Answer:
The actual elevation angle is 12.87 degrees
Explanation:
In the attachment you can clearly see the situation. The angle of elevation as seen for the scuba diver is shown in magenta, we conclude that [tex]\theta_2=90-43=47[/tex].
Using Snell's Law we can write:
[tex]n_1\sin(\theta_1)=n_2\sin(\theta_2)[/tex]
[tex]\implies \sin(\theta_1)=\frac{n_2}{n_1}\sin(\theta_2)[/tex],
Let's approximate the index of refraction of the air (medium 1 in the picture) to 1.
We thus have:
[tex]\sin(\theta_1)=n_2\sin(\theta_2)=1.333\sin(47)[/tex]
[tex]\implies\theta_1=\arcsin[n_2\sin(\theta_2)]=\arcsin[1.333\sin(47)]\approx 77.13[/tex]. Calling [tex]\alpha[/tex] the actual angle of elevation, we get from the picture that [tex]\alpha=90-77.13=12.97[/tex]
