is a diameter of a circle with centre C = (- 2, 5). If A = (3, – 7). Find
(i) the length of radius AC
(ii) the coordinates of B.
In Fig. O is the centre of the circle of radius 5 cm. OP ⊥ AB, OQ ⊥ CD, AB || CD, AB = 6 cm and CD = 8 cm. Determine PQ.
