Answer: option d
Step-by-step explanation:
Remember the identity:
[tex]tan\alpha=\frac{opposite}{adjacent}[/tex]
The inverse of the tangent function is arctangent. You need to use this to calculate the angle "S":
[tex]\alpha =arctan(\frac{opposite}{adjacent})[/tex]
Knowing that: you need to find the measure of the angle "S" , [tex]r=20.5[/tex] (which is the adjacent side) and [tex]s=34.2[/tex] (which is the opposite side), you can sustitute values into [tex]\alpha =arctan(\frac{opposite}{adjacent})[/tex]
Then, you get that the measure of "S" rounded to the nearest tenth is:
[tex]S=arctan(\frac{34.2}{20.5})\\\\S=59.1\°[/tex]
