Announcing Stack Overflow Documentation

We started with Q&A. Technical documentation is next, and we need your help.

Whether you're a beginner or an experienced developer, you can contribute.

Sign up and start helping → Learn more about Documentation →

So I'm working on some homework and am completely stumped by this current question.

Assume that there are 73 students in your class. If every student is to be assigned a unique bit pattern, what is the minimum number of bits to this? And Why?

I don't know how to get the solution to this, is it 73!? If not how do I determine this solution


share|improve this question
ceiling(log base 2 (73)) – Ghost Feb 7 '14 at 1:35
basic thought pattern: (2 to the power of X) >= 73, where X is an integer. solve for x – Marc B Feb 7 '14 at 1:35
Write 73 in binary, that amount of digits is your answer. – Kevin Bowersox Feb 7 '14 at 1:36
Ok, I kind of had an idea that it would be something like 2^7 but wasn't 100% sure. – kevorski Feb 7 '14 at 1:37
Sorry wont answer a HW question, but a good hint is that you can never have a set of bits that can represent 73 exactly even if a bit can be more than 0 or 1. For example if each bit could be 0, 1, 2, 3, 4, or 5 or any other number less than 73 it would still be impossible to get exactly 73. Of course something that can do more than 73 is easy...hint hint – Jason Feb 7 '14 at 1:37
up vote 2 down vote accepted

There are some elegant mathematical solutions in the comments, but think of it like this:

1 bit gives you two possible bit patterns.
2 bits gives you four
3 bits gives you eight

Continue in the same vein until you have a number of bit patterns larger than the number of students.

share|improve this answer

You have to be able to represent 73 numbers in binary. You can easily notice, that there are 73 numbers in range [0, 72], so you need as many bits as you have to have to represent the number 72 in binary.

2^6 = 64 < 72 < 128 = 2^7

so you need 7 bits to represent 73 different numbers.

share|improve this answer

Since bits can simply be thought of as binary digits, we can convert the base-10 72 to the base-2 1001000 and determine our answer, which is the number of digits in this base-2 number, 7. To get the number 72, take into account that we can assign the number 0 to one of the students.

Another way to get the answer is to find the smallest n for which 2^n > 73.

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.