PLEASE NOTE THAT THIS IS HOMEWORK! --> I am not looking for direct code examples, but rather some gentle massaging of my reasoning...
I have been asked to write a function that removes the root of a binary search tree by doing three things: i) rotating the tree to the right ii) removing the root of the right subtree (Which was the original bst root) iii) rebuilding the bst with the new root (which was the left of the original tree) and the appropriate rearrangements of the children of that node... Here's what I have:
(define (rm-root my-bst) (list (key (rot-r my-bst)) (left (rot-r my-bst)) (append (right (right (rot-r my-bst))) (left (right (rot-r my-bst))))))
Which is all great, expect for that it doesn't rebuild the tree with the children of the node that was "promoted" to the root node. Can anyone help me think about how I should go about implementing that? I should mention that we have defined Bst's as lists and that the function rot-r rotates the bst to the right. Thank you.