Answer:
A) See below.
B) AC = 5
CB = 10
Step-by-step explanation:
Part A
From inspection of the given triangles:
- m∠X = m∠A.
- m∠Y = m∠C = 90°
According to the Angle-Angle Similarity, if any two angles of a triangle are equal to any two angles of another triangle, then the two triangles are similar to each other.
Therefore, the sides of ΔXYZ and ΔACB are in the same ratio.
Tan trigonometric ratio
[tex]\sf \tan(\theta)=\dfrac{O}{A}[/tex]
where:
- θ is the angle.
- O is the side opposite the angle.
- A is the side adjacent the angle.
Therefore, if:
[tex]\sf \tan \angle X=\dfrac{5}{2.5}[/tex]
and ΔACB is a dilation of ΔXYZ by scale factor 2:
[tex]\implies \sf \tan \angle A=\dfrac{2 \cdot 5}{2 \cdot 2.5}=\dfrac{5}{2.5}[/tex]
So the trigonometric ratios of ΔACB and ΔXYZ are the same.
Part B
The side opposite angle X is YZ and the side adjacent angle X is XY.
Using the tan trigonometric ratio and the given value of tan X:
[tex]\implies \sf \tan \angle X=\dfrac{O}{A}=\dfrac{YZ}{XY}=\dfrac{5}{2.5}[/tex]
Therefore:
As ΔACB ~ ΔXYZ and ΔACB is a dilation of ΔXYZ by scale factor 2:
Therefore:
⇒ AC = 2(2.5) = 5
⇒ CB = 2(5) = 10
