In today’s post, we take a deep dive into the two main approaches to storing fractional numbers in computers – fixed-point and floating point number representations.
Hexadecimal is the next most commonly used number base in computer science. In today’s post we take a look at this multi-purpose number base, examining the similarities between hexadecimal and number bases such as binary and decimal before learning some tricks in how to convert numbers to and from hexadecimal notation.
Division is probably the hardest of the four basic arithmetic operations. In this post we walk through an easy to follow, step-by-step process that you can use to divide any two binary numbers.
Welcome to the next post in my series on binary numbers and binary arithmetic. In todays post we’re again going to build on what we have learnt in my previous posts on binary addition and binary subtraction and see how we can perform multiplication in binary.
In previous posts we’ve seen how we can convert whole numbers from decimal to binary notation and back again. In this post, we build on this knowledge and look at how to convert between binary and decimal fractions.
Before we move on, I just wanted to take a moment to look at another peculiarity of using binary numbers, the concept of wrap-around or binary overflow.