Alison and Anne of St John's Primary
School sent us in their answers:
They also explained what they thought
would limit the number of possible paths.
There are only two $27$ squares, but there are three of every
other square apart from $30$, so if you want different paths to
have every square apart from $30$ different, you can only have
two because there are only two $27$s. If it is okay to have more
than just the $30$ the same, then it is still the $27$s that will
limit the number of paths that is possible.
And Jamie, aged 7, told us:
You do not need to find paths for the pumpkin people to take to
catch Froggie, because any path she takes they can take and any
path she can't take they can't take, they just go in the opposite
direction. This is because counting down in threes gives you the
same numbers as counting up in threes just in the opposite
order
Thank you very much, Jamie, Alison and
Anne!