Hexadecimal Numbering Explained

What the Hex is Going on Here?

You may or may not have heard the term ones and zeros when people talk about computers or try to act "techy". What they are referring to is the binary numbering system which computers use to function with 1 representing on and 0 representing off. An example of a binary number might look like 0110010110.


But binary numbers aren't the only game in town. There is another numbering system that is use by computers that serves a similar purpose and that is the hexadecimal numbering system or hex for short. With the increased usage of IPv6 addresses you will be seeing even more of the hexadecimal numbering system if you are an IT administrator so now is the time to get used to it.


In the computing world, hexadecimal numbering is used for such things as MAC addresses and memory addresses. It is used to represent large numbers in a smaller, easier to read format. An example of a hexadecimal number would look something like 2FE4C0 which is 001011111110010011000000 in binary value. As you can see it's a lot easier to read, remember or write down 2FE4C0 compared to 001011111110010011000000! The hex number 2FE4C0 can also be represented as 3,138,752 in decimal value. Here is a table that shows the conversions for the 16 hex values to binary and to decimal.




Hexadecimal


Binary


Decimal



0


0000


0



1


0001


1



2


0010


2



3


0011


3



4


0100


4



5


0101


5



6


0110


6



7


0111


7



8


1000


8



9


1001


9



A


1010


10



B


1011


11



C


1100


12



D


1101


13



E


1110


14



F


1111


15







The hexadecimal numbering system is a base 16 system divided up into groups of 4 bits (called a nibble), and since we are used to 0-9 for our decimal numbering system we use the letters A-F to represent the numbers from 11 to 15 to make up 16 values in total (0-F). The word hexadecimal actually translates to the word sixteen. As you can see in the table above that the hexadecimal values go from 0 to F and the decimal equivalents go from 0 to 15. You might have noticed that a 4 digit binary number can be represented by one hex number which can greatly reduce how long a value representation needs to be.


The reason hexadecimal numbers are able to be used to represent very large numbers is because each value in the hex number is worth 16 times as much as the value to the right of it compared to 10 times the value with the base 10 decimal system. And yes the values increment from right to left just like with binary (which is a base 2 system) so it will look something like 167 166 165 164 163 162 161 160and so on. As you can see these values can get pretty large the more left you go.


160 = 1

161 = 16

162 = 256

163 = 4096

164 = 65536

165 = 1048576

166 = 16777216

167 = 268435456


So what happens if you want to go higher than the decimal value of 15? In that case the chart would start to look like this.




Decimal


Hexadecimal


Binary



15


F


1111



16


10


0001 0000



17


11


0001 0001



18


12


0001 0010



19


13


0001 0011



20


14


0001 0100



21


15


0001 0101



22


16


0001 0110



23


17


0001 0001



24


18


0001 0010



25


19


0001 0011



26


1A


0001 1010



27


1B


0001 1011



28


1C


0001 1100



29


1D


0001 1101



30


1E


0001 1110



31


1F


0001 1111



32


20


0010 0000







Keep in mind that just because decimal 16 is displayed as 10 doesn't mean that it's actually the number 10 but actually 1+0 and at the same time the decimal number 17 is really 1+1. This makes a little more sense if you compare the hex number to its binary equivalent. For example 1+0 in binary is really 0001 (for 1) and 0000 (for 0). As for the number 26 which is represented as 1A in hex, think of it as 1+10 since the decimal value for 1 is 1 in hex and the decimal value for 10 is A in hex and the hex numbering system goes 0-9 then starts at A-F so A comes after the 9 in 19. Then 1 in binary is 0001 and A in binary is 1010.


Hexadecimal numbering can be confusing just like binary numbering but once you play around with it a little and compare hex to binary to decimal things will make a little more sense. After you have the basic understanding you can then use online calculators to do your conversions or even the Windows calculator in programmer mode.





As you can see you can change the numbering scheme to the type you want such as hec, dec, oct or bin and then enter your number and it will convert it to all the other values making it easy to do the translations.