# Are these endian transformations correct?

I am struggling to figure this out, I am trying to represent a 32bit variable in both big and little endian. For the sake of argument let's say we try the number, "666."

Big Endian: 0010 1001 1010 0000 0000 0000 0000

Little Endian: 0000 0000 0000 0000 0010 1001 1010

Is this correct, or is my thinking wrong here?

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You're showing 28 bit numbers. –  larsmans Apr 30 '11 at 23:58
larsman's right..and even if they were 32 your conversion is wrong. Read here: en.wikipedia.org/wiki/Endianness –  Heisenbug Apr 30 '11 at 23:59
Big endian means that the most significant digit is on the far left. The most significant digit in a 32-bit number is over two billion, then the next one is one billion, etc. Needless to say, this means that a big endian representation of 666 is going to have a lot of zeroes on the left before you reach any ones. –  thasc May 1 '11 at 0:03

666 (decimal) as 32-bit binary is represented as:

`[0000 0000] [0000 0000] [0000 0010] [1001 1010]` (big endian, most significant byte first))

`[1001 1010] [0000 0010] [0000 0000] [0000 0000]` (little endian, least significant byte first)

Ref.

(I have used square brackets to group 4-bit nibbles into bytes)

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are you sure? isn't a byte made of 8 bit? seems 4 from your conversion –  Heisenbug May 1 '11 at 0:07
Thanks, I think I understand what I was doing wrong. –  john May 1 '11 at 0:17
you're welcome. I removed my wrong answer too.. –  Heisenbug May 1 '11 at 0:18