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Hewwo! ツ


image In the given figure , L and M are the mid-points of two equal chords AB and CD of a circle with centre O. Prove that :
i.

imageOLM =
image OML

ii.
image ALM =
image CML

Hewwo! ツ ♡\underline{ \underline{ \text{Question : }}} In the given figure , L and-example-1
User Eugene Ryabtsev
by
2.6k points

2 Answers

21 votes
21 votes

Answer:

given chord AB=chord CD

L and M are the mid-points of two equal chords AB and CD of a circle

we have

(Equal chords are equidistant from the centre)

In ∆ OLM

OL = OM

<OLM= <OMLbase angles

opposite to equal sides of a A

But <OLA = <OMC(Each = 90°being perpendicular )

On adding

<OLM+<OLA = <OML+<OMC

=<ALM = <CML

User Bernatfortet
by
3.1k points
12 votes
12 votes

Answer:

Given: chord AB=chord CD

L and M are the mid-points of two equal chords AB and CD of a circle

we have

(Equal chords are equidistant from the centre)

In ∆ OLM

OL = OM

<OLM= <OMLbase angles

opposite to equal sides of a A

<OLA = <OMC(Each = 90°being perpendicular) Adding

<OLM+<OLA = <OML+<OMC

<ALM=<CML

Hence proved.

User Spunky
by
3.3k points