I am trying to understand SHA256. On the Wikipedia page it says:

append the bit '1' to the message

append k bits '0', where k is the minimum number >= 0 such that the resulting message length (modulo 512 in bits) is 448.

append length of message (without the '1' bit or padding), in bits, as 64-bit big-endian integer (this will make the entire post-processed length a multiple of 512 bits)

So if my message is 01100001 01100010 01100011 I would first add a 1 to get

01100001 01100010 01100011 1

Then you would fill in 0s so that the total length is 448 mod 512:

01100001 01100010 01100011 10000000 0000 ... 0000

(So in this example, one would add 448 - 25 0s)

My question is: What does the last part mean? I would like to see an example.

  • Are you familiar with endianness?
    – Fred Foo
    Apr 18, 2014 at 23:24
  • @larsmans: No, I don't think so.
    – Thomas
    Apr 18, 2014 at 23:25
  • shouldn't the message length in your calculations be still 24 instead of 25?
    – Vega4
    Jul 4, 2017 at 14:05

1 Answer 1


It means the message length, padded to 64 bits, with the bytes appearing in order of significance. So if the message length is 37113, that's 90 f9 in hex; two bytes. There are two basic(*) ways to represent this as a 64-bit integer,

00 00 00 00 00 00 90 f9  # big endian


f9 90 00 00 00 00 00 00  # little endian

The former convention follows the way numbers are usually written out in decimal: one hundred and two is written 102, with the most significant part (the "big end") being written first, the least significant ("little end") last. The reason that this is specified explicitly is that both conventions are used in practice; internet protocols use big endian, Intel-compatible processors use little endian, so if they were decimal machines, they'd write one hundred and two as 201.

(*) Actually there are 8! = 40320 ways to represent a 64-bit integer if 8-bit bytes are the smallest units to be permuted, but two are in actual use.

  • Ok, so in my example above the message was abc so had length 24 bits. That is 18 in hex, so one byte. So I would add 00 00 00 00 00 00 00 18 to the end?
    – Thomas
    Apr 18, 2014 at 23:30
  • Is this 64 bit number meant to be literally added onto the end of the binary form of the input from the first two steps? How can they be combined?
    – Joseph
    Jun 11, 2014 at 13:07
  • 1
    @Joseph It says "append", so yes, just tuck it on.
    – Fred Foo
    Jun 11, 2014 at 13:24
  • @larsmans I have made the final step 64 bits, but am unsure if I should leave the length as hex or binary. As I have my entire message formatted for binary it makes sense to have the length in binary right? stackoverflow.com/questions/24166076/…
    – Joseph
    Jun 11, 2014 at 15:19

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service and acknowledge you have read our privacy policy.

Not the answer you're looking for? Browse other questions tagged or ask your own question.