This question not probably not typical stackoverflow but am not sure where to ask this small question of mine.
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 $n = 5$