Imagine you define that a tree should be shown in the following manner, e.g.:
"<1#<<2#3>#<4#5>>>". Folding such a tree means replacing each branch node with an actual supplied operation to be performed on the results of fold recursively performed on the data type's constituents (here, the node's two child nodes, which are themselves, each, a tree), for example with
So, for leaves you should just take the values inside them, and for branches, recursively apply the fold for each of the two, and combine the two results with the supplied function, the one with which the tree is folded. (edit:) When "taking" values from leaves, you could additionally transform them, applying a unary function. So in general, your folding will need two user-provided functions, one for leaves, and another one for combining the results of recursively folding the consituents of branches.
Your tree data type could have been defined differently, e.g. with possibly empty leaves, and with internal nodes also carrying the values. Then you'd have to provide a default value to be used instead of empty leaf nodes, and a three-way combination operation.
Another distinction to realize here is, what you fold, and how you fold it. I.e. you could fold your tree in a linear fashion,
(1+(2+(3+(4+5)))), or you could fold a linear list in a tree-like fashion. It is all about how you parenthesize the resulting "expression". Of course in the classic take on folding the exression's structure follows that of the data structure being folded; but variations do exist. Note also, that the combining operation might not be strict, and it might consume/produce compound as well as atomic values.