Let's draw a picture of our triangle:
We know that the larger acute angle is always in front of the large leg (denoted by x). So, we can relate the unknown angle with the shorter leg and the hypotenuse by means of the cosine function, that is,
[tex]\cos \theta=\frac{\text{ adjancent leg to theta}}{\text{hypotenuse}}=\frac{2\sqrt[]{6}}{2\sqrt[]{15}}[/tex]
which gives
[tex]\begin{gathered} \cos \theta=\frac{\sqrt[]{6}}{\sqrt[]{15}}=\frac{\sqrt[]{2\times3}}{\sqrt[]{5\times3}} \\ \cos \theta=\frac{\sqrt[]{2}}{\sqrt[]{5}} \end{gathered}[/tex]
Then, we have
[tex]\cos \theta=0.632455[/tex]
Now, by applying the respective inverse function, we have
[tex]\theta=\cos ^{-1}(0.632455)[/tex]
which gives
[tex]\theta=50.768[/tex]
Therefore, by rounding the nearest tenth, the answer is 50.8 degrees
