How to get the Power of some Integer in Swift language?

I'm learning swift recently, but I have a basic problem that can't find an answer

I want to get something like

``````var a:Int = 3
var b:Int = 3
println( pow(a,b) ) // 27
``````

but the pow function can work with double number only, it doesn't work with integer, and I can't even cast the int to double by something like Double(a) or a.double()...

Why it doesn't supply the power of integer? it will definitely return an integer without ambiguity ! and Why I can't cast a integer to a double? it just change 3 to 3.0 (or 3.00000... whatever)

if I got two integer and I want to do the power operation, how can I do it smoothly?

Thanks!

• These type declarations are wrong
– user1971598
Commented Jun 13, 2014 at 2:19
• most languages don't have an integer power function due to this reason Commented Oct 6, 2017 at 2:05
• @phuclv's note points to a great discussion on the topic. I would change the text in the link to "these reasons" Commented May 20, 2019 at 16:49
• Hint: (^) is the The bitwise XOR operator, or “exclusive OR operator”. In case you wondered what your code was doing before you came here.
– mrk
Commented Dec 19, 2020 at 13:30

If you like, you could declare an `infix` `operator` to do it.

``````// Put this at file level anywhere in your project
infix operator ^^ { associativity left precedence 160 }
func ^^ (radix: Int, power: Int) -> Int {
}

// ...
// Then you can do this...
let i = 2 ^^ 3
// ... or
println("2³ = \(2 ^^ 3)") // Prints 2³ = 8
``````

I used two carets so you can still use the XOR operator.

Update for Swift 3

In Swift 3 the "magic number" `precedence` is replaced by `precedencegroups`:

``````precedencegroup PowerPrecedence { higherThan: MultiplicationPrecedence }
infix operator ^^ : PowerPrecedence
func ^^ (radix: Int, power: Int) -> Int {
}

// ...
// Then you can do this...
let i2 = 2 ^^ 3
// ... or
print("2³ = \(2 ^^ 3)") // Prints 2³ = 8
``````
• So if you wanted to do this for Floats, would you do this: infix operator ^^ { } func ^^ (radix: Float, power: Float) -> Float { return Float(pow(Double(radix), Double(power))) } Commented Apr 17, 2015 at 1:04
• func ^^ (radix: Double, power: Double) -> Double { return Double(pow(Double(radix), Double(power))) } Commented Apr 17, 2015 at 1:20
• I found this didn't quite behave as I expected because the precedence was off. For an exponentiative operator, set precedence to 160 (see developer.apple.com/library/ios/documentation/Swift/Conceptual/… and developer.apple.com/library/ios/documentation/Swift/Conceptual/…) like so: `infix operator ^^ { precedence 160 } func ^^`... and so on
– Tim
Commented May 26, 2015 at 2:34
• `func p(_ b: Bool) -> Double { return b?-1:1 }` ? Commented Sep 23, 2016 at 5:50
• A code quality note: I do not recommend actually defining this as `^^` because it’s very difficult to visually spot `^` vs `^^` in code reviews, and the two operators both accept and return `Int`, but give extremely different results. You’d just be begging for a nasty bug. Commented Dec 11, 2016 at 21:32

Other than that your variable declarations have syntax errors, this works exactly how you expected it to. All you have to do is cast `a` and `b` to Double and pass the values to `pow`. Then, if you're working with 2 Ints and you want an Int back on the other side of the operation, just cast back to Int.

``````import Darwin

let a: Int = 3
let b: Int = 3

let x: Int = Int(pow(Double(a),Double(b)))
``````
• This answer is the clearest with Double and Int types. Commented Nov 17, 2019 at 16:07
• That is what I want, thanks. In Python, just `3 ** 3`. Sometimes, I need to solve algorithm problem using Swift, it is really painful comparing to using Python. Commented Jul 28, 2020 at 4:42
• @ChuckZHB do you know operator overloading? Commented Dec 5, 2020 at 19:15

Sometimes, casting an `Int` to a `Double` is not a viable solution. At some magnitudes there is a loss of precision in this conversion. For example, the following code does not return what you might intuitively expect.

``````Double(Int.max - 1) < Double(Int.max) // false!
``````

If you need precision at high magnitudes and don't need to worry about negative exponents — which can't be generally solved with integers anyway — then this implementation of the tail-recursive exponentiation-by-squaring algorithm is your best bet. According to this SO answer, this is "the standard method for doing modular exponentiation for huge numbers in asymmetric cryptography."

``````// using Swift 5.0
func pow<T: BinaryInteger>(_ base: T, _ power: T) -> T {
func expBySq(_ y: T, _ x: T, _ n: T) -> T {
precondition(n >= 0)
if n == 0 {
return y
} else if n == 1 {
return y * x
} else if n.isMultiple(of: 2) {
return expBySq(y, x * x, n / 2)
} else { // n is odd
return expBySq(y * x, x * x, (n - 1) / 2)
}
}

return expBySq(1, base, power)
}
``````

Note: in this example I've used a generic `T: BinaryInteger`. This is so you can use `Int` or `UInt` or any other integer-like type.

• And of course you can always define this as an operator (as the more popular answers suggest) or an extension to `Int` or you can have those things call this free function — whatever your heart desires. Commented Feb 7, 2017 at 16:26
• It seems, this solution leads to a stackoverflow exception Commented Feb 8, 2020 at 21:29

If you really want an 'Int only' implementation and don't want to coerce to/from `Double`, you'll need to implement it. Here is a trivial implementation; there are faster algorithms but this will work:

``````func pow (_ base:Int, _ power:UInt) -> Int {
var answer : Int = 1
for _ in 0..<power { answer *= base }
}

> pow (2, 4)
\$R3: Int = 16
> pow (2, 8)
\$R4: Int = 256
> pow (3,3)
\$R5: Int = 27
``````

In a real implementation you'd probably want some error checking.

• This is a completely valid answer. There are some instances where converting Ints to Doubles loses precision, and so that is not a viable solution for Int pow. Just try running `Double(Int.max - 1) < Double(Int.max)` in a Swift 3 REPL and you may be surprised. Commented Aug 18, 2016 at 14:00
• To shorten it up, you could implement this with a `reduce` call. `return (2...power).reduce(base) { result, _ in result * base }` Commented Aug 18, 2016 at 14:00
• Perhaps you can get rid of the precondition by making power a UInt Commented Feb 6, 2017 at 14:47

To calculate `power(2, n)`, simply use:

``````let result = 1 << n
``````
• This works where `n` is an integer in the range 0...62. `n` can be 63 if `result` is declared as `UInt64`. Commented Aug 29, 2023 at 17:35

The other answers are great but if preferred, you can also do it with an `Int` extension so long as the exponent is positive.

``````extension Int {
func pow(toPower: Int) -> Int {
guard toPower >= 0 else { return 0 }
return Array(repeating: self, count: toPower).reduce(1, *)
}
}

2.pow(toPower: 8) // returns 256
2.pow(toPower: 0) // returns 1
``````

If you're disinclined towards operator overloading (although the `^^` solution is probably clear to someone reading your code) you can do a quick implementation:

``````let pwrInt:(Int,Int)->Int = { a,b in return Int(pow(Double(a),Double(b))) }
pwrInt(3,4) // 81
``````

It turns out you can also use `pow()`. For example, you can use the following to express 10 to the 9th.

``````pow(10, 9)
``````

Along with `pow`, `powf()` returns a `float` instead of a `double`. I have only tested this on Swift 4 and macOS 10.13.

• pow(a, b) returns NaN if b < 0 ; so you could add a test for this : let power = (b >= 0) ? pow(a, b) : 1 / pow(a, -b) ; note that a must be declared as Decimal let a : Decimal = 2 ; let b = -3 Commented May 12, 2018 at 8:24
• `let output = pow(Decimal(movingPower),4)` this was suggested by Xcode to make it into decimal Commented Feb 12, 2022 at 1:14

little detail more

``````   infix operator ^^ { associativity left precedence 160 }
func ^^ (radix: Int, power: Int) -> Int {
}
``````

swift - Binary Expressions

Or just :

``````var a:Int = 3
var b:Int = 3
println(pow(Double(a),Double(b)))
``````
• This is the same solution as in the top answer. Commented Feb 14, 2023 at 14:51

mklbtz is correct about exponentiation by squaring being the standard algorithm for computing integer powers, but the tail-recursive implementation of the algorithm seems a bit confusing. See http://www.programminglogic.com/fast-exponentiation-algorithms/ for a non-recursive implementation of exponentiation by squaring in C. I've attempted to translate it to Swift here:

``````func expo(_ base: Int, _ power: Int) -> Int {
var result = 1

while (power != 0){
if (power%2 == 1){
result *= base
}
power /= 2
base *= base
}
return result
}
``````

Of course, this could be fancied up by creating an overloaded operator to call it and it could be re-written to make it more generic so it worked on anything that implemented the `IntegerType` protocol. To make it generic, I'd probably start with something like

``````    func expo<T:IntegerType>(_ base: T, _ power: T) -> T {
var result : T = 1
``````

But, that is probably getting carried away.

• Very nice! For doing this generically in Swift > 4.0 (Xcode 9.0), you'd want to use `BinaryInteger`. `IntegerType` was deprecated. Commented Jun 26, 2018 at 14:29

Combining the answers into an overloaded set of functions (and using "**" instead of "^^" as some other languages use - clearer to me):

``````// http://stackoverflow.com/questions/24196689/how-to-get-the-power-of-some-integer-in-swift-language
// Put this at file level anywhere in your project
infix operator ** { associativity left precedence 160 }
func ** (radix: Double, power: Double) -> Double { return pow(radix, power) }
func ** (radix: Int,    power: Int   ) -> Double { return pow(Double(radix), Double(power)) }
func ** (radix: Float,  power: Float ) -> Double { return pow(Double(radix), Double(power)) }
``````

When using Float, you may lose precision. If using numeric literals and a mix of integers and non-integers, you will end up with Double by default. I personally like the ability to use a mathematical expression instead of a function like pow(a, b) for stylistic/readability reasons, but that's just me.

Any operators that would cause pow() to throw an error will also cause these functions to throw an error, so the burden of error checking still lies with the code using the power function anyway. KISS, IMHO.

Using the native pow() function allows to eg take square roots (2 ** 0.5) or inverse (2 ** -3 = 1/8). Because of the possibility to use inverse or fractional exponents, I wrote all my code to return the default Double type of the pow() function, which should return the most precision (if I remember the documentation correctly). If needed, this can be type-casted down to Int or Float or whatever, possibly with the loss of precision.

``````2 ** -3  = 0.125
2 ** 0.5 = 1.4142135623731
2 ** 3   = 8
``````
• pow() is not suitable for large calculation where fractional part is also very important. For me your answer gives a hint. Thanks:) Commented Mar 16, 2018 at 9:17

Array(repeating: a, count: b).reduce(1, *)

• This wins the prize for the most inefficient solution. :) Commented Aug 29, 2023 at 17:40

Swift 5

I was surprised, but I didn't find a proper correct solution here.

This is mine:

``````enum CustomMath<T: BinaryInteger> {

static func pow(_ base: T, _ power: T) -> T {
var tempBase = base
var tempPower = power
var result: T = 1

while (tempPower != 0) {
if (tempPower % 2 == 1) {
result *= tempBase
}
tempPower = tempPower >> 1
tempBase *= tempBase
}
return result
}
}
``````

Example:

``````CustomMath.pow(1,1)
``````
• This is a good solution, if performance comes in play. For all normal purposes the other solutions are easier to understand. Commented Feb 3, 2022 at 14:05
• @StephanJanuar thank you very much Commented Feb 4, 2022 at 16:52
• tempBase is never used Commented Nov 28, 2022 at 15:15
• @aepryus it looks like your edit broke the code sample. @Roman points out that `tempBase` now has no effect after your change. Note that `base` has no effect on the result also, since it is only used to reset `tempBase`. Commented Dec 29, 2023 at 21:25
• @CodieCodeMonkey My edit was made on Jan 12, 2023 after Roman's comment Nov 28, 2022. The original version of this made use of 'power' and 'base' throughout the code instead of the temp versions which I assume was Vyacheslav's original intent. tempBase does have an effect; it is multiplied by result during the loops when tempPower is odd. I reverified in a playground; the algorithm is sound even if it is a bit hard to follow in the interest of performance. Commented Dec 30, 2023 at 0:41

Swift 4.x version

``````precedencegroup ExponentiationPrecedence {
associativity: right
higherThan: MultiplicationPrecedence
}

infix operator ^^: ExponentiationPrecedence
public func ^^ (radix: Float, power: Float) -> Float {
}

public func ^^ (radix: Double, power: Double) -> Double {
}

public func ^^ (radix: Int, power: Int) -> Int {
return NSDecimalNumber(decimal: pow(Decimal(radix), power)).intValue
}
``````

In Swift 5:

``````extension Int{
func expo(_ power: Int) -> Int {
var result = 1
var powerNum = power
var tempExpo = self
while (powerNum != 0){
if (powerNum%2 == 1){
result *= tempExpo
}
powerNum /= 2
tempExpo *= tempExpo
}
return result
}
}

``````

Use like this

``````2.expo(5) // pow(2, 5)
``````

Thanks to @Paul Buis's answer.

An Int-based pow function that computes the value directly via bit shift for base 2 in Swift 5:

``````func pow(base: Int, power: UInt) -> Int {
if power == 0 { return 1 }
// for base 2, use a bit shift to compute the value directly
if base == 2 { return 2 << Int(power - 1) }
// otherwise multiply base repeatedly to compute the value
return repeatElement(base, count: Int(power)).reduce(1, *)
}
``````

(Make sure the result is within the range of Int - this does not check for the out of bounds case)

Trying to combine the overloading, I tried to use generics but couldn't make it work. I finally figured to use NSNumber instead of trying to overload or use generics. This simplifies to the following:

``````typealias Dbl = Double // Shorter form
infix operator ** {associativity left precedence 160}
func ** (lhs: NSNumber, rhs: NSNumber) -> Dbl {return pow(Dbl(lhs), Dbl(rhs))}
``````

The following code is the same function as above but implements error checking to see if the parameters can be converted to Doubles successfully.

``````func ** (lhs: NSNumber, rhs: NSNumber) -> Dbl {
// Added (probably unnecessary) check that the numbers converted to Doubles
if (Dbl(lhs) ?? Dbl.NaN) != Dbl.NaN && (Dbl(rhs) ?? Dbl.NaN) != Dbl.NaN {
return pow(Dbl(lhs), Dbl(rhs))
} else {
return Double.NaN
}
}
``````

I like this better

``````func ^ (left:NSNumber, right: NSNumber) -> NSNumber {
return pow(left.doubleValue,right.doubleValue)
}
var a:NSNumber = 3
var b:NSNumber = 3
println( a^b ) // 27
``````
• That replaces the standard xor operator. Using this will make your code behave in a very unexpected way to anyone who doesn't know you're overriding the single karat.
– wjl
Commented Mar 25, 2015 at 20:08
• Yep agree, it replaces the standard `xor` operator Commented Oct 5, 2020 at 1:37
``````func calc (base:Int, number:Int) -> Int {
var answer : Int = base
for _ in 2...number {answer *= base }
}
``````

Example:

``````calc (2,2)
``````
• It's good practice to explain why your code offers a solution, rather than just dumping code into an answer. Commented Jul 24, 2014 at 15:28
• And it's far from a correct power function. What about 0 as an exponent or any negative value. Commented Nov 13, 2014 at 14:00
• Also, the name 'calc" is too generic to be used in such a specific operation.. cal(2,2) can mean any possible calculation you want to apply to 2 numbers... 2+2, 2-2, 2*2, 2/2, 2pow2, 2root2, etc. Commented May 20, 2019 at 17:12
• Time complexity would be O(n). Use `bit shifting` for O(1) Commented Oct 5, 2020 at 1:40
• @BinhLe bit shifting only works if base is 2. For example 3^2 = 9 but 3 << 2 is 12. Commented Aug 29, 2023 at 17:48