Unraveling the Mysteries of Circles: A Journey Through Geometry
Are you ready to explore the fascinating world of Circles? This essential chapter from the Class 10 NCERT syllabus introduces us to a fundamental concept seen all around us—from the wheels of vehicles to the planets in orbit. Understanding circles helps us unlock the deeper connections between geometry and the real world. In this blog, we'll delve into key concepts such as tangents, theorems, and properties, while uncovering how circles form the foundation of more advanced mathematical ideas. Let’s embark on this geometrical journey and discover the elegance and power of circles!
EXERCISE 10.2
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
Solution:
1) QT is the tangent to the circle with center O at point T and QT = 24 cm.
2) OQ = 25 cm.
3) Let the radius OT be x cm.
4) In ∆ OTQ, by the theorem of Pythagoras, we get,
(OT)2 + (QT)2 = (OQ)2
(OT)2 = (OQ)2 – (QT)2
(OT)2 = (25)2 – (24)2
(OT)2 = (25 – 24) (25 + 24)
(OT)2 = 1(49)
(OT)2 = 49
OT = √49
OT = 7
5) Therefore, answer is (A), OT = 7 cm.
with centre O so that ∠ POQ = 110°, then ∠ PTQ is equal to
(A) 60° (B) 70° (C) 80° (D) 90°
Solution:
1) TQ and TP are the tangents to the circle with center O at points Q and P.
2) ∠ POQ = 110°.
3) In □ OPTQ,
∠ OQT = 90°
∠ OPT = 90°∠ PTQ + ∠ POQ = 180°
∠ PTQ + 110° = 180°
∠ PTQ = 180° – 110°
∠ PTQ = 70°
4) Therefore, answer is (B), ∠ PTQ = 70°.
3. If tangents PA and PB from point P to a circle with centre O are inclined to each other at an angle of 80°, then ∠ POA is equal to
(A) 50° (B) 60° (C) 70° (D) 80°
Solution:
1) PA and PB are the tangents to the circle with center O at points A and B.
2) ∠ APB = 80°.
3) In ∆ POA and ∆ POB,
2) ∠ APB = 80°.
3) In ∆ POA and ∆ POB,
∠ PAO = ∠ PBO = 90°.
OA = OB radii of the same circle.
OP = OP common side of ∆ POA and ∆ POB.
∆ POA ≅ ∆ POB by Hypotenuse-side theorem -------- 1
4) From 1, using CACT, we have,
∠ OPA = ∠ OPB ------------- 2∠ OPA + ∠ OPB = 80° ------------- 3 Given
5) From 2 and 3, we have,
∠ OPA + ∠ OPB = 80°
∠ OPA + ∠ OPBA = 80°
2 ∠ OPA = 80°
∠ OPA = 40° ------------- 4
6) In ∆ POA and From 4, we have,
∠ POA + ∠ OPA = 90°∠ POA + 40° = 90°∠ POA = 90° – 40°∠ POA = 50°
7) Therefore, answer is (A), ∠ POA = 50°.
parallel.
1) AB and CD are the tangents to the circle with center O at points P and Q.
2) OQ ⊥ tangent CD and OP ⊥ tangent AB.
3) PQ is the diameter of a circle with center O.
4) So,
∠ OQC = 90°
∠ OPB = 90°
5) Here,line PQ is the transversal on the line AB and line CD, so ∠ OQC
and ∠ OPB are alternate interior angles.
6) As, alternate interior angles ∠ OQC = ∠ OPB, line AB and line CD are
parallel. Hence proved.
circle passes through the centre.
1) A tangent AB touching the circle at point P.2) We know that the tangent of a circle is ⊥ to radius at point of contact,
therefore,
OP ⊥ tangent AB.∠ OPA = 90° ----------------- equation 1
3) Now let us cosider that, QP ⊥ AB, so we have,
∠ QPA = 90° ----------------- equation 2
4) From equations 1 and 2, we can say that.
∠ OPA = ∠ QPA = 90°, is possible only if line QP passes through O.
5) So, the perpendicular at the point of contact to the tangent to acircle passes through the centre is proved.
of the circle is 4 cm. Find the radius of the circle.
Solution:
1) QT is the tangent to the circle with center O at point T and QT = 4 cm.
2) OQ = 5 cm.
3) Let the radius OT be x cm.
4) In ∆ OTQ, by the theorem of Pythagoras, we get,(OT)2 + (QT)2 = (OQ)2(OT)2 = (OQ)2 – (QT)2(OT)2 = (5)2 – (4)2(OT)2 = (5 – 4) (5 + 4)(OT)2 = 1(9)(OT)2 = 9OT = √9OT = 35) Radius of a circle OT = 3 cm.
chord of the larger circle which touches the smaller circle.
Solution:
1) The chord AB of larger circle touches the smaller circle at P.
2) OP = 3 cm and OB = 5 cm.
3) In ∆ OPB, by the theorem of Pythagoras, we get,(OP)2 + (PB)2 = (OB)2(PB)2 = (OB)2 – (PB)2(PB)2 = (5)2 – (3)2(PB)2 = (5 – 3) (5 + 3)(PB)2 = 2(8)(PB)2 = 2 x 2 (4)PB = √(4 x 4)PB = 44) Length of the chord of the larger circle AB = 2 x PB = 2 x 4 = 8 cm.
Prove that AB + CD = AD + BC.
Solution:
1) AB, BC, CD, and DA are tangents to the circle touching at points P, Q, R,
and S respectively.
2) As, the lengths of tangents drawn from an external point to a circle are
equal, we have,
AP = AS ------------- equation 1
BP = BQ ------------- equation 2
CR = CQ ------------- equation 3
DR = DS ------------- equation 4
3) Adding equations 1, 2, 3, and 4, we get,
AP + BP + CR + DR = AS + BQ + CQ + DS ------------- equation 5
4) Rearranging the terms of equation 5, we get,
(AP + BP) + (CR + DR) = (AS + DS) + (BQ + CQ)
(AB) + (CD) = (AD) + (BC)
5) So, AB + CD = AD + BC is proved.
centre O and another tangent AB with point of contact C intersecting XY at A and X’Y’ at B. Prove that ∠ AOB = 90°.
Solution:
1) XY and X’Y’ are two parallel tangents to a circle with centre O, touching at
points P and Q respectively.
2) AB is another tangent at C to the circle and intersects XY at A and X'Y' at B.
3) In ∆ AOP and ∆ AOC,
a) Tangents are ⊥ to the radii of a circle.
∠ OPA = ∠ OCA = 90° --------------- equation 1
b) As, the lengths of tangents drawn from an external point to a circle areequal, we have,
AP = AC --------------- equation 2
c) Common side
AO = AO --------------- equation 3
4) From equation 1, 2, 3, and hypotenuse-side theorem we have,
∆ AOP ≅ ∆ AOC
5) So, using CPCT we have,
∠ POA = ∠ COA --------------- equation 4
∠ POC = ∠ POA + ∠ COA --------------- equation 5
6) From equation 4, and 5, we have
∠ POC = ∠ POA + ∠ COA
∠ POC = ∠ COA + ∠ COA
∠ POC = 2 ∠ COA --------------- equation 6
7) In the same way, we can prove that,
∠ QOC = 2 ∠ COB --------------- equation 7
8) Adding equations 6, and 7, we get,
2 ∠ COA + 2 ∠ COB = ∠ POC + ∠ QOC
2 ∠ COA + 2 ∠ COB = 180°
2 (∠ AOB) = 180°
∠ AOB = 90°, hence proved.
point to a circle is supplementary to the angle subtended by the line segment joining the points of contact at the centre.
Solution:
1) TQ and TP are the tangents to the circle with center O at points Q and P.
2) ∠ POQ = 110°.
3) In □ OPTQ, as tangents are ⊥ to the radii of a circle,
∠ OQT = 90° ------------- equation 1
∠ OPT = 90° ------------- equation 2
4) In □ OPTQ and from equations 1, and 2,
∠ PTQ + ∠ POQ + ∠ OQT + ∠ OPT = 360°
∠ PTQ + ∠ POQ + 90° + 90° = 360°
∠ PTQ + ∠ POQ + 180° = 360°∠ PTQ + ∠ POQ = 180°
5) ∠ PTQ and ∠ POQ are supplimentary.
Solution:
1) AB, BC, CD, and DA are tangents to the circle touching at points P, Q, R,and S respectively.2) As, the lengths of tangents drawn from an external point to a circle areequal, we have,AP = AS ------------- equation 1BP = BQ ------------- equation 2CR = CQ ------------- equation 3DR = DS ------------- equation 43) Adding equations 1, 2, 3, and 4, we get,AP + BP + CR + DR = AS + BQ + CQ + DS ------------- equation 54) Rearranging the terms of equation 5, we get,(AP + BP) + (CR + DR) = (AS + DS) + (BQ + CQ)(AB) + (CD) = (AD) + (BC) ------------- equation 6
5) As, ABCD is parallelogram, we have,
CD = AB ------------- equation 7
BC = AD ------------- equation 8
6) From equations 6, 7, and 8, we have
(AB) + (CD) = (AD) + (BC)
(AB) + (AB) = (AD) + (AD)
2(AB) = 2(AD)
AB = AD ------------- equation 9
7) From equations 7, 8, and 9, we can say that all the sides of the
parallelogram are equal, so ABCD is the rhombus. Hence proved.
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 the following fig.). Find the sides AB and AC.
Solution:
1) AB, BC, and CA are tangents to the circle touching at points E, D, F.2) As, the lengths of tangents drawn from an external point to a circle areequal, we have,CD = CF = 6BD = BE = 8AE = AF = x3) So, we have,
a = BC = 8 + 6 = 14 ------------- equation 1
b = CA = (x + 6) ------------- equation 2
c = AB = (x + 8) ------------- equation 3
4) So, we have,
s = (a + b + c)/2s = (14 + x + 6 + x + 8)/2s = (2x + 14 + 6 + 8)/2s = (x + 7 + 3 + 4)s = (x + 14)
5) Using Heron's formula, we have,
A△(ABC) = √[s(s – a)(s – b)(s – c)]A△(ABC) = √[(x + 14)(x + 14 – 14)(x + 14 – x – 6)(x + 14 – x – 8)]A△(ABC) = √[(x + 14)(x)(8)(6)]A△(ABC) = √[48x(x + 14)] ------------- equation 4
6) We know that,
A△(ABC) = A△(AOB) + A△(BOC) + A△(COA)A△(ABC) = [(1/2)x(4)x(c)] + [(1/2)x(14)x(a)] + [(1/2)x(4)x(b)]A△(ABC) = [(1/2)x(4)x(x + 8)] + [(1/2)x(4)x(14)] + [(1/2)x(4)x(x + 6)]A△(ABC) = [(2)x(x + 8)] + [(2)x(14)] + [(2)x(x + 6)]A△(ABC) = 2[(x + 8) + (14) + (x + 6)]A△(ABC) = 2[2x + 8 + 14 + 6]A△(ABC) = 4[x + 4 + 7 + 3]A△(ABC) = 4[x + 14] ------------- equation 5
7) From equation 1, and 2, we have,
√[48x(x + 14)] = 4[x + 14][48x(x + 14)] = 16[x + 14]2[3x(x + 14)] = [x + 14]23x = (x + 14)3x – x = 142x = 14x = 7 ------------- equation 6
8) Put x = 7 from equation 6 in euations 2 and 3, we have,
b = CA = (x + 6)
b = CA = (7 + 6)
b = CA = 13 ------------- equation 7
c = AB = (x + 8)
c = AB = (7 + 8)
c = AB = 15 ------------- equation 8
9) From equations 7, 8,
CA = 13 cm and AB = 15 cm.
subtend supplementary angles at the centre of the circle.
Solution:
1) AB, BC, CD, and DA are tangents to the circle touching at points P, Q, R,and S respectively.2) ∆ AOP and ∆ AOS, we have,
AP = AS ------------- tangent segments are same,OA = OA ------------- common side of two triangles,OP = OS ------------- radii of the same circle.
3) Using sss theorem, we have,
∆ AOP ≅ ∆ AOS ------------- by CPCT are equal, we have,
∠ a = ∠ h ------------- equation 1
4) Simillarly, we get,
∠ g = ∠ f ------------- equation 2
∠ e = ∠ d ------------- equation 3
∠ c = ∠ b ------------- equation 4
5) Adding all central angles, we get
∠ a + ∠ g + ∠ e + ∠ c + ∠ h + ∠ f + ∠ d + ∠ b = 360° ------------- equation 5
6) Rearranging the terms of equation 5, we get,
(∠ a + ∠ h) + (∠ g + ∠ f) + (∠ e + ∠ d) + (∠ c + ∠ b) = 360° ----- equation 6
7) Put ∠ h = ∠ a, ∠ g = ∠ f, ∠ d = ∠ e, ∠ c = ∠ b from 1, 2, 3, and 4, in 6,
(∠ a + ∠ a) + (∠ f + ∠ f) + (∠ e + ∠ e) + (∠ b + ∠ b) = 360°
2 ∠ a + 2 ∠ f + 2 ∠ e + 2 ∠ b = 360°
2 (∠ a + ∠ f + ∠ e + ∠ b) = 360°
(∠ a + ∠ f + ∠ e + ∠ b) = 180°
(∠ a + ∠ b) + (∠ e + ∠ f) = 180°
(∠ AOP + ∠ BOP) + (∠ COR + ∠ DOR) = 180°
(∠ AOB) + (∠ COD) = 180° ------------- equation 7
8) Simillarly, we can prove that,
(∠ AOD) + (∠ BOC) = 180° ------------- equation 8
9) From equations 7, and 8, we can say that,
opposite sides of a quadrilateral subtend supplementary angles at the centre of the circle. Hence proved.
As we conclude this journey into the world of Circles, we realize how this seemingly simple shape holds profound significance in geometry and the real world. From theorems about tangents to understanding radii and chords, circles provide valuable mathematical tools and insights. By mastering the concepts in this chapter, you're not just preparing for exams but also sharpening your problem-solving skills for life.
Remember, the study of circles is not just about formulas and theorems—it's about recognizing the patterns and harmony in the universe around us. Keep practicing, keep exploring, and let the beauty of mathematics guide you forward!
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