Suppose we have some arbitrary positive number x
.
Is there a method to represent its inverse in binary or x
's inverse is 1/x
 how does one express that in binary?
e.g. x=5 //101
x
's inverse is 1/x
, it's binary form is ...?
Suppose we have some arbitrary positive number Is there a method to represent its inverse in binary or e.g. 


You'd find it the same way you would in decimal form: long division. There is no shortcut just because you are in another base, although long division is significantly simpler. Here is a very nice explanation of long division applied to binary numbers. Although, just to let you know, most floatingpoint systems on today's machines do very fast division for you. 


In general, the only practical way to "express in binary" an arbitrary fraction is as a pair of integers, numerator and denominator  "floating point", the most commonly used (and hardware supported) binary representation of noninteger numbers, can represent exactly on those fractions whose denominator (when the fraction is reduced to the minimum terms) is a power of two (and, of course, only when the fixed number of bits allotted to the representation is sufficient for the number we'd like to represent  but, the latter limitation will also hold for any fixedsize binary representation, including the simplest ones such as integers). 


Knock yourself out if you want higher accuracy/precision. 


Another form of multiplicative inverse takes advantage of the modulo nature of integer arithmetic as implemented on most computers; in your case the 32 bit value 11001100110011001100110011001101 (858993459 signed int32 or 3435973837 unsigned int32) when multiplied by 5 equals 1 (mod 4294967296). Only values which are coprime with the power of two the modulo operates on have such multiplicative inverses. 


If you just need the first few bits of a binary fraction number, this trick will give you those bits: 

