Understanding Similarity Ratios in Triangles

A ratio of the corresponding sides of two similar polygons

A measure of the perimeter of a triangle

A ratio of the areas of two triangles

A measure of the difference in angles between two triangles

Their corresponding sides must be equal

Their perimeters must be equal

Their corresponding angles must be congruent

Their areas must be equal

The triangles must be isosceles

The corresponding sides must be in proportion

The triangles must have the same area

The triangles must be equilateral

By measuring the height of the triangles

By reducing the fractions of corresponding sides to the same value

By checking if the sum of the sides is equal

By comparing the angles

1/3

1/2

2/3

3/2

2

1

1/2

3

The triangles have the same area

The second triangle is twice as large as the first

The first triangle is twice as large as the second

The triangles are identical

Only as fractions

Only as decimals

As fractions or as a ratio of two numbers

Only as percentages

1/5

2

1/2

5/10

The ratio of the perimeters

The ratio of the areas

The ratio of the corresponding sides

The ratio of the angles