Not that I can improve upon the comment by o0d3lta0o, but thinking
?out of the box? (interesting allusion) it was not stated the enclosed
area was flat. So if you put the fence round a very tall pinnacle
structure, there is in theory almost no limit to the area enclosed.
And if you *really* want to get extreme, the subject of topology might
argue that it is equally valid to say you have enclosed the area
outside the square. The argument being that if space is indeed
bounded, ie go far enough in one direction and you arrive back from
whence you came, if you enclosed an area half the size of the universe
there would be no difference between the inside and the outside.
If this is a form-work question, it might perhaps be prudent to stick
to o0d3lta0o?s comment. There again.......
Time for my pills.
Best |
