How do you prove this triangle to be equilateral?

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How do you prove this triangle to be equilateral?

A circle centre O has 3 points on its circumference, A, B and C, such that ABC is an equilateral triangle. Point D lies on the circumference of the circle such that OD bisects AB. Prove triangle ODA is equilateral.

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Answer 1 · 2018-05-09T05:54:00

see explanation.

Explanation:

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Given that $DeltaABC$ is an equilateral triangle, $=> OA$ bisects $angleBAC, => angleOAB=60/2=30^@$
given that $OD$ bisects chord $AB, => M$ is the midpoint of chord $AB$ ,
recall that the line joining the center of a circle to the midpoint of a chord is perpendicular to the chord,
$=> OM$ is perpendicular to $AB$ ,
$=> angleOMA=90^@, => angleMOA=180-90-30=60^@$
as $OA=OD=r, => angleODA=angleOAD=(180-angleDOA)/2=(180-60)/2=60^@$ ,
As $angleODA=angleOAD=angleDOA=60^@$ ,
$=> DeltaODA$ is equilateral.

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How do you prove this triangle to be equilateral?

A circle centre O has 3 points on its circumference, A, B and C, such that ABC is an equilateral triangle. Point D lies on the circumference of the circle such that OD bisects AB. Prove triangle ODA is equilateral.

1 Answer

Explanation:

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