Most Efficient Way to Find All the Factors of a Number?

Disclaimer: There are similar questions to this one on SO, however they all either don't address the efficiency of an algorithm or are written in a different language. See this answer which talks about efficiency in python and see if it helps you answer my question.

So I need the most efficient way to find all of the factors of any given number that works quickly with very large numbers. I already have several iterations of code that works but takes a very long time to process numbers with more than 6 characters.

Edit: upon request here are some of my non-efficient ways of doing this (error-checking left out for clarity)

Really messy:

``````    @IBAction func findFactorsButton(_ sender: AnyObject) {
if let _ = textField.text, !textField.text!.isEmpty {
counter = 1
factors = []
repeat {
counter += 1
if Int(textField.text!)! % counter == 0 {
factors.append(String(counter))
} else {
continue
}
} while counter != Int(textField.text!)
factors.removeLast()
outputLabel.text = factors.joined(separator: ", ")

} else {
outputLabel.text = ""
}
}
``````

Less messy solution (playground):

``````func calculateFactors(n: Int) -> String {
var result: String = ""
for i in 1...n {
guard n % i == 0  else {continue}
result += i == 1 ? "1" : ", \(i)"
}
print(result)
return result
}
``````
• Could you show us those iterations, listed in order of performance best to last? – dfd Aug 1 '17 at 19:00
• Efficient for factoring a single number? Or many? In the latter case you would pre-compute a list of primes. In what range are the numbers? – Martin R Aug 1 '17 at 19:04
• Here codereview.stackexchange.com/a/166342/35991 is an implementation which should be faster than yours. – Martin R Aug 1 '17 at 19:16
• Finding the factors of a single number. Not prime factors. – Cobie Fisher Aug 1 '17 at 19:16
• How to efficiently find all factors is an algorithm question that has little to do with any specific programming language, and @SamHarwell’s answer to that question (quoted here by @ColGraff) lists all the best algorithms for solving this problem. There was no Swift code in your question when I closed it. Since you added some code, I have reopened the question. – rob mayoff Aug 1 '17 at 22:48

Most Python methods in the referenced Q&A What is the most efficient way of finding all the factors of a number in Python? use the fact that factors of `n` come in pairs: if `i` is a factor then `n/i` is another factor. Therefore it is sufficient to test factors up to the square root of the given number.

Here is a possible implementation in Swift:

``````func factors(of n: Int) -> [Int] {
precondition(n > 0, "n must be positive")
let sqrtn = Int(Double(n).squareRoot())
var factors: [Int] = []
factors.reserveCapacity(2 * sqrtn)
for i in 1...sqrtn {
if n % i == 0 {
factors.append(i)
}
}
var j = factors.count - 1
if factors[j] * factors[j] == n {
j -= 1
}
while j >= 0 {
factors.append(n / factors[j])
j -= 1
}
return factors
}
``````

Remarks:

• `reserveCapacity` is used to avoid array reallocations.
• All factors in the range `1...sqrtn` are determined first, then the corresponding factors `n/i` are appended in reverse order, so that all factors are in increasing order.
• Special care must be taken that for perfect squares, `sqrt(n)` is not listed twice.

For numbers with up to 8 decimal digits, at most 9,999 trial divisions are needed. Example (on a 1.2 GHz Intel Core m5 MacBook, compiled in Release mode):

``````let start = Date()
let f = factors(of: 99999999)
print("Time:", Date().timeIntervalSince(start) * 1000, "ms")
print("Factors:", f)
``````

Output:

```Time: 0.227034091949463 ms
Factors: [1, 3, 9, 11, 33, 73, 99, 101, 137, 219, 303, 411, 657, 803, 909, 1111, 1233, 1507, 2409, 3333, 4521, 7227, 7373, 9999, 10001, 13563, 13837, 22119, 30003, 41511, 66357, 81103, 90009, 110011, 124533, 152207, 243309, 330033, 456621, 729927, 990099, 1010101, 1369863, 3030303, 9090909, 11111111, 33333333, 99999999]
```
• Thank you for this answer Martin, it works way more efficiently than my own previous version – Cobie Fisher Aug 1 '17 at 21:26

It all depends on your numbers. Here is a great summary:

"How big are your numbers?" determines the method to use:

So it all becomes a matter of picking algorithms and implementing them in Swift. Since you're saying you need numbers with "6 characters" that implies they are around 2^17 or so. So it's option 2 in that list: Sieve of Atkin or the modification of Pollard's rho.

• So can you share with me the implementation of the modified Pollard's Rho Algorithm in swift? – Cobie Fisher Aug 1 '17 at 19:25
• I don't have an implementation in Swift, you'll have to implement it or find it. The link gives the general algorithm, it should be relatively easy to code it in Swift. – ColGraff Aug 1 '17 at 19:26