Similarity of Triangles

The two triangles are parallel.

The two triangles are similar.

The two triangles are congruent.

The two triangles are perpendicular.

The AA similarity theorem is used to calculate the area of a triangle

The AA similarity theorem is only applicable to right-angled triangles

The AA similarity theorem is used to find the sum of the angles in a triangle

The significance of the AA similarity theorem is that it provides a quick and easy way to determine if two triangles are similar without having to measure all their sides.

The triangles have equal side lengths

The triangles have a common vertex

The triangles are both equilateral

Two angles of one triangle are congruent to two angles of another triangle.

Corresponding angles of similar triangles are equal.

Corresponding angles of similar triangles are not equal.

Corresponding angles of similar triangles are always obtuse.

Corresponding angles of similar triangles are always acute.

Calculating the area of a circle

Solving equations in algebra

The practical applications of the AA similarity theorem include solving problems in geometry, such as determining the similarity of two triangles and finding unknown side lengths or angles.

Determining the boiling point of a substance

By proving that the two triangles have the same area

We can use the AA similarity theorem to prove two triangles similar by showing that two angles of one triangle are congruent to two angles of the other triangle.

By demonstrating that the two triangles have the same perimeter

By showing that two sides of one triangle are congruent to two sides of the other triangle

Area-Area

Apple-Apple

Angle-Angle

Arrow-Arrow