Ok, considering that we have an angle, the measure of the adjacent leg, and we need to find the measure opposite leg. The most appropriate trigonometric ratio would be the tangent:
[tex]\tan (x)=\frac{opposite}{\text{adjacent}}[/tex]Replacing, we get:
[tex]\tan (32)=\frac{PX}{175}[/tex]Clearing PX:
[tex]PX=\tan (32)\cdot175[/tex]And operating:
[tex]PX\cong109.35[/tex]The distance PX is aproximately 109.35 meters.
