# Find all perfect squares that are a permutation of some 300 digits

This was a question that was asked to my friend in a Google interview a while back. He was unable to come up with a solution but ended up bagging the job anyway. Here's the question-

You have been given 300 digits comprising of 100 ones, 100 twos, and 100 threes, now come up with an algorithm that will determine all such numbers which are a perfect square

I tried this for a while but am stumped. Any thoughts on how to go about this ?

-
Must each answer use all of the provided digits, or any subset? –  cheeken Sep 18 '11 at 5:45
I would think it implied that the numbers all have 300 digits. –  Mitch Wheat Sep 18 '11 at 6:02
@cheeken all the 300 digits need to be used for each answer. –  sanz Sep 18 '11 at 17:15
Wow. If we pretend that this isn't a trick question, even just checking whether or not a 300 digit number is a square is a huge problem on its own (SO discussion). On top of that, you would probably need to test an absurd number of permutations. –  AlexQueue Sep 20 '11 at 15:16
@Queequeg: Which is the first clue that there is a trick. –  jason Sep 23 '11 at 4:17

## 2 Answers

``````   printf ("{}\n");
``````

The set in question is empty (the sum of the digits is divisible by 3 but not by 9).

-
To anyone who doesn't understand why: If the sum of the digits is divisible by 3, the number is divisible by 3. Same applies to 9. Since the sum of the digits is divisible by 3 but not 9, the number is a multiple of 3 but not 9. A perfect square can't have exactly one factor of 3. –  Mysticial Sep 18 '11 at 5:49
+1. Nice answer. –  Mitch Wheat Sep 18 '11 at 5:51
Whoa... I was not expecting that... –  quasiverse Sep 18 '11 at 5:52

n.m's answer is of course great.

It is also easy to see that the only number that can have its square have last digit among {1,2,3} is a number starting with unit digit as 9. Now, if we use 9 as the last digit of a number that would square to one of the combinations, we will soon see that there is no 10's digit along with 9 at unit digit that can give a number involving {1,2,3} in the 10th digit of its square.

Probably, this explanation answers a question like "does any combination of 300 digits with 1,2 and 3 have a square root"?

-
latest digit can be 1. –  Saeed Amiri Mar 29 '12 at 0:35