**You are at the section Welcome to the Unofficial The Eight is Enough Section**
## D.T.'s Fun With Math-Eight

**Facts About The Number Eight**
This is how much there is:

# ********

This is how it is represented in octal:

**10**
The one on the left is how many eights there are and the zero on the right
is how many ones there are. To get the decimal representation, just multiply
the digit in the eights place by eight, and add that to the number of ones
in the ones place:

**1*8+0=8**
Remember, there are no 8's or 9's as digits in an octal, or base-8
system.

*Base eight is like base ten ... if you're missing two fingers* --- Tom
Lehrer from his novelty tune *New Math*

This is how it is represented in binary:

**1000**
The rightmost digit is how many ones there are, the one just to the left
is how many twos there are, the one just to the left of that is how many
fours there are, or **2^2**'s there are, and the one on the far left
is how many eights there are, or **2^3**'s there are.

You multiply each of the digits by the place they're slotted like this:

**1*2^3+0*2^2+0*2+0=8**
Remember, just like in a computer, there are only zeros and ones, nothing
else.

This is how it is represented in hex:

**8**
The first ten numbers of base ten is the same as those of base hex, so see the
number ten for how to use it.
How to get the number 8 by adding two digits:

**7+1**

# ******* + *

**6+2**

# ****** + **

**5+3**

# ***** + ***

**4+4**

# **** + ****

**NOTE: You can also reverse the digits ****7+1** to get **1+7** and it will
still be **8**; same with **6+2** and **5+3**; try it yourself and see.
How to get the number 8 by subtracting two digits:

**9-1**

# ******** - *

**10-2**

# ********* - **

**12-4**

# *********** - ****

Do you see a pattern developing? If you increase the first part of **9-1 (9)** by
one and you also do the same with the second part **(1)**, you still get **8**.
Even if you have gotten up to **2,355,665,488-2,355,665,480** it will still
get **8**. Go ahead and try it with even higher numbers.
How to get the number 8 by multiplying two digits:

**4*2**

# **** & ****

Two rows of **4** added together produce **8**, because **4*2** is **4** added to
itself twice like this: **4+4**. Likewise, **2*4** is also **8** because you are adding
four **2**'s together like this: **2+2+2+2**, or like this:
# ** & ** & ** & **

How to get the number 8 by dividing two digits:

**16/2**

# ******** / ********

You originally have **16** balls, and you split it into **2** piles, you get
**8** in each pile. Now, that is the same as dividing **8** into one pile, as
in **8/1=8**, but **16/2=8**, so is **32/4=8**, even **65,536/8,192=8**. How could this
be? Simple. The dividend on the left and the divisor in the middle are
multiplied by the same factor from the original **8/1** fraction so that the
ratio is always **8:1**, or simply **8**.
How to get the number 8 by powering two digits:

**2^3**

# **

# **

# ****

The **2** in the **2^3** is the base and the **3** is the exponent, meaning how many
bases should be multiplied by each other. Thus, **2^3** can be represented
as **2*2*2**, where you multiply the first twos together to get **4**, then you
multiply that result by the last two to get **8**; Hence: **(2*2)*2=4*2=8**.

If **2^3=8**, does **3^2=8** also? Let's see here:

**3^2=3*3=9**
Does **8=9**? No. Therefore, **2^3<>3^2**.
How to get the number 8 by rooting two digits:

**64 SQR 2**

********

********

********

********

********

********

********

********

You can see that if you take **64** of something and arrange it so that
its contents are a perfect square, you will get exactly **8** rows of
**8** colums of balls. You can also imagine that you can get **8** if
you take the cube root of **512**. Since this computer cannot display balls
in 3-D, you'll have to get that many blocks, and build a base **8** by
**8** and stack the blocks **8** high. You'll use exactly **512**
blocks to build that perfect cube.

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