The perimeters of two similar triangles are 30 cm and 24 cm. If one side of the first triangle is 12 cm, determine the corresponding side of the second triangle.

contexto.140

3 years ago

Suppose, \[\vartriangle ABC\text{ }\sim\text{ }\vartriangle DEF\]

So,

\[AB/DE\text{ }=\text{ }BC/EF\]

\[=\text{ }AC/DF\]

Or,

\[=\text{ }\left( AB+BC+AC \right)/\left( DE+EF+DF \right)\]

\[=\text{ }Perimeter\text{ }of\text{ }\Delta \text{ }ABC/Perimeter\text{ }of\text{ }\Delta \text{ }DEF\]

So,

\[Perimeter\text{ }of\text{ }\Delta \text{ }ABC/Perimeter\text{ }of\text{ }\Delta \text{ }DEF\]

\[=\text{ }AB/DE\]

Hence,

\[30/24\text{ }=\text{ }12/DE\]

\[DE\text{ }=\text{ }9.6\text{ }cm\]