Class 9 RD SHARMA Solutions Maths Chapter 15 - Circles
Circles Exercise Ex. 15.1
Solution 1
(i) interior/exterior
(ii) concentric
(iii) the exterior
(iv) arc
(v) diameter
(vi) semi-circle
(vii) centre
(viii) three
Solution 2
(i) T
(ii) T
(iii) T
(iv) F
(v) T
(vi) T
(vii) F
(viii) T
Circles Exercise Ex. 15.2
Solution 1
Solution 2
Solution 3
Solution 4
Steps of construction:
(1) Take three point A, B and C on the given circle.
(2) Join AB and BC.
(3) Draw the perpendicular bisectors of chord AB and BC which interesect each other at O.
(4) Point O will be the required circle because we know that the perpendicular bisector of a chord always passes through the centre.
Solution 5
Solution 6
Solution 7
Solution 8
Solution 9
Solution 10
Solution 11
OM = 4 cm
Solution 12
Solution 13
Solution 14
Suppose two different circles can intersect each other at three points then they will pass through the three common points but we know that there is one and only one circle with passes through three non-collinear points, which contradicts our supposition.
Hence, two different circles cannot intersect each other at more than two points.
Solution 15
In MOB
So, from equation (1) and (2)
Circles Exercise Ex. 15.3
Solution 1
Solution 2
Circles Exercise Ex. 15.4
Solution 1
Solution 2
Solution 3(i)
Solution 3(ii)
Solution 3(iii)
Solution 3(iv)
Solution 3(v)
Solution 3(vi)
Solution 3(vii)
Solution 3(viii)
Solution 3(ix)
Solution 3(x)
Solution 3(xi)
Solution 3(xii)
Solution 4
Solution 5
Solution 6
Solution 7
Solution 8
Solution 9
Solution 10
Solution 11
Circles Exercise Ex. 15.5
Solution 1
Solution 2
Solution 3
Solution 4
Solution 5
Solution 6
Solution 7
Solution 8
Solution 9
Solution 10
Solution 11
Solution 12
Solution 13
Solution 14
Solution 15
Solution 16
Solution 17
Solution 18(i)
Solution 18(ii)
Solution 18(iii)
Solution 19
Solution 20
Solution 21
Solution 22
Solution 23
Solution 24
Solution 25
Let O be the centre of the circle circumscribing the cyclic rectangle ABCD. Since ABC = 90o and AC is a chord of the circle, so, AC is a diameter of the circle. Similarly, BD is a diameter.
Hence, point of intersection of AC and BD is the centre of the circle.
Solution 26
Solution 27
Solution 28
Solution 29
Circles Exercise 15.109
Solution 1
Solution 2
Circles Exercise 15.110
Solution 3
Solution 4
Solution 5
Solution 6
Solution 7
Solution 8
Solution 9
Solution 10
Solution 11
Solution 12
Solution 13
Solution 14
Solution 15
Circles Exercise 15.111
Solution 16
Solution 17
Solution 18
The greatest chord of the circle is diameter of the circle.
Hence, correct option is (c).
Solution 19
Angle formed in a minor segment is always a obtuse angle.
Hence, correct option is (b).
Solution 20
Three non-collinear points make a triangle and there is only one circle that can pass through all three points,
i.e. circumcircle of that triangle.
Hence, correct option is (a).
Solution 21
Solution 22
Solution 23
Solution 24
Circles Exercise 15.112
Solution 25
Solution 26
Solution 27
Solution 28
Solution 29
Solution 30