`0x100000000000000 == 0xFFFFFFFFFFFFFF`

gives `true`

while
`0x10000000000000 == 0xFFFFFFFFFFFFF`

gives `false`

. So the former is the "limit", say.

Let's analyze the numbers: 52 bits for `0xFFFFFFFFFFFFF`

and one additional bit for 0x10000000000000 in the internal representation.

**EDIT**: Numbers of such magnitude are not represented by long ints but by double precission floats. This is because ~~they exceed the 32bit representation of an integer value~~ every number in javascript is represented as IEEE754 double precision floating point.

When you represent any IEEE754 Double Precission FP Number internally, you get:

```
0111 1111 1111 2222
2222 2222 2222 2222
2222 2222 2222 2222
2222 2222 2222 2222
```

Where (0) is the sign bit, (1) the exponent bits, and (2) the mantissa bits.

If you compare in JavaScript `0.5 == 5 * 0.1`

you will get `true`

even when that operation has floating imprecission (i.e. you get some error). So Javascript tolerates a small error in floating point operations so operations like that give true, as the common sense tells.

**Edit** - There's something wrong I wrote about the Mantissa: Yes, every Mantissa starts with `1`

(it is said that such mantissa is *normalized*), **BUT** that `1`

is not stored in a *normalized* number (each nonzero exponent has only normalized numbers. mantissas for numbers with exponent `000 0000 0000`

do not follow this rule). This means that **every normalized mantissa has 52 explicit bits, and an implicit 1**.

Now: what about the 52 bits? Notice that the 0xFF... has 52 bits length. This means that it will be stored as: 0 for the sign (it is positive), 52 for the exponent, and 52 "1" digits in the mantissa (see a final note at the foot of this answer). Since one "1" is implicit, we'll store 51 "1" and one "0".

```
0100 0011 0010 1111
1111 1111 1111 1111
1111 1111 1111 1111
1111 1111 1111 1110
(exponent 1075 corresponds to actual exponent 52)
```

AND the other number has 53 bits: one "1" and 52 "0". Since the first "1" is implicit, it will be stored like:

```
0100 0011 0100 0000
0000 0000 0000 0000
0000 0000 0000 0000
0000 0000 0000 0000
(exponent 1076 corresponds to actual exponent 53)
```

Now it's time to compare values. They will compare *in equality of conditions*: first we take sign and exponent to the comparisson. If they're equal, we consider the mantissa.

Comparisson here takes place considering a small error being tolerated as a product of rounding. Such *epsilon* is taken into account (epsilon is about =2^-53) and FP ALU detects that, relatively, those numbers differ only in such epsilon, so they seem to be equal only in that context (there are many times where this does not save you as in cases of `0.3 == 0.2 + 0.1`

, being each of three numbers binary-non-representable, in contrast to `0.5`

which is, and can tolerate an error against `0.1 + 0.4`

).

**Note** About the mantissa and the FP representation: The Mantissa is always, conceptually, lower than 1. If you want to represent a higher number, you must conceive it using an exponent. Examples:

- 0.5 is represented as
`0.5 * 2 ^ 0`

(consider the right operator precedence in math).
- 1 is represented not as
`1 * 2 ^ 0`

since the mantissa is always lower than 1, so the representation will be `0.5 * 2 ^ 1`

.
- 65, which has binary representation as 1000001, will be stored as
`(65/128) * 2 ^ 7`

.

These numbers are represented as (remember: the first "1" is implicit since these exponents are for normalized numbers):

```
0011 1111 1111 0000
... more 0 digits
(exponent 1023 stands for actual exponent 0, mantissa in binary repr. is 0.1, and the first "1" is implicit).
0100 0000 0000 0000
... more 0 digits
(exponent 1024 stands for actual exponent 1, mantissa in binary repr. is 0.1, and the first "1" is implicit).
```

and

```
0100 0000 0110 0000
0100 0000 0000 0000
(exponent 1030 stands for actual exponent 7, mantissa in binary repr. is 0.1000001, and since the first "1" is implicit, it is stored as 0000 0100 0000...)
```

**Note** About the exponent: Lower precission can be achieved by allowing negative exponents as well: Exponents seem positive -unsigned- but the reality is that you must subtract 1023 (called "bias") to that number to get the actual exponent (this means that exponent "1" actually corresponds to 2^(-1022)). Translating this to a 10-based power, the lowest exponent is -308 for decimal numbers (considering also the mantissa possition as I will show later). The lowest positive number is:

```
0000 0000 0000 0000
0000 0000 0000 0000
0000 0000 0000 0000
0000 0000 0000 0001
```

which is: `(1 * 2^-52) * 2^-1023`

being the first -52 given by the mantissa and the -1023 by the exponent. The final one is: 1 * 2^(-1075), which goes towards the 10^-308 always told.

The lowest exponent is `000 0000 0000`

corresponding to (-1023). There's a rule: Every mantissa must begin with (an implicit) "1" or have this exponent. On the other side, the highest exponent could be `111 1111 1111`

, but this exponent is reserved for special pseudonumbers:

```
0111 1111 1111 0000
0000 0000 0000 0000
0000 0000 0000 0000
0000 0000 0000 0000
```

corresponds to +Infinity, while:

```
1111 1111 1111 0000
0000 0000 0000 0000
0000 0000 0000 0000
0000 0000 0000 0000
```

corresponds to -Infinity, and any pattern with a nonzero mantissa, like:

```
?111 1111 1111 0000
0000 0000 0000 0000
0000 0000 0000 0000
0000 0000 0000 0001
```

correspond to NaN (not a number; ideal to represent stuff like log(-1) or 0/0). Actually I'm not sure what mantissas are used for NaN (either quiet or signaling NaN). The question mark stands for any bit.