Q: Who is the greatest mathematician of all ages better known by his theorem on the relationship between the sides of the triangles?

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They are both triangles. And both have acute angles

if any two angles are similar the triangle will be similar

Corresponding sides are congruent with one another, meaning they have the same length/measurement

The sum of the squares of the lengths of the two shortest sides is equal to the square of the longest side.

The Greek mathematician Archimedes was the first to approach the subject mathematically. He came to the conclusion that pi (the constant that was at the center of the relationship) had a value somewhere between 223/71 en 22/7. The average was 3,141851. Pretty close. Later a Chinese mathematician called Liu Hui came even closer with a better approximation.

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They are both triangles. And both have acute angles

Circles and triangles are geometric shapes with distinct properties, but they can be related through various geometric principles. For example, a circle can be inscribed in a triangle or a triangle can be inscribed in a circle. Additionally, the circumcircle of a triangle is a circle that passes through all three vertices of the triangle. These relationships demonstrate the interconnected nature of geometric shapes and the principles that govern their properties.

Archimedes, a Greek mathematician.

i don't know that is why i asked you

The Pythagorean theorem that was created by a mathematician named Pythagoras is still in use today. It helps us find the relationship between right triangles. (a2+b2=c2) Sorry, I only got one influence, I'm trying to find more!

The two acute angles are always equal.

if any two angles are similar the triangle will be similar

Corresponding sides are congruent with one another, meaning they have the same length/measurement

The sum of the squares of the lengths of the two shortest sides is equal to the square of the longest side.

The Greek mathematician Archimedes was the first to approach the subject mathematically. He came to the conclusion that pi (the constant that was at the center of the relationship) had a value somewhere between 223/71 en 22/7. The average was 3,141851. Pretty close. Later a Chinese mathematician called Liu Hui came even closer with a better approximation.

Pythagoras proved it, but it may well have been discovered and used before his time.

Their greatest common factor is 27