Since the triangle has a right angle, we can conclude that the diagram is of a right triangle.
When dealing with right triangles, there are some useful formulas that are known as 'Trigonometric Identities'. There are a lot of them but we will need only one of those to solve the problem, that's the equation below:
[tex]\tan (\theta)=\frac{O}{A}[/tex]
Where θ is the angle, O is the length of the opposite side to the angle, and A the adjacent side to the angle.
Therefore, in the case of our problem,
[tex]\begin{gathered} \theta=x,O=30ft,A=12ft \\ \Rightarrow\tan (x)=\frac{30}{12}=2.5 \end{gathered}[/tex]
Solving for x, we get
[tex]x=\tan ^{-1}(2.5)=1.1902\text{rad}[/tex]
And we can transform radians into degrees,
[tex]\Rightarrow x\approx68.2[/tex]
Thus, the answer is the third option. 68.2°
