Similar triangles sides are in ratio. The length of the line AQ or the value of x is 5 units.
What are Similar triangles?
Two figures are known as similar triangles there the corresponding angles are equal and the corresponding sider is in ratio. It is denoted by the symbol '~'.
We know that in ΔAPQ and ΔABC, the side PQ || BC, while the other two sides are the same sides of the triangle which means,
[tex]\overline{AP} \sim \overline{AB}[/tex]
[tex]\overline{AQ}\sim \overline{AC}[/tex]
therefore, using the SSS(Side-Side-Side) property we can say that the two triangles are similar triangles.
As discussed that the two triangles are equal, therefore, their sides will be in the same ratio.
[tex]\dfrac{AP}{AB} = \dfrac{AQ}{AC}[/tex]
[tex]\dfrac{9}{18+9} = \dfrac{x}{x+10}\\\\\dfrac{9}{27} = \dfrac{x}{x+10}\\\\9x+90 = 27x\\90=27x-9x\\90=18x\\x = 5[/tex]
Hence, the length of the line AQ or the value of x is 5 units.
Learn more about Similar triangles:
https://brainly.com/question/25882965
