Saturday, 11 May 2024

Theorem 25.1- One and only one circle can pass through three non-collinear points

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Unit 25: Chords Of A Circle

Theorem 25.1:
One and only one circle can pass through three non-collinear points.

Given:
Three non-collinear points. say A, B and C.

To Prove:
One and only one circle can pass through A, B and C.

Construction:
Draw line segments AB and BC. Draw right bisectors <ED> and <GF> of AB and BC, respectively. <ED> and <GF> intersect at a point, say O. Draw OA,  OB and OC.

Proof:

Statemnets Reasons
 All points on <ED> are equidistant from A and B, so mOA = mOB ......... (i)

 <ED> is the right bisector of AB, and O is a point on <ED>.

 All points on <GF> are equidistant from B and C, so mOB = mOC ......... (ii)

 <GF> is the right bisector of BC, and <GF> passess though O.

 O is the unique point of intersection of <ED> and <GF> ....... (iii)

 <ED> and <GF> are non-parallel lines.
 The paint O is equidistant from A, B and C, i.e.
 mOA = mOB = mOC = r, say ...... (iv)

 From (i) and (ii)

 Transitive property

 The circle with centre only at O and radius r passes through A, B and C ...... (v) OA, OB and OC are radial segment, and by (iii)
 A, B and C are non collinear ..... (vi) Given
 Therefore, there exists one and only one From circle centered at O and with radius r passing through non-collinear points A, B and C.  From (iii), (iv), (v) and (vi)
Q.E.D

Text Book - Page No. 196 and 197.

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