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Similar triangles provide the basis for many synthetic (without the use of coordinates) proofs in Euclidean geometry. Among the elementary results that can be proved this way are: the angle bisector theorem , the geometric mean theorem , Ceva's theorem , Menelaus's theorem and the Pythagorean theorem .
Proof using similar triangles. This proof is based on the proportionality of the sides of three similar triangles, that is, upon the fact that the ratio of any two corresponding sides of similar triangles is the same regardless of the size of the triangles. Let ABC represent a right triangle, with the right angle located at C, as shown on the ...
In Euclidean geometry, the AA postulate states that two triangles are similar if they have two corresponding angles congruent. The AA postulate follows from the fact that the sum of the interior angles of a triangle is always equal to 180°. By knowing two angles, such as 32° and 64° degrees, we know that the next angle is 84°, because 180 ...
Arranging two similar triangles, so that the intercept theorem can be applied The intercept theorem is closely related to similarity . It is equivalent to the concept of similar triangles , i.e. it can be used to prove the properties of similar triangles and similar triangles can be used to prove the intercept theorem.
2.2 Proof by similarity of triangles. 2.3 Proof by trigonometric identities. 2.4 Proof by inversion. ... Proof: Follows immediately from Ptolemy's theorem:
As shown in the accompanying animation, the theorem can be proved using similar triangles. In the version illustrated here, the triangle A B C {\displaystyle \triangle ABC} gets reflected across a line that is perpendicular to the angle bisector A D {\displaystyle AD} , resulting in the triangle A B 2 C 2 {\displaystyle \triangle AB_{2}C_{2 ...
A spiral similarity taking triangle ABC to triangle A'B'C'. Spiral similarity is a plane transformation in mathematics composed of a rotation and a dilation. [1] It is used widely in Euclidean geometry to facilitate the proofs of many theorems and other results in geometry, especially in mathematical competitions and olympiads.
Figure 1: The point O is an external homothetic center for the two triangles. The size of each figure is proportional to its distance from the homothetic center. In geometry, a homothetic center (also called a center of similarity or a center of similitude) is a point from which at least two geometrically similar figures can be seen as a dilation or contraction of one another.