NCERT Solutions for Class 10 Maths Chapter 10 Circles
Exercise 10.1
Q.1) How many tangents can a circle have?
Sol.1) A circle can have infinite tangents.
Q.2) Fill in the blanks :
(i) A tangent to a circle intersects it in ............... point(s).
(ii) A line intersecting a circle in two points is called a .............
(iii) A circle can have ............... parallel tangents at the most.
(iv) The common point of a tangent to a circle and the circle is called ............
Sol.1) (i) one (ii) secant (iii) two (iv) point of contact
Q.3) A tangent PQ at a point P of a circle of radius 5 cm meets a line through the centre O at a point Q so that ππ = 12 ππ. Length PQ is :
(A) 12 cm (B) 13 cm (C) 8.5 cm (D) √119 ππ
Sol.3) The line drawn from the centre of the circle to the tangent is perpendicular to the tangent.
∴ ππ ⊥ ππ
By Pythagoras theorem in π₯πππ,
ππ2 = ππ2 + ππ2
⇒ (12)2 = 52 + ππ2
⇒ ππ2 = 144 − 25
⇒ ππ2 = 119
⇒ ππ = √119 ππ
(D) is the correct option
Q.4) Draw a circle and two lines parallel to a given line such that one is a tangent and the other, a secant to the circle.
Sol.4) AB and XY are two parallel lines where AB is the tangent to the circle at point C while XY is the secant to the circle
Exercise: 10.2
Q.1) In Q.1 to 3, choose the correct option and give justification.
From a point Q, the length of the tangent to a circle is 24 cm and the distance of Q from the centre is 25 cm. The radius of the circle is
(A) 7 cm (B) 12 cm (C) 15 cm (D) 24.5 cm
Sol.1) The line drawn from the centre of the circle to the tangent is perpendicular to the tangent.
∴ ππ ⊥ ππ
also, π₯πππ is right angled.
ππ = 25 ππ and ππ = 24 ππ (Given)
By Pythagoras theorem in π₯πππ,
ππ2 = ππ2 + ππ2
⇒ (25)2 = ππ2 + (24)2
⇒ ππ2 = 625 − 576
⇒ ππ2 = 49
⇒ ππ = 7 ππ
The radius of the circle is option (A) 7 cm.
Q.2) In Fig. 10.11, if TP and TQ are the two tangents to a circle with centre O so that ∠POQ =
110°, then ∠PTQ is equal to (A) 60° (B) 70° (C) 80° (D) 90°
Sol.2) OP and OQ are radii of the circle to the tangents TP and TQ respectively.
∴ ππ ⊥ ππ and,
∴ ππ ⊥ ππ ∠πππ = ∠πππ = 90°
In quadrilateral ππππ, Sum of all interior angles = 360°
∠πππ + ∠πππ + ∠πππ + ∠πππ = 360°
⇒ ∠πππ + 90° + 110° + 90° = 360°
⇒ ∠πππ = 70°
∠πππ is equal to option (B) 70°.
Q.3) If tangents PA and PB from a point P to a circle with centre O are inclined to each other at angle of 80°, then ∠ πππ΄ is equal to
(A) 50° (B) 60° (C) 70° (D) 80°
Sol.3) OA and OB are radii of the circle to the tangents PA and PB respectively.
∴ ππ΄ ⊥ ππ΄ and,
∴ ππ΅ ⊥ ππ΅ ∠ππ΅π = ∠ππ΄π = 90°
In quadrilateral AOBP, Sum of all interior angles = 360°
∠π΄ππ΅ + ∠ππ΅π + ∠ππ΄π + ∠π΄ππ΅ = 360°
⇒ ∠π΄ππ΅ + 90° + 90° + 80° = 360°
⇒ ∠π΄ππ΅ = 100°
Now, In π₯πππ΅ and π₯πππ΄,
π΄π = π΅π (Tangents from a point are equal)
ππ΄ = ππ΅ (Radii of the circle)
ππ = ππ (Common side)
∴ π₯πππ΅ ≅ π₯πππ΄ (by SSS congruence condition)
Thus ∠πππ΅ = ∠πππ΄ ∠π΄ππ΅ = ∠πππ΅ + ∠πππ΄
⇒ 2 ∠πππ΄ = ∠π΄ππ΅
⇒ ∠πππ΄ = 100°/2 = 50°
∠πππ΄ is equal to option (A) 50°
Q.4) Prove that the tangents drawn at the ends of a diameter of a circle are parallel.
Sol.4) Let AB be a diameter of the circle.
Two tangents PQ and RS are drawn at points A and B respectively.
Radii of the circle to the tangents will be perpendicular to it.
∴ ππ΅ ⊥ π
π and,
∴ ππ΄ ⊥ ππ
∠ππ΅π
= ∠ππ΅π = ∠ππ΄π = ∠ππ΄π = 90°
From the figure, ∠ππ΅π
= ∠ππ΄π (Alternate interior angles)
∠ππ΅π = ∠ππ΄π (Alternate interior angles)
Since alternate interior angles are equal, lines PQ and RS will be parallel.
Hence Proved that the tangents drawn at the ends of a diameter of a circle are parallel.
Q.5) Prove that the perpendicular at the point of contact to the tangent to a circle passes through the centre.
Sol.5) Let AB be the tangent to the circle at point P with centre O.
We have to prove that PQ passes through the point O.
Suppose that PQ doesn't passes through point O. Join OP.
Through O, draw a straight line CD parallel to the tangent AB.
PQ intersect CD at R and also intersect AB at P.
π΄π, πΆπ· // π΄π΅
ππ is the line of intersection,
∠ππ
π = ∠π
ππ΄ (Alternate interior angles) but also,
∠π
ππ΄ = 90° (ππ ⊥ π΄π΅)
⇒ ∠ππ
π = 90° ∠π
ππ + ∠πππ΄ = 180° (Co-interior angles)
⇒ ∠π
ππ + 90° = 180°
⇒ ∠π
ππ = 90°
Thus, the π₯ππ
π has 2 right angles i.e.
∠ππ
π and ∠π
ππ which is not possible.
Hence, our supposition is wrong.
∴ ππ passes through the point O.
Q.6) The length of a tangent from a point A at distance 5 cm from the centre of the circle is 4 cm. Find the radius of the circle.
Sol.6) AB is a tangent drawn on this circle from point π΄.
∴ ππ΅ ⊥ π΄π΅
ππ΄ = 5ππ and π΄π΅ = 4 ππ (Given)
In π₯π΄π΅π, By Pythagoras theorem in
π₯π΄π΅π, ππ΄2 = π΄π΅2 + π΅π2
⇒ 52 = 42 + π΅π2
⇒ π΅π2 = 25 − 16
⇒ π΅π2 = 9
⇒ π΅π = 3
∴ The radius of the circle is 3 cm
Q.7) Two concentric circles are of radii 5 cm and 3 cm. Find the length of the chord of the larger circle which touches the smaller circle
Sol.7) Let the two concentric circles with centre π.
π΄π΅ be the chord of the larger circle which touches the smaller circle at point P.
∴ π΄π΅ is tangent to the smaller circle to the point π.
⇒ ππ ⊥ π΄π΅
By Pythagoras theorem in π₯πππ΄,
ππ΄2 = π΄π2 + ππ2
⇒ 52 = π΄π2 + 32
⇒ π΄π2 = 25 − 9
⇒ π΄π = 4
In π₯πππ΅, Since ππ ⊥ π΄π΅,
π΄π = ππ΅ (Perpendicular from the center of the circle bisects the chord)
π΄π΅ = 2π΄π = 2 × 4 = 8 ππ
∴ The length of the chord of the larger circle is 8 cm
Q.8) A quadrilateral ABCD is drawn to circumscribe a circle (see Fig.). Prove that π΄π΅ + πΆπ· = π΄π· + π΅πΆ
Sol.8) From the figure we observe that,
DR = DS (Tangents on the circle from point D) … (i)
AP = AS (Tangents on the circle from point A) … (ii)
BP = BQ (Tangents on the circle from point B) … (iii)
CR = CQ (Tangents on the circle from point C) … (iv)
Adding all these equations,
π·π
+ π΄π + π΅π + πΆπ
= π·π + π΄π + π΅π + πΆπ
⇒ (π΅π + π΄π) + (π·π
+ πΆπ
) = (π·π + π΄π) + (πΆπ + π΅π)
⇒ πΆπ· + π΄π΅ = π΄π· + π΅πΆ
Q.9) In the given figure, ππ and π’π’ are two parallel tangents to a circle with centre O and another tangent AB with point of contact C intersecting ππ at A and π’π’ at B.
Sol.9) We joined O and C
A/q,
In π₯πππ΄ and π₯ππΆπ΄,
ππ = ππΆ (Radii of the same circle)
π΄π = π΄πΆ (Tangents from point A)
π΄π = π΄π (Common side)
∴ π₯πππ΄ ≅ π₯ππΆπ΄ (SSS congruence criterion)
⇒ ∠πππ΄ = ∠πΆππ΄ … (i)
Similarly, π₯πππ΅ ≅ π₯ππΆπ΅
∠πππ΅ = ∠πΆππ΅ … (ii)
Since POQ is a diameter of the circle, it is a straight line.
∴ ∠πππ΄ + ∠πΆππ΄ + ∠πΆππ΅ + ∠πππ΅ = 180°
From equations (i) and (ii),
2∠πΆππ΄ + 2∠πΆππ΅ = 180°
⇒ ∠πΆππ΄ + ∠πΆππ΅ = 90°
⇒ ∠π΄ππ΅ = 90°
Q.10) Prove that the angle between the two tangents drawn from an external point to a circle is supplementary to the angle subtended by the line-segment joining the points of contact at the centre.
Sol.10) Let us consider a circle centered at point O.
Let P be an external point from which two tangents PA and PB are drawn to the circle which are touching the circle at point A and B respectively and AB is the line segment, joining point of contacts A and B together such that it subtends ∠π΄ππ΅ at center O of the circle.
It can be observed that
ππ΄ (radius) ⊥ ππ΄ (tangent)
Therefore, ∠ππ΄π = 90°
Similarly, ππ΅ (radius) ⊥ ππ΅ (tangent)
∠ππ΅π = 90°
In quadrilateral ππ΄ππ΅,
Sum of all interior angles = 360°
∠ππ΄π + ∠π΄ππ΅ + ∠ππ΅π + ∠π΅ππ΄ = 360°
90° + ∠π΄ππ΅ + 180° + ∠π΅ππ΄ = 360°
∠π΄ππ΅ + ∠π΅ππ΄ = 180°
Hence, it can be observed that the angle between the two tangents drawn from an external point to a circle is supplementary to the angle subtended by the line segment joining the points of contact at the centre.
Q.11) Prove that the parallelogram circumscribing a circle is a rhombus.
Sol.11) ABCD is a parallelogram,
∴ π΄π΅ = πΆπ· ... (i)
∴ π΅πΆ = π΄π· ... (ii)
From the figure, we observe that,
DR = DS (Tangents to the circle at D)
CR = CQ (Tangents to the circle at C)
BP = BQ (Tangents to the circle at B)
AP = AS (Tangents to the circle at A) Adding all these,
π·π
+ πΆπ
+ π΅π + π΄π = π·π + πΆπ + π΅π + π΄π
⇒ (π·π
+ πΆπ
) + (π΅π + π΄π) = (π·π + π΄π) + (πΆπ + π΅π)
⇒ πΆπ· + π΄π΅ = π΄π· + π΅πΆ ... (iii)
Putting the value of (i) and (ii) in equation (iii) we get,
2π΄π΅ = 2π΅πΆ
⇒ π΄π΅ = π΅πΆ ... (iv)
By Comparing equations (i), (ii), and (iv) we get,
π΄π΅ = π΅πΆ = πΆπ· = π·π΄
∴ π΄π΅πΆπ· is a rhombus.
Q.12) A triangle ABC is drawn to circumscribe a circle of radius 4 cm such that the segments BD and DC into which BC is divided by the point of contact D are of lengths 8 cm and 6 cm respectively (see Fig.). Find the sides AB and AC.
Sol.12) In π₯π΄π΅πΆ,
Length of two tangents drawn from the same point to the circle are equal,
∴ πΆπΉ = πΆπ· = 6ππ
∴ π΅πΈ = π΅π· = 8ππ
∴ π΄πΈ = π΄πΉ = π₯
We observed that,
π΄π΅ = π΄πΈ + πΈπ΅ = π₯ + 8
π΅πΆ = π΅π· + π·πΆ = 8 + 6 = 14
πΆπ΄ = πΆπΉ + πΉπ΄ = 6 + π₯
Now semi perimeter of circles,
⇒ 2π = π΄π΅ + π΅πΆ + πΆπ΄
= π₯ + 8 + 14 + 6 + π₯ = 28 + 2π₯
⇒ π = 14 + π₯
= 2 × 1/2
(4π₯ + 24 + 32) = 56 + 4π₯ ... (ii)
Equating equation (i) and (ii) we get,
√(14 + π₯)48π₯ = 56 + 4π₯
Squaring both sides,
48π₯ (14 + π₯) = (56 + 4π₯)2
⇒ 48π₯ = [4(14 + π₯)]2/14 + π₯
⇒ 48π₯ = 16 (14 + π₯)
⇒ 48π₯ = 224 + 16π₯
⇒ 32π₯ = 224
⇒ π₯ = 7 ππ
Hence, π΄π΅ = π₯ + 8 = 7 + 8 = 15 ππ
πΆπ΄ = 6 + π₯ = 6 + 7 = 13 ππ
Q.13) Prove that opposite sides of a quadrilateral circumscribing a circle subtend supplementary angles at the centre of the circle.
Sol.13) Let ABCD be a quadrilateral circumscribing a circle with O such that it touches the circle
at point P, Q, R, S.
Join the vertices of the quadrilateral ABCD to the center of the circle.
In π₯ππ΄π and π₯ππ΄π,
π΄π = π΄π (Tangents from the same point)
ππ = ππ (Radii of the circle)
ππ΄ = ππ΄ (Common side)
π₯ππ΄π ≅ π₯ππ΄π (SSS congruence condition)
∴ ∠πππ΄ = ∠π΄ππ
⇒ ∠1 = ∠8
Similarly, we get,
∠2 = ∠3
∠4 = ∠5
∠6 = ∠7
Adding all these angles,
∠1 + ∠2 + ∠3 + ∠4 + ∠5 + ∠6 + ∠7 + ∠8 = 360°
⇒ (∠1 + ∠8) + (∠2 + ∠3) + (∠4 + ∠5) + (∠6 + ∠7) = 360°
⇒ 2 ∠1 + 2 ∠2 + 2 ∠5 + 2 ∠6 = 360°
⇒ 2(∠1 + ∠2) + 2(∠5 + ∠6) = 360°
⇒ (∠1 + ∠2) + (∠5 + ∠6) = 180°
⇒ ∠π΄ππ΅ + ∠πΆππ· = 180°
Similarly, we can prove that ∠ π΅ππΆ + ∠ π·ππ΄ = 180°
Hence, opposite sides of a quadrilateral circumscribing a circle subtend supplementary angles at the centre of the circle
Either way the teacher or student will get the solution to the problem within 24 hours.