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all the angles measure up to be the same

Two segments that are both congruent to a third segment must be congruent to each other

All of the radii of a circle are congruent

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That and two segments that are both congruent

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Q: What are reasons used to proof that the equilateral triangle construction actually constructs an equilateral triangle?

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The answer to this question is Two segments that are both congruent to a third segment must be congruent to each other All of the radii of a circle are congruent You're welcome.

equilateral triangle ;)

An equilateral triangle has three sides of equal length. The sum of the three internal angles (60o each) equals 180o

No, an equilateral triangle has to be equiangular, but an equiangular triangle does NOT have to be equilateral

Are isosceles triangle sometimes an equilateral triangle

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The following is the answer.

An equilateral triangle is a regular polygon because it has 3 equal sides and 3 equal 60 degree angles that add up to 180 degrees.

The answer to this question is Two segments that are both congruent to a third segment must be congruent to each other All of the radii of a circle are congruent You're welcome.

equilateral triangle ;)

An equilateral triangle has three sides of equal length. The sum of the three internal angles (60o each) equals 180o

Draw a base of the required length.

The question isn't clear.

No, an equilateral triangle has to be equiangular, but an equiangular triangle does NOT have to be equilateral

A triangle is the same as a equilateral triangle because a equilateral triangle is a triangle but it is congruent on all sides

An oxymoron. An equilateral triangle cannot be obtuse; an obtuse triangle cannot be equilateral.

there is not one because a equilateral triangle is one triangle so the ansew is equilateral triangle

Are isosceles triangle sometimes an equilateral triangle