# Why does the number of bits in the binary representation of decimal number 16 == 5?

This question not probably not typical stackoverflow but am not sure where to ask this small question of mine.

Problem:

Find the number of bits in the binary representation of decimal number 16?

Now I tried to solve this one using the formula \$2^n = 16 \Rightarrow n = 4\$ but the correct answer as suggested by my module is 5. Could anybody explain how ?

After reading some answer,(and also I have 10 more mints before I could accept the correct answer)I think this is probably an explanation,that will be consistent to the mathematical formula,

For representing 16 we need to represent 17 symbols (0,16), hence \$2^n = 17 \Rightarrow n = 4.08746\$ but as n need to be an integer then \$n = 5\$

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"the answer seems to be 5"? What does this mean? Could anybody explain? –  S.Lott Dec 16 '10 at 11:29
I suppose you just need to understand that Ceil(log2(num)) gives you the number of bits required to express "num" numbers. Not the number "num". The difference is 1 :P –  Noon Silk Dec 16 '10 at 12:06
How many digits do you need to express the decimal representation of 100? –  Tom Anderson Apr 30 '12 at 22:00

Think of how binary works:

``````Bit 1: Add 1
``````

Thus 16 would be: 10000

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Thank you very much. –  Quixotic Dec 16 '10 at 11:32

With 4 bits, you can represent numbers from 0 to 15.

So yes, you need 5 bits to represent 16.

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``````Decimal - 16 8 4 2 1
Binary -   1 0 0 0 0
``````

So for anything up to decimal 31 you only need 5 bits.

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