ECMAScript 6's `Number.MAX_SAFE_INTEGER`

supposedly represents the maximum numerical value JavaScript can store before issues arise with floating point precision. However it's a requirement that the number 1 added to this value must also be representable as a `Number`

.

`Number.MAX_SAFE_INTEGER`

NOTE The value of`Number.MAX_SAFE_INTEGER`

is the largest integer`n`

such that`n`

and`n + 1`

are both exactly representable as a`Number`

value.The value of

`Number.MAX_SAFE_INTEGER`

is`9007199254740991 (2^53−1)`

.

The JavaScript consoles of Chrome, Firefox, Opera and IE11 can all safely perform calculations with the number 9,007,199,254,740,992. Some tests:

```
// Valid
Math.pow(2, 53) // 9007199254740992
9007199254740991 + 1 // 9007199254740992
9007199254740992 - 1 // 9007199254740991
9007199254740992 / 2 // 4503599627370496
4503599627370496 * 2 // 9007199254740992
parseInt('20000000000000', 16) // 9007199254740992
parseInt('80000000000', 32) // 9007199254740992
9007199254740992 - 9007199254740992 // 0
9007199254740992 == 9007199254740991 // false
9007199254740992 == 9007199254740992 // true
// Erroneous
9007199254740992 + 1 // 9007199254740992
9007199254740993 + "" // "9007199254740992"
9007199254740992 == 9007199254740993 // true
```

Why is it a requirement that `n + 1`

must also be representable as a `Number`

? Why does failing this make the value *unsafe*?

`2^53 - 1`

is the last value which can be accurately represented -`2^53`

will give the same value as`2^53 + 1`

("Stolen" from leanpub.com/understandinges6/read#leanpub-auto-numbers) – Andreas Oct 15 '14 at 10:49`0`

.. maybe this is the reason. – Mr_Green Oct 15 '14 at 11:05