**Edit**: Dang, **I failed the interview!** :-(

In my over zealous attempt at finding tricks or heuristics to improve upon the "factorize + enumerate divisors + sum them" approach, I failed to note that being 1 modulo 9 was merely a *necessary*, and certainly not a *sufficient* condition for at number (other than 6) to be perfect...

Duh... with on average 1 in 9 even number satisfying this condition, my algorithm would sure find a few too many perfect numbers ;-).

To redeem myself, persist and maintain the suggestion of using the digital root, but only *as a filter*, to avoid the more expensive computation of the factor, in most cases.

*[Original attempt: hall of shame]*

```
If the number is even,<br>
compute its [digital root][1].
if the digital root is 1, the number is perfect, otherwise it isn't.
If the number is odd...
there are no shortcuts, other than...
"Not perfect" if the number is smaller than 10^300
For bigger values, one would then need to run the algorithm described in
the question, possibly with a few twists typically driven by heuristics
that prove that the sum of divisors will be lacking when the number
doesn't have some of the low prime factors.
```

My reason for suggesting the digital root trick for even numbers is that this **can be computed without the help of an arbitrary length arithmetic library** (like GMP). It is also **much less computationally expensive** than the decomposition in prime factors and/or the factorization (2^(p-1) * ((2^p)-1)). Therefore if the interviewer were to be satisfied with a "No perfect" response for odd numbers, the solution would be both very efficient and codable in most computer languages.

[Second and third attempt...]

```
If the number is even,<br>
if it is 6
The number is PERFECT
otherwise compute its [digital root][1].
if the digital root is _not_ 1
The number is NOT PERFECT
else ...,
Compute the prime factors
Enumerate the divisors, sum them
if the sum of these divisor equals the 2 * the number
it is PERFECT
else
it is NOT PERFECT
If the number is odd...
same as previously
```

**On this relatively odd interview question...**

I second *andrewdski*'s comment to another response in this post, that this particular question is rather odd in the context of an interview for a general purpose developer.

As with many interview questions, it can be that the interviewer isn't seeking a particular solution, but rather is providing an opportunity for the candidate to demonstrate his/her ability to articulate the general pros and cons of various approaches. Also, if the candidate is offered an opportunity to look-up generic resources such as MathWorld or Wikipedia prior to responding, this may also be a good test of his/her ability to quickly make sense of the info offered there.

primefactors, but ofallits factors. eg. 28 is perfect because 1 + 2 + 4 + 7 + 14 = 28 (note the 4 and 14 factors). – mjv Jul 4 '11 at 2:42