# Interview - Size of an Integer [closed]

I just just had a phone interview and they asked me this question:

"What is the size of an integer, and, what is the equation to work this out?"

I had no idea (Ok, I'm a bit stupid) but it just intrigues me to find out the answer. My person guess was count up in base 2.. But I dunno.

Anyone have any ideas?

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## closed as not a real question by Matt Ball, bmargulies, Chris Gerken, lserni, GravitonNov 6 '12 at 2:37

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

It entirely depends. The question is not well-posed. Were they asking about a specific data type in a specific language? How many bits it takes to represent some decimal number? Something else? – Matt Ball Nov 5 '12 at 17:57
@MattBall Just the size of an Integer, that is all they asked. I was confused to hell! – Phorce Nov 5 '12 at 17:58
Then you should have asked for clarification, because there is no correct answer to a question this vague. – Matt Ball Nov 5 '12 at 18:03
The probably wanted you to ask for clarification. They probably phrased the question vaguely to see if you could hunt down exactly what they were after. Also they probably wanted to see what you know about standard int sizes in various systems, and the min size to store an int of a certain range. ( log_2(MAX_VALUE) ) for unisgned int – gbtimmon Nov 5 '12 at 18:44

It seems like the question was asked to make you ask them:

• What is the largest value that you want the integer type to encode?

Let's assume they said we want MAX_VALUE to be the maximum value an integer type can have.

This brings us to the equation. Since we are encoding it using bits we need log_2(MAX_VALUE) bits to encode any positive value of size up to MAX_VALUE. The logarithm of base 2 is there because with a bit pattern of size n you can encode up to 2^n different values. So if you want to know how long your maximum bit pattern needs to be to encode MAX_VALUE you need to calculate the log since:

2^(log_2(MAX_VALUE)) = MAX_VALUE

Now this is okay, unless you also want to encode the number 0. If you want to encode 0 as well then there are MAX_VALUE+1 numbers between 0 and MAX_VALUE so you need log_2(MAX_VALUE+1) bits to encode them all.

Another important question is what is the MIN_VALUE that we want to encode?

So in total you have MAX_VALUE + 1 + abs(MIN_VALUE) different values, so you will need :

bits_needed = log_2(MAX_VALUE + 1 + abs(MIN_VALUE))

As others have mentioned, in java int has max_value = 2,147,483,647 and min_value = -2,147,483,648. When you do the calculation you get log_2(4294967296) which is equal to 32. So 32 bits is the size of the integer type in java.

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The question is not clear, are you looking for integer bit-size for different programming languages? or you want to know the MAX value of int.

BTW, in java int is 32 bits and max is 2^31-1=2,147,483,647

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I think he asked for the range of integer. in Java, the size is 4 bytes, so should range from -2^31 to 2^31-1? Since he asked for the equation.

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