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Binary tutorial for begginers.
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This tutorial is for people with a base
knowledge that binary is ones and zeros.
Easy, right? The 1 represents an "on"
function, and the 0 represents an "off
function.
Decimal - Binary
-----------------------
I'm going to use the easiest method I can
think of in this tutorial.
~*~*~*~*~*~*~*~*~*~*~*~*~*~*~
Example: 129
now, count from the right ot left multiplying by
twos until you reach the lowest number closest
to the decimal you.
Example:
128 64 32 16 8 4 2 1
We start with the number 128.
Subtract the number from the decimal you wish to
convert.
EX/ _ 129
128 = 1
Now take that number and see if you can subtract
it from the other number in the row.
128? Yes, = 1
64? No
32? No
16? No
8? No
4? No
2? No
1? Yes
All the numbers that were subtractable are ones, and
the ones you were unable to subtract are zeros.
EX/
128 64 32 16 8 4 2 1
1 0 0 0 0 0 0 1
Answer:
Decimal 129 in Binary is: 10000001
*******************************************************
Binary to decimal
-----------------
No that we have the binary, how do we get it back to a
decimal? Incredibly simple.
Take the binary 10000001
no insert the numbers multiplied by two again, but not putting
anything for the zeros.
EX/ 1 0 0 0 0 0 0 1
128 x x x x x x 1
Now add the numbers together to get the decimal
128+1 = 129
Remember, the far left is always 128, and the far right is always 1
Let us take another random binary now, and try that again.
1 0 0 1 0 1 0 0
128 +16 + 4 = 148
- **********************************************************************
Remember, every ASCII character has a number, and with that decimal in
mind, you can speak letters etc in binary!
Below is a chart:
32   |143 � 
33 ! ! |144 � 
34 " " |145 � ‘
35 # # |146 � ’
36 $ $ |147 � “
37 % % |148 � ”
38 & & |149 � •
39 ' ' |150 � –
40 ( ( |151 � —
41 ) ) |152 � ˜
42 * * |153 � ™
43 + + |154 � š
44 , , |155 � ›
45 - - |156 � œ
46 . . |157 � 
47 / / |158 � ž
48 0 0 |159 � Ÿ
49 1 1 |160  
50 2 2 |161 � ¡
51 3 3 |162 � ¢
52 4 4 |163 � £
53 5 5 |164 � ¤
54 6 6 |165 � ¥
55 7 7 |166 � ¦
56 8 8 |167 � §
57 9 9 |168 � ¨
58 : : |169 � ©
59 ; ; |170 � ª
60 < < |171 � «
61 = = |172 � ¬
62 > > |173 � ­
63 ? ? |174 � ®
64 @ @ |175 � ¯
65 A A |176 � °
66 B B |177 � ±
67 C C |178 � ²
68 D D |179 � ³
69 E E |180 � ´
70 F F |181 � µ
71 G G |182 � ¶
72 H H |183 � ·
73 I I |184 � ¸
74 J J |185 � ¹
75 K K |186 � º
76 L L |187 � »
77 M M |188 � ¼
78 N N |189 � ½
79 O O |190 � ¾
80 P P |191 � ¿
81 Q Q |192 � 82 R R |193 � Á
83 S S |194 � Â
84 T T |195 � Ã
85 U U |196 � Ä
86 V V |197 � Å
87 W W |198 � Æ
88 X X |199 � Ç
89 Y Y |200 � È
90 Z Z |201 � É
91 [ [ |202 � Ê
92 \ \ |203 � Ë
93 ] ] |204 � Ì
94 ^ ^ |205 � Í
95 _ _ |206 � Î
96 ` ` |207 � Ï
97 a a |208 � Ð
98 b b |209 � Ñ
99 c c |210 � Ò
100 d d |211 � Ó
101 e e |212 � Ô
102 f f |213 � Õ
103 g g |214 � Ö
104 h h |215 � ×
105 i i |216 � Ø
106 j j |217 � Ù
107 k k |218 � Ú
108 l l |219 � Û
109 m m |220 � Ü
110 n n |221 � Ý
111 o o |222 � Þ
112 p p |223 � ß
113 q q |224 � à
114 r r |225 � á
115 s s |226 � â
116 t t |227 � ã
117 u u |228 � ä
118 v v |229 � å
119 w w |230 � æ
120 x x |231 � ç
121 y y |232 � è
122 z z |233 � é
123 { { |234 � ê
124 | | |235 � ë
125 } } |236 � ì
126 ~ ~ |237 � í
127  |238 � î
128 � € |239 � ï
129 �  |240 � ð
130 � ‚ |241 � ñ
131 � ƒ |242 � ò
132 � „ |243 � ó
133 � … |244 � ô
134 � † |245 � õ
135 � ‡ |246 � ö
136 � ˆ |247 � ÷
137 � ‰ |248 � ø
138 � Š |249 � ù
139 � ‹ |250 � ú
140 � Œ |251 � û
141 �  |252 � ü
142 � Ž |253 � ý
143 �  |254 � þ
------------------------------------------------------------
Adding binary
--------------
adding binary is very simple.
simply take the two numbers you wish to add, put one on top
of the other, and then add.
Using the simple rules:
1+0=1
0+1=1
0+0=0
1+1=0 (and carry the 1 to the next space to the left)
EX/ 00000010 (2)
+ 00000011 (3)
= 00000101 (5)
---------------------------------------------------------------
And there you have it! A simple begginers mini course in binary.
Not the greatest text-file, but it works. :)
~*~*~*~*~~*~*
Written by
David Carlton - Resurgam
0100100101100110001000000111100101101111011101010010000001100011011000010110111000100000011100100110010101100001011001000010000001110100011010000110100101110011001000000111100101101111011101010010000001100001011100100110010100100000011011110111011001100101011100100110010101100100011101010110001101100001011101000110010101100100