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"if a triangle is an equilateral triangle" is a conditional clause, it is not a statement. There cannot be an inverse statement.

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Q: What is an inverse statement of if a triangle is an equilateral triangle?
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Related questions

What is the contrapositive of the statement if it is an equilateral triangle then it is an isosceles triangle?

The contrapositive would be: If it is not an isosceles triangle then it is not an equilateral triangle.


What is the statement if it is an equilateral triangle then it is isosceles?

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Figure B. equilateral triangle (small circle) inside of isosceles triangle (big cirlce)


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Then it would be a false statement because an isosceles and an equilateral triangle have different geometrical properties as in regards to the lengths of their sides.


If a triangle is equilateral then it is isosceles What is the converse of the statement?

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Does a equiangular triangle have to be equilateral?

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