Are the triangles similar? if so what is the scale factor?

Question

asked Jan 4, 2023 13.7k views

1 Answer

Nithin Viswanathan · Answer 1 · 2023-01-09T03:41:58+0000

a) Yes, The scale factor is 3/2

Step-by-step explanation

Step 1

to check if the triangles are similar, we need to prove that the ratios of the longest side and one sideof the triangle are similar

so

let

$ratio=\frac{longest\text{ side}}{side}$

hence

$\begin{gathered} ratio_1=(8)/(5)=1.6 \\ ratio_2=(12)/(7.5)=1.6 \end{gathered}$

therefore, the triangles are similar

Step 2

now, to find the scale factor we use the formula

$scale\text{ factor =}\frac{final\text{ length }}{original\text{ length}}$

so, let's take the longest side on each triangle

$\begin{gathered} final\text{ length=12} \\ original\text{ length=8} \end{gathered}$

replace and calculate

$\begin{gathered} scale\text{ factor =}\frac{final\text{ length }}{original\text{ length}} \\ scale\text{ factor =}(12)/(8)=(3)/(2) \end{gathered}$

therefore, the answer is

a) Yes, The scale factor is 3/2

I hope this helps you