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1/10(decimal) = 0.0001100110011... (binary)

How do I do that? Am I supposed to convert to binary and then divide? Could someone show me?

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Can you expand on what you mean by "binary"? "Converting to binary" doesn't really make sense. Are you trying to convert the result of a division operation to a floating-point number? –  Michael Petrotta Feb 13 '11 at 21:59
    
@Michael Petrotta- I think he means how you express a fraction in base 2 as a (possibly repeating) decimal. –  templatetypedef Feb 13 '11 at 22:01
    

3 Answers 3

up vote 32 down vote accepted

In university I learned it this way:

  1. Multiply by two
  2. take decimal as the digit
  3. take the fraction as the starting point for the next step
  4. repeat until you either get to 0 or a periodic number
  5. read the number starting from the top - the first result is the first digit after the comma

Example:

0.1 * 2 = 0.2 -> 0
0.2 * 2 = 0.4 -> 0
0.4 * 2 = 0.8 -> 0
0.8 * 2 = 1.6 -> 1
0.6 * 2 = 1.2 -> 1
0.2 * 2 = 0.4 -> 0
0.4 * 2 = 0.8 -> 0
0.8 * 2 = 1.6 -> 1
0.6 * 2 = 1.2 -> 1
Result: 0.00011(0011) periodic.
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Where are you getting 0.1,0.2, 0.4, 0.8, 0.6, etc..? –  Strawberry Feb 13 '11 at 22:23
    
From the previous row, it is the result. The first row takes the input (in case of this example, 0.1). Just follow the instructions. –  Femaref Feb 13 '11 at 22:25
    
Thank you Fermaref! –  Strawberry Feb 13 '11 at 22:34
    
irritate's answer below shows why this works –  Nathan Fellman Jan 23 at 12:30
    
Excellent answer. You may be interested to know that this method is not restricted to conversion to binary but will also work for other bases (octal and hexadecimal). Here is an example converting 0.1 to octal: 0.1 * 8 = 0.8 -> 0 0.8 * 8 = 6.4 -> 6 0.4 * 8 = 3.2 -> 3 0.2 * 8 = 1.6 -> 1 –  GoofyBall Feb 12 at 0:22

This may be somewhat confusing, but the decimal positions in binary would represent reciprocals of powers of two (e.g., 1/2, 1/4, 1/8, 1/16, for the first, second, third and fourth decimal place, respectively) just as in decimal, decimal places represent reciprocals of successive powers of ten.

To answer your question, you would need to figure out what reciprocals of powers of two would need to be added to add up to 1/10. For example:

1/16 + 1/32 = 0.09375, which is pretty close to 1/10. Adding 1/64 puts us over, as does 1/128. But, 1/256 gets us closer still. So:

0.00011001 binary = 0.09765625 decimal, which is close to what you asked.

You can continue adding more and more digits, so the answer would be 0.00011001...

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 1              1
-- (dec)  =   ---- (bin)
10            1010


       0.000110011...
      -------------
1010 | 1.0000000000
         1010
       ------
         01100
          1010
         -----
          0010000
             1010
            -----
             01100
              1010
             -----
              0010
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The long division actually shows why the algorithm in the accepted answer works. –  Nathan Fellman Jan 23 at 12:29

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