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10CIRCLES
1 Introduction
You have studied in Class IX that a circle is a collection of all points in a plane which are at a constant distance (radius) from a fixed point (centre). You have also studied various terms related to a circle like chord, segment, sector, arc etc. Let us now examine the different situations that can arise when a circle and a line are given in a plane.
So, let us consider a circle and a line PQ. There can be three possibilities given in Fig. 1 below:
Fig 1
In Fig. 1 (i), the line PQ and the circle have no common point. In this case, PQ is called a nonintersecting line with respect to the circle. In Fig. 10.1 (ii), there are two common points A and B that the line PQ and the circle have. In this case, we call the line PQ a secant of the circle. In Fig. 1 (iii), there is only one point A which is common to the line PQ and the circle. In this case, the line is called a tangent to the circle.
You might have seen a pulley fitted over a well which is used in taking out water from the well. Look at Fig. 2. Here the rope on both sides of the pulley, if considered as a ray, is like a tangent to the circle representing the pulley.
Fig. 2
Is there any position of the line with respect to the circle other than the types given above? You can see that there cannot be any other type of position of the line with respect to the circle. In this chapter, we will study about the existence of the tangents to a circle and also study some of their properties.
1 Tangent to a Circle
In this chapter, we shall discuss one of these patterns in which succeeding terms are obtained by adding a fixed number to the preceding terms. We shall also see how to find their nth terms and the sum of n consecutive terms, and use this knowledge in solving some daily life problems.
In the previous section, you have seen that a tangent* to a circle is a line that intersects the circle at only one point.
To understand the existence of the tangent to a circle at a point, let us perform the following activities:
On a paper, draw a circle and a secant PQ of the circle. Draw various lines parallel to the secant on both sides of it. You will find that after some steps, the length of the chord cut by the lines will gradually decrease, i.e., the two points of intersection of the line and the circle are coming closer and closer [see Fig. 3(ii)]. In one case, it becomes zero on one side of the secant and in another case, it becomes zero on the other side of the secant. See the positions P′Q′ and P′′Q′′ of the secant in Fig. 3 (ii). These are the tangents to the circle parallel to the given secant PQ. This also helps you to see that there cannot be more than two tangents parallel to a given secant.
Fig. 3(ii)
This activity also establishes, what you must have observed, while doing Activity 1, namely, a tangent is the secant when both of the end points of the corresponding chord coincide.
The common point of the tangent and the circle is called the point of contact [the point A in Fig. 1 (iii)]and the tangent is said to touch the circle at the common point.
Now look around you. Have you seen a bicycle or a cart moving? Look at its wheels. All the spokes of a wheel are along its radii. Now note the position of the wheel with respect to its movement on the ground. Do you see any tangent anywhere? (See Fig. 4). In fact, the wheel moves along a line which is a tangent to the circle representing the wheel. Also, notice that in all positions, the radius through the point of contact with the ground appears to be at right angles to the tangent (see Fig. 4). We shall now prove this property of the tangent.
Fig. 4
The tangent at any point of a circle is perpendicular to the radius through the point of contact.
We are given a circle with centre O and a tangent XY to the circle at a point P. We need to prove that OP is perpendicular to XY.
Take a point Q on XY other than P and join OQ (see Fig. 5).
fig. 5
The point Q must lie outside the circle. (Why? Note that if Q lies inside the circle, XY will become a secant and not a tangent to the circle). Therefore, OQ is longer than the radius OP of the circle. That is,
OQ > OP.
Since this happens for every point on the line XY except the point P, OP is the shortest of all the distances of the point O to the points of XY. So OP is perpendicular to XY. (as shown in Theorem A1.7.)
 By theorem above, we can also conclude that at any point on a circle there can be one and only one tangent.
 The line containing the radius through the point of contact is also sometimes called the ‘normal’ to the circle at the point.
 How many tangents can a circle have?

Fill in the blanks :

A tangent to a circle intersects it in
point (s).  A line intersecting a circle in two points is called a
point (s).  A circle can have
parallel tangents at the most.  The common point of a tangent to a circle and the circle is called

A tangent to a circle intersects it in
 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 OQ = 12 cm. Length PQ is :
(a)12 cm (B)13 cm (C)8.5 cm (D)√119 cm
 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.
3 Number of Tangents from a Point on a Circle
To get an idea of the number of tangents from a point on a circle, let us perform the following activity:
Draw a circle on a paper. Take a point P inside it. Can you draw a tangent to the circle through this point? You will find that all the lines through this point intersect the circle in two points. So, it is not possible to draw any tangent to a circle through a point inside it [see Fig. 6 (i)].
Fig. 6
Next take a point P on the circle and draw tangents through this point. You have already observed that there is only one tangent to the circle at such a point [see Fig. 6 (ii)].
Finally, take a point P outside the circle and try to draw tangents to the circle from this point. What do you observe? You will find that you can draw exactly two tangents to the circle through this point [see Fig. 6 (iii)].
We can summarise these facts as follows:
There is no tangent to a circle passing through a point lying inside the circle.
There is one and only one tangent to a circle passing through a point lying on the circle.
There are exactly two tangents to a circle through a point lying outside the circle.
In Fig. 6 (iii), T_{1} and T_{2} are the points of contact of the tangents PT_{1} and PT_{2} respectively.
The length of the segment of the tangent from the external point P and the point of contact with the circle is called the length of the tangent from the point P to the circle.
Note that in Fig. 6 (iii), PT_{1} and PT_{2} are the lengths of the tangents from P to the circle. The lengths PT_{1} and PT_{2} have a common property. Can you find this? Measure PT_{1} and PT_{2}. Are these equal? In fact, this is always so. Let us give a proof of this fact in the following theorem.
We are given a circle with centre O, a point P lying outside the circle and two tangents PQ, PR on the circle from P (see Fig. 10.7). We are required to prove that PQ = PR.
Fig.7
For this, we join OP, OQ and OR. Then ∠ OQP and ∠ ORP are right angles, because these are angles between the radii and tangents, and according to Theorem 10.1 they are right angles. Now in right triangles OQP and ORP,
OQ = OR (Radii of the same circle)
OP = OP (Common)
Therefore, Δ OQP ≅ Δ ORP (RHS)
This gives PQ = PR (CPCT)
 The theorem can also be proved by using the Pythagoras Theorem as follows:
PQ^{2} = OP^{2} – OQ^{2} = OP^{2} – OR^{2} = PR^{2} (As OQ = OR)
 Note also that ∠ OPQ = ∠ OPR. Therefore, OP is the angle bisector of ∠ QPR, i.e., the centre lies on the bisector of the angle between the two tangents.
Let us take some examples.
Prove that in two concentric circles, the chord of the larger circle, which touches the smaller circle, is bisected at the point of contact.
We are given two concentric circles C_{1} and C_{2} with centre O and a chord AB of the larger circle C1 which touches the smaller circle C_{2} at the point P (see Fig. 8). We need to prove that AP = BP.
Fig. 8
Let us join OP. Then, AB is a tangent to C_{2} at P and OP is its radius. Therefore, by Theorem 10.1,
OP ⊥ AB
Now AB is a chord of the circle C1 and OP ⊥ AB. Therefore, OP is the bisector of the chord AB, as the perpendicular from the centre bisects the chord,
i.e., AP = BP
Two tangents TP and TQ are drawn to a circle with centre O from an external point T. Prove that ∠ PTQ = 2 ∠ OPQ.
fig. 9
We are given a circle with centre O, an external point T and two tangents TP and TQ to the circle, where P, Q are the points of contact (see Fig. 9). We need to prove that
∠ PTQ = 2 ∠ OPQ
Let ∠ PTQ = θ
Now, by Theorem 10.2, TP = TQ. So, TPQ is an isosceles triangle.
Therefore,
∠ TPQ = ∠ TQP = (1/2)(180° − θ) = 90° − (1/2)θ
Also, by Theorem 10.1, ∠ OPT = 90°
So,
∠ OPQ = ∠ OPT – ∠ TPQ = 90° − [ 90° – θ ]
= (1/2)θ = (1/2)∠ PTQ
This gives ∠ PTQ = 2 ∠ OPQ
PQ is a chord of length 8 cm of a circle of radius 5 cm. The tangents at P and Q intersect at a point T (see Fig. 10.10). Find the length TP.
Join OT. Let it intersect PQ at the point R. Then Δ TPQ is isosceles and TO is the angle bisector of ∠ PTQ. So, OT ⊥ PQ and therefore, OT bisects PQ which gives PR = RQ = 4 cm.
Fig. 10
Also, OR = √(OP^{2} − PR^{2}) = √(5^{2} − 4^{2}) cm = 3 cm .
Now, ∠ TPR + ∠ RPO = 90° = ∠ TPR + ∠ PTR (Why?)
So, ∠ RPO = ∠ PTR
Therefore, right triangle TRP is similar to the right triangle PRO by AA similarity.
This gives TP/PO = RP/RO, i.e., TP/5 = 4/3 or TP = 20/3 cm.
Note :
TP can also be found by using the Pythagoras Theorem, as follows:
Let TP = x and TR = y. Then
x^{2} = y^{2} + 16 (Taking right Δ PRT) (1)
x + 5 = (y + 3)^{2} (Taking right Δ OPT) (2)
Subtracting (1) from (2), we get
25 = 6y – 7 or y = 32/6 = 16/3
Therefore, x^{2} = (16/3)^{2} + 16 = 16/9(16 + 9) = (16 × 25)/9 [From (1)]
or x = 20/3
 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
 7 cm
 12 cm
 15 cm
 24.5 cm
 In Fig. 11, if TP and TQ are the two tangents
to a circle with centre O so that ∠ POQ = 110°,
then ∠ PTQ is equal to
 60°
 70°
 80°
 90°
 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 ∠ POA is equal to
 50°
 60°
 70°
 80°
 Prove that the tangents drawn at the ends of a diameter of a circle are parallel.
 Prove that the perpendicular at the point of contact to the tangent to a circle passes through the centre.
 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.
 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.
 A quadrilateral ABCD is drawn to circumscribe a circle (see Fig. 12). Prove that
AB + CD = AD + BC
 In Fig. 10.13, XY and X′Y′ are two parallel tangents to a circle with centre O and another tangent AB with point of contact C intersecting XY at A and X′Y′ at B. Prove that ∠ AOB = 90°.
 Prove that the angle between the two tangents drawn from an external point to a circle is supplementary to the angle subtended by the linesegment joining the points of contact at the centre.
 Prove that the parallelogram circumscribing a circle is a rhombus.
 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. 14). Find the sides AB
and AC.
AB
AC
 Prove that opposite sides of a quadrilateral circumscribing a circle subtend supplementary angles at the centre of the circle.
Fig. 11
Fig. 12
Fig. 13
Fig. 14
In this chapter, you have studied the following points :
 The meaning of a tangent to a circle.
 The tangent to a circle is perpendicular to the radius through the point of contact.
 The lengths of the two tangents from an external point to a circle are equal.