# A Brief Explanation of Hexadecimal Numbers

style = “font-color:#FF33CC“>

*SAY WHAT?*

When you are working with computers, and especially the Internet and the Web, you will eventually run into things like the above – – – Hexadecimal (HEX) Numbers.

In HTML and other programming/scripting languages these represent a color for display on-screen. If you are building a website and you want a certain color text on the page, for example, you will need to use the appropriate color code or HEX code to make that happen.

The following will not pretend to make you a Hex math genius, but we will explain just what those funny letters mean.

When people evolved, they did so with ten fingers. *(Yes we do have a few folks down in Horsepasture with 11 fingers and 12 toes, but that’s social commentary, not math.)*

Since we have ten fingers, and since early man probably used them as the first counting device, we learned to count in TENs. DECI, Latin for Ten, gave birth to the term DECImal.

Decimal numbers are based on POWERS of Ten.

Since everything is based on Tens, we only need Ten Digits to represent every possible number.

*1, 2, 3, 4, 5, 6, 7, 8, 9, 0*

So, let’s start counting up from Zero in Decimal and see how it works . . .

0-1-2-3-4-5-6-7-8-9-? *OOPS* – We’re Out of Digits!

Since we ran out of digits, we need to do a bit of trickery to represent numbers higher than 9.

What we do is start over with Zero as the right most digit, and put a One (1) to it’s left of it: 10 – 11 – 12 … 18 – 19 – etc.

We keep doing this until we run out of digits again at 19. We start over at Zero on the right, and increase the digit to its left by One.

Note: The Romans had no number for, or possibly didn’t even have the the concept of Zero

The “Decimal Place Holders” are all Powers of Ten

The right-most digit tells us how many ONES are in the number.

The next digit to the left tells us how many TENS, the next, how many HUNDREDS, etc.

How the Average Brain “Decodes” a *Decimal* Number

Let’s take the number

14,728

To “Decode” this number, the brain subconsciously goes . . .

There is One Ten Thousand, Four One Thousands, Seven One Hundreds, Two Tens and Eight Ones.

Add them all together and you get 14,728

**That’s how modern number systems work!**

Your brain does all of the above decoding automatically and easily since everyone Knows their “Tens”

*A fact, A question and A Conclusion.*

Fact:For reasons best left to people with Pocket Protectors and no personal skills, computers like to “Think” in groups ofEIGHTdigits instead of Ten.

Question:What if people had evolved with Eight fingers per hand instead of Five?

Conclusion:We would have developeda number system based on powers of Sixteenrather than powers of Ten

THAT is exactly what the HEXadecimal number system is, a number system based on Sixteen and not Ten.

Hexadecimal (Hex) Numbers are based upon Powers of 16

Let’s start counting upwards from Zero **in Hex **. . .

0 – 1 – 2 – 3 – 4 – 5 – 6 – 7 – 8 – 9 – ? OOPS – We’re out of Digits again.

This time, however, we don’t do the add a Zero and scoot stuff over ** until we get to 16.**

Q: But where do we get the additional numbers beyond Nine so we can keep counting?

A: We Don’t – we use the letters A through F

.as if they were numbers

See the chart below.

The first Twenty Hexadecimal Numbers Are: 1, 2, 3, 4, 5, 6, 7, 8, 9, A, B, C, D, E, F, 10, 11, 12, 13 14

**Let’s Decode the Hex Number F2A4C Which Equals Decimal 993,868**

How the Nerd Brain (or more likely, calculator) Decodes a Hex Number

To “Decode” this number, the nerd brain consciously thinks like this:

**IF YOU’RE LOST, DON’T FRET OVER IT!**

There’s no need to take pencil in hand to figure this stuff out.

Should you ever have the need to convert one to the other, you’ll find handy Hex/Decimal calculators included with Windows, Mac OS and Linux. Shown above is the Windows Advanced Calculator.

Also, at the moment,** it’s only important that you have a passing familiarity with this** (and the Binary – Powers of Two) number system.

Let’s Examine a Typical Web Browser Color Code.

## color = “#FF33CC“

In our discussion of Hexadecimal Color Codes we explained that the above is called a TRIPLET, or group of THREE Numbers. (FF, 33 and cc)

Colors are specified by how much RED (from Zero to 255), Green (from Zero to 255) and Blue (from Zero to 255) are in the final color.

**We must, however, specify these color values in Hex, because that’s what computers (or at least Web Browsers) understand.**

FF 33 CC Is Therefore . . .

FF(Hex) = 255 (Decimal) Points ofRed(All the Red There Is)

33(Hex) = 51 (Decimal) Points ofGreen

CC(Hex) = 204 (Decimal) Points ofBlue

The Result Is This Color

Again please let me state that in the beginning, * you only need a passing familiarity with these number systems*.

At least you should no longer be intimidated when some piece of software asks you to enter something in Hex.

**Interesting Fact:** The fact that computers use alternate number systems explains why 1K (1000) in Computerese is REALLY 1,024 and 4K (4000) is Really 4,096. We’re NOT working with even powers of Ten, but powers of Two

Nice explanation!

The part “How the Average Brain “Decodes” a Decimal Number” has a typo, the last row “8 x 1” should be “1 x 8”.

Thank you for the Eagle Eye.

Will put it in the ‘fix’ pile.

Egg

Pingback:How To Add Numbers In Hexadecimal | Information

Pingback:How To Add Hexadecimal Numbers | Information

Pingback:Bits and Bytes: ASCII and Unicode – The Education of a Farmboi

Pingback:Web Colors Introduction and Resources

I can relate. I was learning-screwed up. I could not do mental math. I had an elaborate system worked out on my fingers and toes! I could multiply. But now that I forget stuff anyway, I just use my calculator.