We have had some answers to this problem, but we think that there are more convincing solutions out there.

Ling Xiang Ning, aged 13, of Raffles Institution in Singapore, found two solutions, and after trying some more values of x, decided that there would be no more.

Vassil Vassilev, who is in year 11 at Lawnswood High School in Leeds, used a graph to convince himself that there were no more solutions. First of all, he rearranged the equation: Next he calculated values of x ^(2/x) for values of x from 1 to 8, and plotted this graph:

Vassil commented that by looking at the original equation we could rule out negative values of x, and that the values in the graph decline after x=4. The justification for the decline is that we are calculating smaller and smaller powers. However, you may not be convinced, as the number we are finding powers of is getting bigger. Are you sure that curve isn't going to go up again further along?

The use of a graph to justify there being only 2 solutions was a good idea. Can anyone find another way of graphing that makes a more convincing argument?