# Calculating the total number of possibilities in binary?

How would you calculate the total number of possibilities that binary can have in one byte?

`00000000` through `11111111` = `num_of_possibilities`

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lol.. it is a simple question, even then. ;) – Chris Kemp Feb 22 '11 at 0:15
Now, be nice, you were a beginner once too. – Charlie Martin Feb 22 '11 at 0:17
I'm not a beginner. I'm just having a really bad brainf***. Heh. – user238033 Feb 22 '11 at 0:25
Everybody's a beginner. Just not all about the same things. – Charlie Martin Feb 22 '11 at 1:18

The total number is 2 to the power of the number of bits. So, eight bits has 28 possible values.

If you really mean "how to compute it", consider that each bit has two possible values.

So one bit implies 2 values.

Two bits has one set of two values of each possible value of the other bit, so

``````00
01
10
11
``````

which means a total of 4 (= 2×2) values.

Three bits gives four values twice, or 8 (=4×2) values. Four bits, 8×2; five bits, 16×2, and so on.

So eight bits is 2×2×2×2×2×2×2×2 or 256.

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And, as a freebie, base-2 logarithms are how you go the other way and figure out how many bits you need to represent a given number of combinations. – ssokolow Feb 22 '11 at 0:15
Oh wow. I feel like such a moron right now! I was just talking to my friend telling him I was having a brainf*** and I couldn't figure this out. Well thanks anyways. – user238033 Feb 22 '11 at 0:23
Nah, don't fret about it. As they say, memory's the second thing to go. – Charlie Martin Feb 22 '11 at 1:17

It is a simple question: The number of possibilities is 2n where n is the number of bits.

So for 1 byte, which is 8 bits, there are 28 possibilites, 256.

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There are several methods:

• 2^n where n is the number of bits (2^8) Each bit has 2 possibilities.
• Unsigned value of all 1's + 1 (255 + 1) Count up from 0 to max value (all ones) + zero.
• Build a tree where each leaf is the sum of the values to right and left of the new value from the row above. Possibilities is sum of row having n+1 entries. (2 ( 1 + 8 + 28 + 56 ) + 70) Each value is probability of that number of bits from 0 to n.
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