BINARY CONVERSION

1-48 BINARY CONVERSION Earlier in this chapter, we mentioned that the octal and hex number systems are useful to computer programmers. It is much easier to provide data to a computer in one or the other of these systems. Likewise, it is important to be able to convert data from the computer into one or the other number systems for ease of understanding the data. Binary to Octal Look at the following numbers: 10111001001101₂ 27115₈ You can easily see that the octal number is much easier to say. Although the two numbers look completely different, they are equal. Since 8 is equal to 2³, then one octal digit can represent three binary digits, as shown below: With the use of this principle, the conversion of a binary number is quite simple. As an example, follow the conversion of the binary number at the beginning of this section. Write out the binary number to be converted. Starting at the radix point and moving left, break the binary number into groups of three as shown. This grouping of binary numbers into groups of three is called binary-coded octal (BCO). Add 0s to the left of any MSD that will fill a group of three: Next, write down the octal equivalent of each group: