In geometry, Thales' theorem (named after Thales of Miletus) states that if A, B and C are points on a circle where the line AC is a diameter of the circle, then the angle ABC is a right angle.

Table of contents
1 Proof
2 Converse
3 Generalization
4 History
5 See also

Proof

We use the following facts: the sum of the angles in a triangle is equal to two right angles and that the base angles of an isosceles triangle are equal.

Let O be the center of the circle. Since OA = OB = OC, OAB and OBC are isosceles triangles, and by the equality of the base angles of an isosceles triangle, OBC = OCB and BAO = ABO. Let γ = BAO and δ = OBC.

Since the sum of the angles of a right triangle is equal to two right angles, we have

2γ + γ ′ = 180°

and

2δ + δ ′ = 180°

We also know that

γ ′ + δ ′ = 180°

Adding the first two equations and subtracting the third, we obtain

2γ + γ ′ + 2δ + δ ′ − (γ ′ + δ ′) = 180°

which, after cancelling γ ′ and δ ′, implies that

γ + δ = 90°

Q.E.D

Converse

The converse of Thales' theorem is also true. It states that if you have a right triangle and construct a circle with the triangle's hypothenuse as diameter, then the third vertex of the triangle will also lie on the circle.

The theorem and its converse can be expressed as follows:

The center of the circumcircle of a triangle lies on one of the triangle's sides if and only if the triangle is a right triangle.

Generalization

Thales' theorem is a special case of the following theorem: given three points A, B and C on a circle with center O, the angle AOC is twice as large as the angle ABC.

History

Thales was not the first to discover this theorem since the Egyptians and Babylonians must have known of this empirically. However they did not prove the theorem, and the theorem is named after Thales because he was said to have been the first to prove the theorem, using his own results that the base angles of an isosceles triangle are equal, and that the sum of angles in a triangle is equal to two right angles.

See also