# Base64 length calculation?

After reading (again )the base 64 topic ...

I'm trying to figure How the formulla is working :

Given a string with length of `n` , the base64 length will be

which is : `4*Math.Ceiling(((double)s.Length/3)))`

I already know that base64 length must be `%4==0` to allow the decoder know what was the original text length.

The max number of padding for a sequesnce can be `=` or `==`.

wiki :The number of output bytes per input byte is approximately 4 / 3 (33% overhead)

How does the information above settles with the output length ?

Thanks.

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Each character is used to represent 6 bits (`log2(64) = 6`).

Therefore 4 chars are used to represent `4 * 6 = 24 bits = 3 bytes`.

So you need `4*(n/3)` chars to represent n bytes, and this need to be rounded up to a multiple of 4.

The number of unused padding chars resulting from the rounding up to a multiple of 4 will obviously be 0, 1, 2 or 3.

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where is the padding gets here ? –  Royi Namir Nov 14 '12 at 12:30
Consider if you have one byte of input. That will produce four characters of output. But only two output characters are needed to encode the input. So two characters will be padding. –  David Schwartz Nov 14 '12 at 12:30
Still don't understand how you got to `4*(n/3)` lets say you have `123456` its length is 6. 6*6=36 bits which is 4.5 bytes. from this pont i dont understnad. –  Royi Namir Nov 14 '12 at 13:10
For 3 bytes (3 x 8 = 24 bits) you need 4 chars (4 x 6 = 24 bits), so for 3n bytes you need 4n chars, i.e. no of chars = 4n / 3. –  Paul R Nov 14 '12 at 13:12
I explained all this in the answer above: (i) each output char represents 6 bits of input, (ii) 4 output chars therefore represent 4 * 6 = 24 bits, (iii) 24 bits is 3 bytes, (iv) 3 bytes of input therefore result in 4 chars of output, (v) the ratio of output chars to input bytes is therefore 4 / 3. –  Paul R Nov 14 '12 at 13:22

Determining the size of the output of a Base64 encoder given the size of the input, the formula is very simple:

The equation says that if you feed `n` bytes of data into the Base64 encoder, you will get `4n/3` bytes of data out. In simpler terms, every three bytes of binary data requires 4 Base64 characters.

You ask in a comment what the size of encoding `123456` would be. You are correct, it's length is 6, but your mistake is that every character of that string is 8 bits in size (assuming ASCII/UTF8 encoding), not 6 bits. That means you are encoding 6 bytes, or 48 bits of data. According to the equation, we expect the output length to be `4/3 * 6 = 8`.

Putting `123456` into a Base64 encoder creates `MTIzNDU2`, which is 8 characters long, just as we expected.

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I think the given answers miss the point of the original question, which is how much space needs to be allocated to fit the base64 encoding for a given binary string of length n bytes.

The answer is `(floor(n / 3) + 1) * 4 + 1`

This includes padding and a terminating null character. You may not need the floor call if you are doing integer arithmetic.

Including padding, a base64 string requires four bytes for every three-byte chunk of the original string, including any partial chunks. One or two bytes extra at the end of the string will still get converted to four bytes in the base64 string when padding is added. Unless you have a very specific use, it is best to add the padding, usually an equals character. I added an extra byte for a null character in C, because ASCII strings without this are a little dangerous and you'd need to carry the string length separately.

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Your formula is wrong. Consider n=3, the expected result (without null padding) is 4, but your formula returns 8. –  CodesInChaos Mar 23 '14 at 16:16
I also think including the null terminator is silly, especially since we're talking about .net here. –  CodesInChaos Mar 23 '14 at 16:18

Seems to me that the right formula should be:

``````n64 = 4 * (n / 3) + (n % 3 != 0 ? 4 : 0)
``````
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`4 * n / 3` gives unpadded length.

And round up to the nearest multiple of 4 for padding, and as 4 is a power of 2 can use bitwise logical operations.

``````((4 * n / 3) + 3) & ~3
``````
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