# Checking whether a number is prime when encoded in unary/binary

The following algorithm checks whether a number is prime:

Given a number n,loop over all numbers smaller than n and check whether they divide n.

Now, I have to analyse the number of division operations performed by the algorithm as a function of the length of its input in the following two cases:

1) The number is encoded in unary (i.e, 4 is 1111). How do I show that the number of divisions is polynomial?

2) The number is encoded in binary (i.e, 4 is 100). How do I show that the number of divisions is exponential?

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Suppose we have n 1's strung together (notated 1^n). n is the length of our input, obviously. We will divide all the integers from 11, 111, ... ,1^(n-1) into 1^n. How many numbers will you be dividing into 1^n, as a function of n? Is this a polynomial?

Note that it takes log_2(x) (log base 2 of x) bits to represent x, approximately, in binary. Also note that we will be performing x-2 divisions (2, 3, 4, 5, ... , x-1 will be divided into x). So, for log_2(x) bits we use x-2 divisions. Suppose, instead, that we let n be the size of our input. So we have n = log_2(x). How many divisions will we take, then, in terms of a function of n?

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For the first one, we're dividing n-2 numbers, which is a polynomial. For the binary situation, isn't it still n-2? –  Sorin Cioban Apr 24 '12 at 22:51
@SorinCioban in binary the number of digits is our problem size. n digits encode 2^n magnitude value. –  Will Ness Apr 25 '12 at 12:45
@SorinCioban What is your definition of n in the binary situation: the number of bits of the input or the magnitude of the number? –  Words Like Jared Apr 25 '12 at 20:02
Yes, but we don't divide n to all the 2^n numbers, do we? We only divide them to the numbers that are smaller than n in both cases. –  Sorin Cioban Apr 26 '12 at 13:07
You didn't answer my question. Suppose x is the magnitude. It takes log_2(x) bits to represent x in base 2. Let f(x) be the number of divisions we have to do to x. f(x) = x-2 divisions, namely, 2, 3, ... , x-1. However our input is log_2(x) bits, which we will say is n. So if f(x) = x-2, and n = log_2(x), then x = 2^n. You should be able to figure out f(n), now, which will represent the number of divisions you need to do on an input of size n bits. –  Words Like Jared Apr 26 '12 at 13:43
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Hint:

Define the problem size n as being the number of digits in the (binary|unary) representation of the number.

Now consider how many different numbers you can encode in n digits.

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For the given example...4 in unary = 1111; in 4 digits we can only encode one number; in binary, in 4 digits we can encode 15 numbers. But we won't be dividing by the ones that are higher than our current one, so isn't the number of divisions = givenNumber-2 either way? –  Sorin Cioban Apr 24 '12 at 22:53