# The maximum value for an int type in Go

How does one specify the maximum value representable for an `unsigned` integer type?

I would like to know how to initialize `min` in the loop below that iteratively computes min and max lengths from some structs.

``````var minLen uint = ???
var maxLen uint = 0
for _, thing := range sliceOfThings {
if minLen > thing.n { minLen = thing.n }
if maxLen < thing.n { maxLen = thing.n }
}
if minLen > maxLen {
// If there are no values, clamp min at 0 so that min <= max.
minLen = 0
}
``````

so that the first time through the comparison, `minLen >= n`.

The germane part:

Since integer types use two's complement arithmetic, you can infer the min/max constant values for `int` and `uint`. For example,

``````const MaxUint = ^uint(0)
const MinUint = 0
const MaxInt = int(MaxUint >> 1)
const MinInt = -MaxInt - 1
``````

As per @CarelZA's comment:

``````uint8  : 0 to 255
uint16 : 0 to 65535
uint32 : 0 to 4294967295
uint64 : 0 to 18446744073709551615
int8   : -128 to 127
int16  : -32768 to 32767
int32  : -2147483648 to 2147483647
int64  : -9223372036854775808 to 9223372036854775807
``````
• Use the ones available in `math`: golang.org/pkg/math/#pkg-constants, you would want `math.MaxInt32` most likely. – Charles L. Jun 17 '16 at 21:25
• Can someone explain exactly what ^uint(0) and ^uint(0) >> 1 do? – Arijoon Jun 29 '16 at 16:25
• @Arijoon, ^ means invert bits in the expression so if: uint(0) == 0000...0000 (exactly 32 or 64 zero bits depending on build target architecture) then ^unit(0) == 1111...1111 which gives us the maximum value for the unsigned integer (all ones). Now when you are talking about signed integer then first (the most significant) bit is used to store sign therefore to the signed int maximum value - we need to shift all bits to the right which gives us ^uint(0) >> 1 == 0111...1111. Which gives the maximum positive integer. – ninjaboy May 9 '17 at 20:54
• @CharlesL. what about just int type? – user960567 Jul 16 '18 at 13:43
• I know it's been some time, but just in case someone comes here today and sees @user960567's Question-Comment: the `int` type is 32 bits long on a 32 bit system and 64 bits long on a 64 bit system. See here. – Christoph Harms-Ensink Dec 12 '19 at 14:26

https://golang.org/ref/spec#Numeric_types for physical type limits.

The max values are defined in the math package so in your case: math.MaxUint32

Watch out as there is no overflow - incrementing past max causes wraparound.

• Thanks. I'm actually using `uint`, not `uint32`. The `len` and `cap` use `int` not `int32` so I want to use something that matches the size of those on all architectures. `math/const.go` defines a bunch of `Max<type>` but none for either `uint` or `int. – Mike Samuel Jul 29 '11 at 20:34
• I'd change it to uint32 or unit64 then to make sure it's portable across architectures. I do that with everything religiously. I've been through years of hell porting C between architectures and I can say that "being explicit" will help considerably later on. – Deleted Jul 29 '11 at 20:38
• Thanks. My code has checks that `uint(len(...)) < thing.minLen` but I don't know whether `uint64(int)` is and will remain defined behavior. – Mike Samuel Jul 29 '11 at 20:50
• If you don't know then read the spec linked above...specifically golang.org/doc/go_spec.html#Conversions. There's a careful definition of "conversions between numeric types". – Anschel Schaffer-Cohen Jul 31 '11 at 15:55

I would use `math` package for getting the maximal value and minimal value :

``````func printMinMaxValue() {
// integer max
fmt.Printf("max int64 = %+v\n", math.MaxInt64)
fmt.Printf("max int32 = %+v\n", math.MaxInt32)
fmt.Printf("max int16 = %+v\n", math.MaxInt16)

// integer min
fmt.Printf("min int64 = %+v\n", math.MinInt64)
fmt.Printf("min int32 = %+v\n", math.MinInt32)

fmt.Printf("max flloat64= %+v\n", math.MaxFloat64)
fmt.Printf("max float32= %+v\n", math.MaxFloat32)

// etc you can see more int the `math`package
}
``````

Ouput :

``````max int64 = 9223372036854775807
max int32 = 2147483647
max int16 = 32767
min int64 = -9223372036854775808
min int32 = -2147483648
max flloat64= 1.7976931348623157e+308
max float32= 3.4028234663852886e+38
``````
• This code does not work. The two `int64`'s overflow int, which is what happens if you do not explicitly type constants prior to string interpolation. Use `int64(math.MaxInt64)` instead, see stackoverflow.com/questions/16474594/… – domoarigato Dec 29 '17 at 21:40
• But otherwise, is a better answer than the accepted one. :) – domoarigato Dec 29 '17 at 21:41
• what happens if you use int64 on a machine with 32-bit word size? in C, the compiler decides the INT_MIN – segue_segway Aug 3 '19 at 19:14

I originally used the code taken from the discussion thread that @nmichaels used in his answer. I now use a slightly different calculation. I've included some comments in case anyone else has the same query as @Arijoon

``````const (
MinUint uint = 0                 // binary: all zeroes

// Perform a bitwise NOT to change every bit from 0 to 1
MaxUint      = ^MinUint          // binary: all ones

// Shift the binary number to the right (i.e. divide by two)
// to change the high bit to 0
MaxInt       = int(MaxUint >> 1) // binary: all ones except high bit

// Perform another bitwise NOT to change the high bit to 1 and
// all other bits to 0
MinInt       = ^MaxInt           // binary: all zeroes except high bit
)
``````

The last two steps work because of how positive and negative numbers are represented in two's complement arithmetic. The Go language specification section on Numeric types refers the reader to the relevant Wikipedia article. I haven't read that, but I did learn about two's complement from the book Code by Charles Petzold, which is a very accessible intro to the fundamentals of computers and coding.

I put the code above (minus most of the comments) in to a little integer math package.

Quick summary:

``````import "math/bits"
const (
MaxUint uint = (1 << bits.UintSize) - 1
MaxInt int = (1 << bits.UintSize) / 2 - 1
MinInt int = (1 << bits.UintSize) / -2
)
``````

Background:

As I presume you know, the `uint` type is the same size as either `uint32` or `uint64`, depending on the platform you're on. Usually, one would use the unsized version of these only when there is no risk of coming close to the maximum value, as the version without a size specification can use the "native" type, depending on platform, which tends to be faster.

Note that it tends to be "faster" because using a non-native type sometimes requires additional math and bounds-checking to be performed by the processor, in order to emulate the larger or smaller integer. With that in mind, be aware that the performance of the processor (or compiler's optimised code) is almost always going to be better than adding your own bounds-checking code, so if there is any risk of it coming into play, it may make sense to simply use the fixed-size version, and let the optimised emulation handle any fallout from that.

With that having been said, there are still some situations where it is useful to know what you're working with.

The package "math/bits" contains the size of `uint`, in bits. To determine the maximum value, shift `1` by that many bits, minus 1. ie: `(1 << bits.UintSize) - 1`

Note that when calculating the maximum value of `uint`, you'll generally need to put it explicitly into a `uint` (or larger) variable, otherwise the compiler may fail, as it will default to attempting to assign that calculation into a signed `int` (where, as should be obvious, it would not fit), so:

``````const MaxUint uint = (1 << bits.UintSize) - 1
``````

That's the direct answer to your question, but there are also a couple of related calculations you may be interested in.

According to the spec, `uint` and `int` are always the same size.

`uint` either 32 or 64 bits

`int` same size as `uint`

So we can also use this constant to determine the maximum value of `int`, by taking that same answer and dividing by `2` then subtracting `1`. ie: `(1 << bits.UintSize) / 2 - 1`

And the minimum value of `int`, by shifting `1` by that many bits and dividing the result by `-2`. ie: `(1 << bits.UintSize) / -2`

In summary:

MaxUint: `(1 << bits.UintSize) - 1`

MaxInt: `(1 << bits.UintSize) / 2 - 1`

MinInt: `(1 << bits.UintSize) / -2`

full example (should be the same as below)

``````package main

import "fmt"
import "math"
import "math/bits"

func main() {
var mi32 int64 = math.MinInt32
var mi64 int64 = math.MinInt64

var i32 uint64 = math.MaxInt32
var ui32 uint64 = math.MaxUint32
var i64 uint64 = math.MaxInt64
var ui64 uint64 = math.MaxUint64
var ui uint64 = (1 << bits.UintSize) - 1
var i uint64 = (1 << bits.UintSize) / 2 - 1
var mi int64 = (1 << bits.UintSize) / -2

fmt.Printf(" MinInt32: %d\n", mi32)
fmt.Printf(" MaxInt32:  %d\n", i32)
fmt.Printf("MaxUint32:  %d\n", ui32)
fmt.Printf(" MinInt64: %d\n", mi64)
fmt.Printf(" MaxInt64:  %d\n", i64)
fmt.Printf("MaxUint64:  %d\n", ui64)
fmt.Printf("  MaxUint:  %d\n", ui)
fmt.Printf("   MinInt: %d\n", mi)
fmt.Printf("   MaxInt:  %d\n", i)
}
``````
• Thanks. Your caveats about native numerics are well stated, and I was unaware of math/bits. – Mike Samuel Jan 30 '19 at 15:51
• uint either 32 or 64 bits, int same size as uint. How can these be the same size if one has a sign and the other doesnt? – themiDdlest Jan 15 at 22:43
• They have the same bit-size, they don't have the same maximum/minimum values. One of the bits in that size is the sign bit. (the `/2` part is what removes that bit from consideration when calculating the size of min/max for int64) – Will Palmer Jan 18 at 1:55
``````package main

import (
"fmt"
"math"
)

func main() {
fmt.Printf("max int64: %d\n", math.MaxInt64)
}
``````

One way to solve this problem is to get the starting points from the values themselves:

``````var minLen, maxLen uint
if len(sliceOfThings) > 0 {
minLen = sliceOfThings.minLen
maxLen = sliceOfThings.maxLen
for _, thing := range sliceOfThings[1:] {
if minLen > thing.minLen { minLen = thing.minLen }
if maxLen < thing.maxLen { maxLen = thing.maxLen }
}
}
``````

A lightweight package contains them (as well as other int types limits and some widely used integer functions):

``````import (
"fmt"
"<Full URL>/go-imath/ix"
"<Full URL>/go-imath/ux"
)
...
fmt.Println(ix.Minimal) // Output: -2147483648 (32-bit) or -9223372036854775808 (64-bit)
fmt.Println(ix.Maximal) // Output: 2147483647 or 9223372036854775807
fmt.Println(ux.Minimal) // Output: 0
fmt.Println(ux.Maximal) // Output: 4294967295 or 18446744073709551615
``````

Use the constants defined in the math package:

``````const (
MaxInt8   = 1<<7 - 1
MinInt8   = -1 << 7
MaxInt16  = 1<<15 - 1
MinInt16  = -1 << 15
MaxInt32  = 1<<31 - 1
MinInt32  = -1 << 31
MaxInt64  = 1<<63 - 1
MinInt64  = -1 << 63
MaxUint8  = 1<<8 - 1
MaxUint16 = 1<<16 - 1
MaxUint32 = 1<<32 - 1
MaxUint64 = 1<<64 - 1
)
``````
``````MaxInt8   = 1<<7 - 1
MinInt8   = -1 << 7
MaxInt16  = 1<<15 - 1
MinInt16  = -1 << 15
MaxInt32  = 1<<31 - 1
MinInt32  = -1 << 31
MaxInt64  = 1<<63 - 1
MinInt64  = -1 << 63
MaxUint8  = 1<<8 - 1
MaxUint16 = 1<<16 - 1
MaxUint32 = 1<<32 - 1
MaxUint64 = 1<<64 - 1
``````