Note that this solution is not recommended.

Upon pure observation, it is obvious that one solution to this equality is <math>x=\sqrt{2}</math>. From this, we can deduce that this equality has two solutions, since <math>\sqrt{2}^(2^x)</math> grows faster than <math>x^(2^\sqrt{2})</math> (for greater values of <math>x</math>) and <math>\sqrt{2}^(2^x)</math> is greater than <math>x^(2^\sqrt{2})</math> for <math>x<\sqrt{2}</math> and less than <math>x^(2^\sqrt{2})</math> for <math>\sqrt{2}<x<n</math>, where <math>n</math> is the second solution. Thus, the answer cannot be <math>A</math> or <math>B</math>. We then start plugging in numbers to roughly approximate the answer. When <math>x=2</math>, <math>x^(2^\sqrt{2})>\sqrt{2}^(2^x)</math>, thus the answer cannot be <math>C</math>. Then, when <math>x=4</math>, <math>x^(2^\sqrt{2})=4^(2^\sqrt{2})<64<\sqrt{2}^(2^x)=256</math>. Therefore, <math>S<4+\sqrt{2}<6</math>, so the answer is <math>\boxed{D}</math>.