This question may be old, but I couldn't think of an answer.
Say, there are two lists of different lengths, merging at a point; how do we know where the merging point is?
Conditions:
 We don't know the length
 We should parse each list only once.
This question may be old, but I couldn't think of an answer. Say, there are two lists of different lengths, merging at a point; how do we know where the merging point is? Conditions:



If
the following algorithm would be the solution. First, the numbers. Assume the first list is of length
Since we don't know the length, we will calculate Then, we iterate each list and reverse them while iterating! If both iterators reach the merge point at the same time, then we find it out by mere comparing. Otherwise, one pointer will reach the merge point before the other one. After that, when the other iterator reaches the merge point, it won't proceed to the common tail. Instead will go back to the former beginning of the list that had reached mergepoint before! So, before it reaches the end of the changed list (i.e. the former beginning of the other list), he will make The pointer that reached the mergepoint first, will keep iterating, until reaches the end of the list. The number of iterations it made should be calculated and is equal to Then, this pointer iterates back and reverses the lists again. But now it won't go back to the beginning of the list it originally started from! Instead, it will go to the beginning of the other list! The number of iterations it made should be calculated and equal to So we know the following numbers:
From which we determine that
Which solves the problem. 


Pavel's answer requires modification of the lists as well as iterating each list twice. Here's a solution that only requires iterating each list twice (the first time to calculate their length; if the length is given you only need to iterate once). The idea is to ignore the starting entries of the longer list (merge point can't be there), so that the two pointers are an equal distance from the end of the list. Then move them forwards until they merge.
This is asymptotically the same (linear time) as my other answer but probably has smaller constants, so is probably faster. But I think my other answer is cooler. 


The following is by far the greatest of all I have seen  O(N), no counters. I got it during an interview to a candidate S.N. at VisionMap. Make an interating pointer like this: it goes forward every time till the end, and then jumps to the beginning of the opposite list, and so on. Create two of these, pointing to two heads. Advance each of the pointers by 1 every time, until they meet. This will happen after either one or two passes. I still use this question in the interviews  but to see how long it takes someone to understand why this solution works. 


Well, if you know that they will merge: Say you start with:
1) Go through the first list setting each next pointer to NULL. Now you have:
2) Now go through the second list and wait until you see a NULL, that is your merge point. If you can't be sure that they merge you can use a sentinel value for the pointer value, but that isn't as elegant. 


This arguably violates the "parse each list only once" condition, but implement the tortoise and hare algorithm (used to find the merge point and cycle length of a cyclic list) so you start at List A, and when you reach the NULL at the end you pretend it's a pointer to the beginning of list B, thus creating the appearance of a cyclic list. The algorithm will then tell you exactly how far down List A the merge is (the variable 'mu' according to the Wikipedia description). Also, the "lambda" value tells you the length of list B, and if you want, you can work out the length of list A during the algorithm (when you redirect the NULL link). 


If we could iterate lists exactly twice, than I can provide method for determining merge point:



I have tested a merge case on my FC9 x86_64, and print every node address as shown below:
Note becase I had aligned the node structure, so when malloc() a node, the address is aligned w/ 16 bytes, see the least 4 bits. The least bits are 0s, i.e., 0x0 or 000b. So if your are in the same special case (aligned node address) too, you can use these least 4 bits. For example when travel both lists from head to tail, set 1 or 2 of the 4 bits of the visiting node address, that is, set a flag;
Note above flags won't affect the real node address but only your SAVED node pointer value. Once found somebody had set the flag bit(s), then the first found node should be the merge point. after done, you'd restore the node address by clear the flag bits you had set. while an important thing is that you should be careful when iterate (e.g. node = node>next) to do clean. remember you had set flag bits, so do this way
Because this proposal will restore the modified node addresses, it could be considered as "no modification". 


Maybe I am over simplifying this, but simply iterate the smallest list and use the last nodes So, where EDIT: Okay, from the picture you posted, you parse the two lists, the smallest first. With the smallest list you can maintain the references to the following node. Now, when you parse the second list you do a comparison on the reference to find where Reference [i] is the reference at LinkedList[i]>Link. This will give the merge point. Time to explain with pictures (superimpose the values on the picture the OP). You have a linked list (references shown below):
You have a second linked list:
With the merged list, the references would then go as follows:
Therefore, you map the first "smaller" list (as the merged list, which is what we are counting has a length of 4 and the main list 5) Loop through the first list, maintain a reference of references. The list will contain the following references We now go through the second list:
Sure, you maintain a new list of pointers, but thats not outside the specification. However the first list is parsed exactly once, and the second list will only be fully parsed if there is no merge point. Otherwise, it will end sooner (at the merge point). 


this solution iterates each list only once...no modification of list required too..though you may complain about space..
Hope it is a valid solution... 


Here's a solution, computationally quick (iterates each list once) but uses a lot of memory:



You can use a set of Nodes. Iterate through one list and add each Node to the set. Then iterate through the second list and for every iteration, check if the Node exists in the set. If it does, you've found your merge point :) 


Here is naive solution , No neeed to traverse whole lists. if your structured node has three fields like
say you have two heads (head1 and head2) pointing to head of two lists. Traverse both the list at same pace and put the flag =1(visited flag) for that node ,



How about this:



Steps in Java:


