Which best explains why all equilateral triangles are similar?

All equilateral triangles can be mapped onto each other using dilations.
All equilateral triangles can be mapped onto each other using rigid transformations.
All equilateral triangles can be mapped onto each other using combinations of dilations and rigid transformations.
All equilateral triangles are congruent and therefore similar, with side lengths in a 1:1 ratio.

The answer is C. This is because a equilateral triangle's sides are all equal, meaning any side divided by another has a ratio of 1. That means that you can use dilations to change a triangle into any length and then move them onto each other.

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alokdubeyvidyaatech alokdubeyvidyaatech · Answer 2 · 2022-02-07T14:31:32+01:00

All equilateral triangles can be mapped onto each other using combinations of dilations and rigid transformations.

Option C is the correct answer.

What is the Equilateral Triangle?

The equilateral triangle can be defined as a triangle in which all three sides are equal and three angles are equal i.e 60° each. Median, angle bisector, and altitude are all equal in an equilateral triangle.

All equilateral triangles can be mapped onto each other using combinations of dilations and rigid transformations.

The equilateral triangle has sides that are all equal, it means that the length of all sides is in the ratio of 1:1.

From the given statements, option C is the correct answer.

To know more about the equilateral triangle, follow the link given below.

https://brainly.com/question/4268382.