librrd4.symbols: Updated for 1.4~rc2+200909281.

[pkg-rrdtool.git] / doc / bin_dec_hex.txt

BIN_DEC_HEX(1)                      rrdtool                     BIN_DEC_HEX(1)



N\bNA\bAM\bME\bE
       bin_dec_hex - How to use binary, decimal, and hexadecimal notation.

D\bDE\bES\bSC\bCR\bRI\bIP\bPT\bTI\bIO\bON\bN
       Most people use the decimal numbering system. This system uses ten
       symbols to represent numbers. When those ten symbols are used up, they
       start all over again and increment the position to the left. The digit
       0 is only shown if it is the only symbol in the sequence, or if it is
       not the first one.

       If this sounds cryptic to you, this is what I've just said in numbers:

            0
            1
            2
            3
            4
            5
            6
            7
            8
            9
           10
           11
           12
           13

       and so on.

       Each time the digit nine is incremented, it is reset to 0 and the
       position before (to the left) is incremented (from 0 to 1). Then number
       9 can be seen as "00009" and when we should increment 9, we reset it to
       zero and increment the digit just before the 9 so the number becomes
       "00010". Leading zeros we don't write except if it is the only digit
       (number 0). And of course, we write zeros if they occur anywhere inside
       or at the end of a number:

        "00010" -> " 0010" -> " 010" -> "  10", but not "  1 ".

       This was pretty basic, you already knew this. Why did I tell it?  Well,
       computers usually do not represent numbers with 10 different digits.
       They only use two different symbols, namely "0" and "1". Apply the same
       rules to this set of digits and you get the binary numbering system:

            0
            1
           10
           11
          100
          101
          110
          111
         1000
         1001
         1010
         1011
         1100
         1101

       and so on.

       If you count the number of rows, you'll see that these are again 14
       different numbers. The numbers are the same and mean the same as in the
       first list, we just used a different representation. This means that
       you have to know the representation used, or as it is called the
       numbering system or base.  Normally, if we do not explicitly specify
       the numbering system used, we implicitly use the decimal system. If we
       want to use any other numbering system, we'll have to make that clear.
       There are a few widely adopted methods to do so. One common form is to
       write 1010(2) which means that you wrote down a number in its binary
       representation. It is the number ten. If you would write 1010 without
       specifying the base, the number is interpreted as one thousand and ten
       using base 10.

       In books, another form is common. It uses subscripts (little
       characters, more or less in between two rows). You can leave out the
       parentheses in that case and write down the number in normal characters
       followed by a little two just behind it.

       As the numbering system used is also called the base, we talk of the
       number 1100 base 2, the number 12 base 10.

       Within the binary system, it is common to write leading zeros. The
       numbers are written down in series of four, eight or sixteen depending
       on the context.

       We can use the binary form when talking to computers
       (...programming...), but the numbers will have large representations.
       The number 65'535 (often in the decimal system a ' is used to separate
       blocks of three digits for readability) would be written down as
       1111111111111111(2) which is 16 times the digit 1.  This is difficult
       and prone to errors. Therefore, we usually would use another base,
       called hexadecimal. It uses 16 different symbols. First the symbols
       from the decimal system are used, thereafter we continue with
       alphabetic characters. We get 0, 1, 2, 3, 4, 5, 6, 7, 8, 9, A, B, C, D,
       E and F. This system is chosen because the hexadecimal form can be
       converted into the binary system very easily (and back).

       There is yet another system in use, called the octal system. This was
       more common in the old days, but is not used very often anymore. As you
       might find it in use sometimes, you should get used to it and we'll
       show it below. It's the same story as with the other representations,
       but with eight different symbols.

        Binary      (2)
        Octal       (8)
        Decimal     (10)
        Hexadecimal (16)

        (2)    (8) (10) (16)
        00000   0    0    0
        00001   1    1    1
        00010   2    2    2
        00011   3    3    3
        00100   4    4    4
        00101   5    5    5
        00110   6    6    6
        00111   7    7    7
        01000  10    8    8
        01001  11    9    9
        01010  12   10    A
        01011  13   11    B
        01100  14   12    C
        01101  15   13    D
        01110  16   14    E
        01111  17   15    F
        10000  20   16   10
        10001  21   17   11
        10010  22   18   12
        10011  23   19   13
        10100  24   20   14
        10101  25   21   15

       Most computers used nowadays are using bytes of eight bits. This means
       that they store eight bits at a time. You can see why the octal system
       is not the most practical for that: You'd need three digits to
       represent the eight bits and this means that you'd have to use one
       complete digit to represent only two bits (2+3+3=8). This is a waste.
       For hexadecimal digits, you need only two digits which are used
       completely:

        (2)      (8)  (10) (16)
        11111111 377  255   FF

       You can see why binary and hexadecimal can be converted quickly: For
       each hexadecimal digit there are exactly four binary digits.  Take a
       binary number: take four digits from the right and make a hexadecimal
       digit from it (see the table above). Repeat this until there are no
       more digits. And the other way around: Take a hexadecimal number. For
       each digit, write down its binary equivalent.

       Computers (or rather the parsers running on them) would have a hard
       time converting a number like 1234(16). Therefore hexadecimal numbers
       are specified with a prefix. This prefix depends on the language you're
       writing in. Some of the prefixes are "0x" for C, "$" for Pascal, "#"
       for HTML.  It is common to assume that if a number starts with a zero,
       it is octal. It does not matter what is used as long as you know what
       it is. I will use "0x" for hexadecimal, "%" for binary and "0" for
       octal.  The following numbers are all the same, just their
       representation (base) is different: 021 0x11 17 %00010001

       To do arithmetics and conversions you need to understand one more
       thing.  It is something you already know but perhaps you do not "see"
       it yet:

       If you write down 1234, (no prefix, so it is decimal) you are talking
       about the number one thousand, two hundred and thirty four. In sort of
       a formula:

        1 * 1000 = 1000
        2 *  100 =  200
        3 *   10 =   30
        4 *    1 =    4

       This can also be written as:

        1 * 10^3
        2 * 10^2
        3 * 10^1
        4 * 10^0

       where ^ means "to the power of".

       We are using the base 10, and the positions 0,1,2 and 3.  The right-
       most position should NOT be multiplied with 10. The second from the
       right should be multiplied one time with 10. The third from the right
       is multiplied with 10 two times. This continues for whatever positions
       are used.

       It is the same in all other representations:

       0x1234 will be

        1 * 16^3
        2 * 16^2
        3 * 16^1
        4 * 16^0

       01234 would be

        1 * 8^3
        2 * 8^2
        3 * 8^1
        4 * 8^0

       This example can not be done for binary as that system only uses two
       symbols. Another example:

       %1010 would be

        1 * 2^3
        0 * 2^2
        1 * 2^1
        0 * 2^0

       It would have been easier to convert it to its hexadecimal form and
       just translate %1010 into 0xA. After a while you get used to it. You
       will not need to do any calculations anymore, but just know that 0xA
       means 10.

       To convert a decimal number into a hexadecimal you could use the next
       method. It will take some time to be able to do the estimates, but it
       will be easier when you use the system more frequently. We'll look at
       yet another way afterwards.

       First you need to know how many positions will be used in the other
       system. To do so, you need to know the maximum numbers you'll be using.
       Well, that's not as hard as it looks. In decimal, the maximum number
       that you can form with two digits is "99". The maximum for three:
       "999". The next number would need an extra position. Reverse this idea
       and you will see that the number can be found by taking 10^3 (10*10*10
       is 1000) minus 1 or 10^2 minus one.

       This can be done for hexadecimal as well:

        16^4 = 0x10000 = 65536
        16^3 =  0x1000 =  4096
        16^2 =   0x100 =   256
        16^1 =    0x10 =    16

       If a number is smaller than 65'536 it will fit in four positions.  If
       the number is bigger than 4'095, you must use position 4.  How many
       times you can subtract 4'096 from the number without going below zero
       is the first digit you write down. This will always be a number from 1
       to 15 (0x1 to 0xF). Do the same for the other positions.

       Let's try with 41'029. It is smaller than 16^4 but bigger than 16^3-1.
       This means that we have to use four positions.  We can subtract 16^3
       from 41'029 ten times without going below zero.  The left-most digit
       will therefore be "A", so we have 0xA????.  The number is reduced to
       41'029 - 10*4'096 = 41'029-40'960 = 69.  69 is smaller than 16^3 but
       not bigger than 16^2-1. The second digit is therefore "0" and we now
       have 0xA0??.  69 is smaller than 16^2 and bigger than 16^1-1. We can
       subtract 16^1 (which is just plain 16) four times and write down "4" to
       get 0xA04?.  Subtract 64 from 69 (69 - 4*16) and the last digit is 5
       --> 0xA045.

       The other method builds up the number from the right. Let's try 41'029
       again.  Divide by 16 and do not use fractions (only whole numbers).

        41'029 / 16 is 2'564 with a remainder of 5. Write down 5.
        2'564 / 16 is 160 with a remainder of 4. Write the 4 before the 5.
        160 / 16 is 10 with no remainder. Prepend 45 with 0.
        10 / 16 is below one. End here and prepend 0xA. End up with 0xA045.

       Which method to use is up to you. Use whatever works for you.  I use
       them both without being able to tell what method I use in each case, it
       just depends on the number, I think. Fact is, some numbers will occur
       frequently while programming. If the number is close to one I am
       familiar with, then I will use the first method (like 32'770 which is
       into 32'768 + 2 and I just know that it is 0x8000 + 0x2 = 0x8002).

       For binary the same approach can be used. The base is 2 and not 16, and
       the number of positions will grow rapidly. Using the second method has
       the advantage that you can see very easily if you should write down a
       zero or a one: if you divide by two the remainder will be zero if it is
       an even number and one if it is an odd number:

        41029 / 2 = 20514 remainder 1
        20514 / 2 = 10257 remainder 0
        10257 / 2 =  5128 remainder 1
         5128 / 2 =  2564 remainder 0
         2564 / 2 =  1282 remainder 0
         1282 / 2 =   641 remainder 0
          641 / 2 =   320 remainder 1
          320 / 2 =   160 remainder 0
          160 / 2 =    80 remainder 0
           80 / 2 =    40 remainder 0
           40 / 2 =    20 remainder 0
           20 / 2 =    10 remainder 0
           10 / 2 =     5 remainder 0
            5 / 2 =     2 remainder 1
            2 / 2 =     1 remainder 0
            1 / 2 below 0 remainder 1

       Write down the results from right to left: %1010000001000101

       Group by four:

        %1010000001000101
        %101000000100 0101
        %10100000 0100 0101
        %1010 0000 0100 0101

       Convert into hexadecimal: 0xA045

       Group %1010000001000101 by three and convert into octal:

        %1010000001000101
        %1010000001000 101
        %1010000001 000 101
        %1010000 001 000 101
        %1010 000 001 000 101
        %1 010 000 001 000 101
        %001 010 000 001 000 101
           1   2   0   1   0   5 --> 0120105

        So: %1010000001000101 = 0120105 = 0xA045 = 41029
        Or: 1010000001000101(2) = 120105(8) = A045(16) = 41029(10)
        Or: 1010000001000101(2) = 120105(8) = A045(16) = 41029

       At first while adding numbers, you'll convert them to their decimal
       form and then back into their original form after doing the addition.
       If you use the other numbering system often, you will see that you'll
       be able to do arithmetics directly in the base that is used.  In any
       representation it is the same, add the numbers on the right, write down
       the right-most digit from the result, remember the other digits and use
       them in the next round. Continue with the second digit from the right
       and so on:

           %1010 + %0111 --> 10 + 7 --> 17 --> %00010001

       will become

           %1010
           %0111 +
            ||||
            |||+-- add 0 + 1, result is 1, nothing to remember
            ||+--- add 1 + 1, result is %10, write down 0 and remember 1
            |+---- add 0 + 1 + 1(remembered), result = 0, remember 1
            +----- add 1 + 0 + 1(remembered), result = 0, remember 1
                   nothing to add, 1 remembered, result = 1
        --------
          %10001 is the result, I like to write it as %00010001

       For low values, try to do the calculations yourself, then check them
       with a calculator. The more you do the calculations yourself, the more
       you'll find that you didn't make mistakes. In the end, you'll do
       calculi in other bases as easily as you do them in decimal.

       When the numbers get bigger, you'll have to realize that a computer is
       not called a computer just to have a nice name. There are many
       different calculators available, use them. For Unix you could use "bc"
       which is short for Binary Calculator. It calculates not only in
       decimal, but in all bases you'll ever want to use (among them Binary).

       For people on Windows: Start the calculator
       (start->programs->accessories->calculator) and if necessary click
       view->scientific. You now have a scientific calculator and can compute
       in binary or hexadecimal.

A\bAU\bUT\bTH\bHO\bOR\bR
       I hope you enjoyed the examples and their descriptions. If you do, help
       other people by pointing them to this document when they are asking
       basic questions. They will not only get their answer, but at the same
       time learn a whole lot more.

       Alex van den Bogaerdt  <alex@vandenbogaerdt.nl>



1.3.999                           2009-07-12                    BIN_DEC_HEX(1)