# hash function confusion [closed]

Anyone know how to start this problem? I mean, I understand what a hash does, but I have no idea what this quesiton is talking about.

Given:

• the hash function: h(x) = | 2x + 5 | mod M
• a bucket array of capacity N
• a set of objects with keys: 12, 44, 13, 88, 23, 94, 11, 39, 20, 16, 5 (to input from left to right)

4.a [5 pts] Write the hash table where M=N=11 and collisions are handled using separate chaining.

4.b [5 pts] Write the hash table where M=N=11 and collisions are handled using linear probing.

4.c [5 pts] If M=11 can you find a value of N that generates no collisions hashing those keys?

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## closed as off-topic by Matt Ball, joran, madth3, Sindre Sorhus, BlorgbeardAug 22 '13 at 1:32

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Use the equation h(x) to find the hash value of each key. This is the location in the array where the value is stored. Since, this is clearly homework, I won't explain linear probing or separate chaining or 4c.

M is the size of the array that you put the values in.

N is the number of objects that you're hashing.

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• You have a function which given a number (x) determines where that should go in a table.
• The table has a given size, N. In the case of parts a and b of this question N is 11.
• M is 11 for questions a, b and c. M is just a value which is plugged into the given formula `h(x) = (2x + 5) mod M`
• So given the number 12, `h(12) = (2 * 12 + 5) mod 11` => 7. So the first result goes into bucket 7.
• You then work your way through the rest of the numbers in turn, working out what h(x) is for each.
• However, when you come to a collision (i.e. a scenario where the bucket which the number should go in has already been filled by a previous number) you need to select a different bucket for it. Which bucked you select will depend on your overflow strategy.
• in question A your overflow strategy is separate chaining
• in question B your overflow strategy is linear probing
• if you're unfamiliar with these methods, watch these:
• If C is taken as read I assume it means that take the numbers from the start of the list until you hit the first collision; however many numbers you already have in your bucket is the value for N.
• However, I believe question C I believe is a misprint. I think it wants you to find a value for M which would allow the given list of numbers to all be assigned to a unique bucket (i.e. no collisions / no overflow strategy).
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Regarding my last 2 points I'd encourage input from others; I may have got the wrong end of the stick as that question seems wrong to me, which may just be me. –  JohnLBevan Dec 7 '12 at 23:51
Second question: Yes, like in PacMan if you go off one side you come back on the other. That's actually the reason for the MOD function in the formula. If you do `x mod 5` and pass it numbers 0,1,2,3,4,5,6,7 you get 0,1,2,3,4,0,1,2. –  JohnLBevan Dec 8 '12 at 12:03