6.14
Touching Circles
Theorem: If two Circles touch each other
internally or externally, the point of contact and the centers of the circles
are collinear.
Data: Two circles with centers A and B each other externally at point P
(Figure 1)) or internally (Figure 2).
To prove: A, B and P are collinear
Construction: Draw the common tangent RPQ at P. Join AP
and BP
Proof: (When circles touch externally)
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Step |
Statement |
Reason |
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1 |
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RQ is
tangent to the circles at P, AP and BP are radii |
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2 |
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From
step 1 |
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3 |
APB is a
straight line |
Angles |
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Proof: (When circles touch internally)
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Step |
Statement |
Reason |
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1 |
AP and
BP are perpendicular to same line RQ |
RQ is
tangent to circles at P, AP and BP are radii |
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2 |
B is a
point on line AP |
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3 |
ABP is a
straight line |
Step 2 |
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6.14
Problem 1: A
straight line drawn through the point of contact of two circles whose centers
are A and B, intersect the circles at P and Q
respectively. Show that AP and BQ are parallel.
In the adjoining figure circles
with origins A and B, touch externally at M. We need to prove that AP || BQ.
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Step |
Statement |
Reason |
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1 |
AM=AP |
Radii
of same circle |
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2 |
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2 sides
are equal |
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3 |
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Vertically
opposite angles |
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4 |
BM=BQ |
Radii
of same circle |
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5 |
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2 sides
are equal |
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6 |
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Steps
2, 3 and 5 |
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7 |
AP ||
BQ |
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6.14
Problem 2: In the
given figure AB is line segment, M is the midpoint of AB. 2 semi circles with
AM and MB as diameters are drawn on the
line AB. A circle with center as O
touches all the three circles.
Prove that the radius of this circle is (1/6)AB
Let the radius of this circle be x :
OR=OP =x, and AB=a
CP = CM= a/4 and
MR=a/2
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Step |
Statement |
Reason |
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1 |
OMC is right angled triangle |
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2 |
OC2 = MC2+OM2 |
Pythagoras theorem on |
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3 |
LHS =
(x+(a/2))2 = x2+ax/2+ (a2/16) |
OC =
OP+PC = x+(a/4) |
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4 |
RHS = (a2/16)+ (a2/4)-ax+ x2 |
MC=a/4, |
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5 |
x2+ax/2+ (a2/16) =(a2/16)+
(a2/4)-ax+ x2 |
Equating LHS and RHS |
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6 |
3ax/2=(a2/4) |
On transformation |
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7 |
x = a/6 |
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6.14 Theorem: The tangents drawn to a circle from an external point are
(i)
Equal
(ii)
Equally
inclined to the line joining the external point and the center
(iii)
Subtend
equal angles at the center
Data: PA and PB are tangents from P to the circle
with origin at O
To Prove
(i)
PA=PB
(ii)
BPO
(iii)
AOP= BOP
Proof:
|
Step |
Statement |
Reason |
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1 |
OA = |
Radii
of same circle |
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2 |
|
PA and
PB are tangents at A and B and AO and BO are radii |
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3 |
OP is
common side of |
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4 |
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SAS
Postulate of Right angled triangle |
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5 |
PA=PB |
Properties
of congruent triangles |
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6 |
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Properties
of congruent triangles |
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7 |
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Properties
of congruent triangles |
6.14
Problem 3: In the figure, XY and PC are common tangents
to 2 touching circles. Prove that XPY = 90
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Step |
Statement |
Reason |
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1 |
CX= CP |
CX and CP are tangents from C |
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2 |
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2 sides are equal |
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3 |
CY =CP |
CY and CP are tangents from C |
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4 |
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2 sides are equal |
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5 |
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Sum of all angles in a triangle |
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6 |
i.e. x0+x0+y0+y0=
1800 |
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7 |
2(x0+y0)= 1800 |
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8 |
i.e. (x0+y0) = |
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6.14
Problem 4:
Tangents PQ and PR are drawn to the circle from an external point P. If PQR = 600 prove that the length of the
chord QR = length of the tangent
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Step |
Statement |
Reason |
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1 |
PQ=PR |
PQ and
PR are tangents from P |
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2 |
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2 sides
are equal |
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3 |
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Given |
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4 |
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Step 2 |
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5 |
PQR is
an equilateral triangle |
All
angles are = 600 |
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6 |
PQ=PR=QR
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6.14
Problem 5: In the
figure PQ and PR are tangents to the circle with Center O. If QPR= 900. Show that PQOR is a square.
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Step |
Statement |
Reason |
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1 |
|
PQ and
PR are tangents from P |
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2 |
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Given |
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3 |
OQ is
parallel to PR |
Corresponding
angles are 900 |
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4 |
3600-900-900-900 |
Property
of quadrilateral |
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5 |
OR is
parallel to QP |
Corresponding
angles are 900 |
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6 |
PQOR is
a parallelogram |
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7 |
PQOR is
a square |
OQ=OR(radii) |
6.14
Problem 6: In the figure, AT and BT are tangents to a
circle with center O. Another tangent PQ is drawn such that TP=TQ.
Show that 
TAB ||| TPQ
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Step |
Statement |
Reason |
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1 |
AT=BT |
TA and
TB are tangents from an external point T |
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2 |
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2 sides
are equal |
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3 |
PT=QT |
TP and
TQ are tangents from an external point T |
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4 |
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2 sides
are equal |
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5 |
1800-
2 |
In |
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6 |
1800-
2 |
In |
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7 |
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Equate
RHS of steps 5, 6 |
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8 |
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Steps
7, 4, 2 |
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9 |
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Triangles
are equiangular |
6.14
Problem 7: In the
given figure, tangents are drawn to the circle from external points A, B and C.
Prove that
1) AP+BQ+CR = BP+CQ+AR and AP+BQ+CR = 1/2 *perimeter of ABC.
2) If AB=AC, prove that BQ=QC
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Step |
Statement |
Reason |
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1 |
PA=AR |
Tangents
to circle from A |
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2 |
BQ=BP |
Tangents
to circle from B |
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3 |
CR=CQ |
Tangents
to circle from C |
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4 |
PA+BQ+CR=AR+BP+CQ |
Addition
of steps 1 to 3 |
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5 |
AB=AP+PB,
BC=BQ+QC, AC=AR+RC |
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6 |
AB+BC+AC
= PA+BQ+CR +AR+BP+CQ |
Addition of step 5 |
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7 |
= 2
(AP+BQ+CR) = Perimeter of |
From
Step 4 |
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Second part |
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8 |
AB=AC |
Given |
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9 |
AP+PB=AR+RC |
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10 |
PB=RC |
Since
AP = AR, Step 1 |
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11 |
BQ=CQ |
Steps 2
and 3 |
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6.14
Problem 8: TP and
TQ are tangents drawn to a circle with O as center.
Show that
1. OT is perpendicular bisector of PQ
2. PTQ =2OPQ
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Step |
Statement |
Reason |
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|
Consider |
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1 |
TP=TQ, |
6.14
Theorem(TP and TQ are tangents) |
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2 |
TR is
common |
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3 |
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SAS
Postulate on congruence |
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4 |
PR=RQ
and |
Corresponding
sides are equal |
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5 |
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Two
equal angles on a straight line |
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Second Part |
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6 |
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Sum of
two angles in a right angled triangle PRT |
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7 |
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PT is
tangent and OP is radius |
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8 |
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Steps 6
and 7 |
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9 |
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Step 1 |
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10 |
= 2 |
Step 8 |
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Note: Above
problem can also be solved by using the properties: OP=OQ and OPT = 900
6.14 Summary of learning
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No |
Points to remember |
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1 |
The
tangents drawn to a circle from an external point are -equal, -equally
inclined to the line joining the external point and circle, -subtend
equal angles at the center. |
Additional Points:
6.14.
Theorem 1: A
tangent at any point on the circle is perpendicular to the radius through that
point.
6.14.
Theorem 2: The
line perpendicular to a radius at its outer end is a tangent to the circle.
Above two theorems can be proved by logical
reasoning (First we make an assumption that the theorem is not true.
Subsequently,
because of a contradiction,
we conclude that our assumption is wrong. Then by logical reasoning we conclude
that theorem is true.)
6.14.Theorem 3: If a chord(AB) and
a tangent(PT) intersect externally, then the product of lengths of the segments
of the chord (PA.PB)
is equal to the square of the length
of the tangent(PT2)from the point of contact(T) to the point of
intersection (P).
Given: PT is
tangent, AB is chord.
To prove: PA.PB = PT2
Construction: Join O to the mid point M of AB, Join OA.
|
Step |
Statement |
Reason |
|
|
1 |
PA = PM-AM |
Construction |
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2 |
PB = PM+MB |
Construction |
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3 |
= PM+AM |
MB=AM(Construction) |
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4 |
PA.PB = (PM-AM)*(PM+AM) |
Product of Steps 1 and 3 |
|
|
5 |
= PM2-AM2 |
Expansion |
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6 |
PM2 = PO2-OM2 |
Pythagoras theorem on |
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7 |
AM2 = AO2-OM2 |
Pythagoras theorem on |
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8 |
PA.PB = PO2 - AO2 |
Substitute results from Step 6 and 7 in Step 5 |
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|
9 |
= PO2-TO2 |
AO=TO(Radii) |
|
|
10 |
PA.PB = PT2 |
Pythagoras theorem on |
6.14. Theorem 4 (Tangent-Secant
theorem or Alternate Segment theorem): The angle between a
tangent (PQ) and a chord (AB)
through the point of contact is equal to
an angle in the alternate segment.
Given: PQ is a tangent at A to the circle with O as center.
AB is a chord.
To prove: If C is a point on a major arc and D is a point
on a minor arc with respect to the chord AB then
BAQ = ACB and PAB = ADB
Construction: Join
|
Step |
Statement |
Reason |
|
|
1 |
|
The line drawn from point of contact to center is
at right angle to the tangent |
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2 |
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Split |
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3 |
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OA= |
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4 |
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Sum of all angles in |
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|
5 |
= 1800 – 2 (900 - |
Step 2 |
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|
6 |
= 2 |
Simplification |
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7 |
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Angles on the same chord AB at center and circle (Refer 6.8.2 Inscribed angle theorem) |
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8 |
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Steps 6 and 7 |
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9 |
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Angles on the straight line |
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10 |
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Opposite angles in a cyclic quadrilateral are
supplementary (Refer 6.9.3) |
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11 |
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Steps 8,9 and 10 |
