# Storing a string as a binary string of 'unsigned char's to in matters of compression

I need to store a string of 8 chars (they're all digits) in a compressed method,

As I understand it, each `char` uses `8 bits` which are `1 byte` and since I only use digits I can use `4 bits` (`2^4=16` combinations) so for each `unsigned char` I can store two digits instead of one. Thus I need `4 bytes` to store 8 digits instead of `8 bytes`.

Until here am I right or wrong?

Now how am I storing this data in a string of 4 `unsigned char`s? I'm not looking for an explicit answer just a kick start to understand the motivation.

-
Yes, you can save your digits like this. A `char` would contain `c = digit1 + 16*digit2` (or similar). To extract the digits, you'd use `digit1 = c % 16; digit2 = c / 16`. – Carsten Aug 27 '13 at 9:51
That is called packed BCD, it used to be rather common but is less so now. You could also consider converting it to a proper integer. – harold Aug 27 '13 at 9:52
@Carsten Ain't I supposed to convert the number to it's binary form using bitshifting from left to right? – Quaker Aug 27 '13 at 9:52
Adding to @Carsten: Also digit1 = c & 0xf ; digit2 = c >> 4. – Don't You Worry Child Aug 27 '13 at 9:53
@Quaker You could, but the math stays the same. Shifting 4 bits to the left is the same as multiplying by 16 (also see nishant's comment). – Carsten Aug 27 '13 at 9:55

There are three obvious ways to store eight decimal digits in four eight-bit values.

One is to reduce each decimal digit to four bits and to store two four-bit values in eight bits.

Another is to combine each pair of decimal digits to make a number from 0 to 99 and store that number in eight bits.

Another is to combine all eight decimal digits to make a number from 0 to 99999999 and store that in 32 bits, treating the four eight-bit values as one 32-bit integer.

To decide between these, consider what operations you need to perform to encode the value (what arithmetic or bit operations are needed to combine two digits to make the encoded value) and what operations you need to perform to decode the value (given eight bits, how do you get the digits out of them?).

To evaluate this problem, you should know about the basic arithmetic operations and the bit operations such as bit-wise AND and OR, shifting bits, using “masks” with AND operations, and so on. It may also help to know that division and remainder are usually more time-consuming operations than other arithmetic and bit operations on modern computers.

-

I prefer you use `unsigned int` as suggested by harold in comments. In `unsigned char[4]` you may require additional one char for terminating `'\0'` character.

Use shifting as you yourself suggested for proper conversion from uchar to uint.

-
Assuming I had to convert 9 number, I should have converted number by number from right to left with leading 0's on the left. right? – Quaker Aug 27 '13 at 10:09
@Quaker: Yeah, you will convert `"9"` (a string) to `0009` in int. – Don't You Worry Child Aug 27 '13 at 10:11
I actually have to do it using `uchar`s but I think I got the idea – Quaker Aug 27 '13 at 10:12
@Quaker : uchar will make one thing easy: you will not need to go "right to left" you can use '\0' terminator of uncompressed number string as your end point of conversion. – Don't You Worry Child Aug 27 '13 at 10:15
I'm not sure I have to use the `'\0'` terminator since it's only saved as `uchar` for storing purposes. whenever one wants to use the data it will be converted back to a string of chars. – Quaker Aug 27 '13 at 10:16