Given a binary tree which is huge and can not be placed in memory, how do you check if the tree is a mirror image.
I got this as an interview question

I can't take full credit for this reply of course; a handful of my colleagues helped with some assumptions and for poking holes in my original idea. Much thanks to them! Assumptions
ApproachWe know how many nodes on each level we should expect when we're reading from disk  some multiple of 2^{k}. We can establish a double loop to iterate over the total depth of the tree, and the count of the nodes in each level. Inside of this, we can simply compare the outermost values for equivalence, and shortcircuit if we find an unequal value. We can determine the location of each outer location by using multiples of 2^{k}. The leftmost child of any level will always be 2^{k}, and the rightmost child of any level will always be 2^{k+1}1. Small Proof: Outermost nodes on level 1 are 2 and 3; 2^{1} = 2, 2^{1+1}1 = 2^{2}1 = 3. Outermost nodes on level 2 are 4 and 7; 2^{2} = 4, 2^{2+1}1 = 2^{3}1 = 7. One could expand this all the way to the nth case. Pseudocode
ThoughtsThis sort of question is a great interview question because, more than likely, they want to see how you would approach this problem. This approach may be horrible, it may be immaculate, but an employer would want you to take your time, draw things on a piece of paper or whiteboard, and ask them questions about how the data is stored, how it can be read, what limitations there are on seeks, etc etc. It's not the coding aspect that interviewers are interested in, but the problem solving aspect. 


Recursion is easy.


