Answer:
The length of WX is 14.0 feet.
Step-by-step explanation:
Consider the right angled triangle VXW below.
According to the trigonometry identities for a right angled triangle the tangent of an angle is the ration of the perpendicular height to the base length.
[tex]tan\ \theta=\frac{P}{B}[/tex]
In this case the measure of angle θ is 31°.
The perpendicular is, XV = 8.4 feet.
The base is, WX.
Compute the value of WX as follows:
[tex]tan\ 31^{o}=\frac{XV}{WX}\\\\0.601=\frac{8.4}{WX}\\\\WX=\frac{8.4}{0.601}\\\\WX=13.97671\\\\WX\approx14.0[/tex]
Thus, the length of WX is 14.0 feet.
