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Question

If two equal chords of a circle intersect, prove that the parts of one chord are separately equal to the parts of the other chord.


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Solution

Step 1: Given information in the question:

AB and CDare two equal chords of a circle with centerO, intersecting each other at M.

To prove:

(i) MB=MCand

(ii) AM=MD

Step 2: Explanation for the given statement

AB is a chord and OEAB from the centerO,

We know the perpendicular from the center to a chord bisects the chord.

We obtain,

AE=12AB

Similarly,

FD=12CD

According to the question,

AB=CD12AB=12CD

So, AE=FD(1)

We know, equal chords are equidistance from the center.

And AB=CD

So, OE=OF

Step 3: Proof of the given conditon

As proved, in right triangles MOE and MOF,

hyp. OE = hyp. OF [Common side]

OM=OMΔMOEΔMOF(byRHS)ME=MF(2)

Subtracting equations (2) from (1), we get

AEME=FDMF

AM=MD [Proved part (ii)]

Again,AB=CD [Given]

And AM=MD [Proved]

ABAM=CDMD [Equals subtracted from equal]

So we get, MB=MC[Proved part (i)]

Hence it is proved that If two equal chords of a circle intersect, then the parts of one chord are separately equal to the parts of the other chord.


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