Lesson 9

Triangle \(A\) has side lengths 2, 3, and 4. Triangle \(B\) has side lengths 4, 5, and 6. Is Triangle \(A\) similar to Triangle \(B\)?

1. Find the side lengths of triangles \(DEF\), \(GHI\), and \(JKL\). Record them in the table.

   triangle	scale factor	length of short side	length of medium side	length of long side
   \(ABC\)	1	4	5	7
   \(DEF\)	2
   \(GHI\)	3
   \(JKL\)	\(\frac{1}{2}\)

2. Your teacher will assign you one of the three columns. For all four triangles, find the quotient of the triangle side lengths assigned to you and record it in the table. What do you notice about the quotients?

   triangle	(long side) \(\div\) (short side)	(long side) \(\div\) (medium side)	(medium side) \(\div\) (short side)
   \(ABC\)	\(\frac{7}{4}\) or 1.75
   \(DEF\)
   \(GHI\)
   \(JKL\)

3. Compare your results with your partners’ and complete your table.

Triangles \(ABC\), \(EFD\), and \(GHI\) are all similar. The side lengths of the triangles all have the same units. Find the unknown side lengths.

 

If two polygons are similar, then the side lengths in one polygon are multiplied by the same scale factor to give the corresponding side lengths in the other polygon.

Here is a table that shows relationships between the short and medium length sides of the small and large triangle.

	small triangle	large triangle
medium side	4	8
short side	3	6
(medium side) \(\div\) (short side)	\(\frac{4}{3}\)	\(\frac{8}{6} = \frac{4}{3}\)

The lengths of the medium side and the short side are in a ratio of \(4:3\). This means that the medium side in each triangle is \(\frac43\) as long as the short side. This is true for all similar polygons; the ratio between two sides in one polygon is the same as the ratio of the corresponding sides in a similar polygon.