# Go big.Int factorial with recursion

I am trying to implement this bit of code:

``````func factorial(x int) (result int) {
if x == 0 {
result = 1;
} else {
result = x * factorial(x - 1);
}
return;
}
``````

as a big.Int so as to make it effective for larger values of x.

The following is returning a value of 0 for fmt.Println(factorial(r))

The factorial of 7 should be 5040?

Any ideas on what I am doing wrong?

``````package main

import "fmt"
import "math/big"

func main() {
fmt.Println("Hello, playground")

//n := big.NewInt(40)
r := big.NewInt(7)

fmt.Println(factorial(r))

}

func factorial(n *big.Int) (result *big.Int) {
//fmt.Println("n = ", n)
b := big.NewInt(0)
c := big.NewInt(1)

if n.Cmp(b) == -1 {
result = big.NewInt(1)
}
if n.Cmp(b) == 0 {
result = big.NewInt(1)
} else {
// return n * factorial(n - 1);
fmt.Println("n = ", n)
result = n.Mul(n, factorial(n.Sub(n, c)))
}
return result
}
``````

This code on go playground: http://play.golang.org/p/yNlioSdxi4

-

In your `int` version, every `int` is distinct. But in your `big.Int` version, you're actually sharing `big.Int` values. So when you say

``````result = n.Mul(n, factorial(n.Sub(n, c)))
``````

The expression `n.Sub(n, c)` actually stores `0` back into `n`, so when `n.Mul(n, ...)` is evaluated, you're basically doing `0 * 1` and you get back `0` as a result.

Remember, the results of `big.Int` operations don't just return their value, they also store them into the receiver. This is why you see repetition in expressions like `n.Mul(n, c)`, e.g. why it takes `n` again as the first parameter. Because you could also say`result.Mul(n, c)` and you'd get the same value back, but it would be stored in `result` instead of `n`.

Here is your code rewritten to avoid this problem:

``````func factorial(n *big.Int) (result *big.Int) {
//fmt.Println("n = ", n)
b := big.NewInt(0)
c := big.NewInt(1)

if n.Cmp(b) == -1 {
result = big.NewInt(1)
}
if n.Cmp(b) == 0 {
result = big.NewInt(1)
} else {
// return n * factorial(n - 1);
fmt.Println("n = ", n)
result = new(big.Int)
result.Set(n)
result.Mul(result, factorial(n.Sub(n, c)))
}
return
}
``````

And here is a slightly more cleaned-up/optimized version (I tried to remove extraneous allocations of `big.Int`s): http://play.golang.org/p/feacvk4P4O

-
Thank You! Yes those results of big.Int operations do get a little bit tricky. –  Greg Jun 30 '12 at 1:11
@Greg: Here is a much more compact implication that skips recursion and goes straight for a for loop instead. –  Kevin Ballard Jun 30 '12 at 1:15
OK, Great! That works too. –  Greg Jun 30 '12 at 1:35

For example,

``````package main

import (
"fmt"
"math/big"
)

func factorial(x *big.Int) *big.Int {
n := big.NewInt(1)
if x.Cmp(big.NewInt(0)) == 0 {
return n
}
return n.Mul(x, factorial(n.Sub(x, n)))
}

func main() {
r := big.NewInt(7)
fmt.Println(factorial(r))
}
``````

Output:

``````5040
``````
-

Go package `math.big` has `func (*Int) MulRange(a, b int64)`. When called with the first parameter set to 1, it will return b!:

``````package main
import ( "fmt"; "math/big" )
func main() {
x := new(big.Int)
x.mulRange(1,10)
fmt.Println(x)
}
``````

Will produce

3628800

-
That is `x.MulRange`, not `x.mulRange`. –  Attila O. 7 hours ago