# Python Set Comprehension

So I have these two problems for a homework assignment and I'm stuck on the second one.

1. Use a Python Set Comprehension (Python's equivalent of Set Builder notation) to generate a set of all of the prime numbers that are less than 100. Recall that a prime number is an integer that is greater than 1 and not divisible by any integer other than itself and 1. Store your set of primes in a variable (you will need it for additional parts). Output your set of primes (e.g., with the print function).

2. Use a Python Set Comprehension to generate a set of ordered pairs (tuples of length 2) consisting of all of the prime pairs consisting of primes less than 100. A Prime Pair is a pair of consecutive odd numbers that are both prime. Store your set of Prime Pairs in a variable. Your set of number 1 will be very helpful. Output your Set of Prime Pairs.

For the first one, this works perfectly:

``````r= {x for x in range(2, 101)
if not any(x % y == 0 for y in range(2, x))}
``````

However, I'm pretty stumped on the second one. I think I may have to take the Cartesian product of the set r with something but I'm just not sure.

This gets me somewhat close but I just want the consecutive pairs.

``````cart = { (x, y) for x in r for y in r
if x < y }
``````

Any help is greatly appreciated, thanks.

-

``````primes = {x for x in range(2, 101) if all(x%y for y in range(2, min(x, 11)))}
``````

I simplified the test a bit - `if all(x%y` instead of `if not any(not x%y`

I also limited y's range; there is no point in testing for divisors > sqrt(x). So max(x) == 100 implies max(y) == 10. For x <= 10, y must also be < x.

``````pairs = {(x, x+2) for x in primes if x+2 in primes}
``````

Instead of generating pairs of primes and testing them, get one and see if the corresponding higher prime exists.

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at first expression you are missing one closing bracket – mastier Oct 1 '15 at 22:19

You can get clean and clear solutions by building the appropriate predicates as helper functions. In other words, use the Python set-builder notation the same way you would write the answer with regular mathematics set-notation.

The whole idea behind set comprehensions is to let us write and reason in code the same way we do mathematics by hand.

With an appropriate predicate in hand, problem 1 simplifies to:

`````` low_primes = {x for x in range(1, 100) if is_prime(x)}
``````

And problem 2 simplifies to:

`````` low_prime_pairs = {(x, x+2) for x in range(1,100,2) if is_prime(x) and is_prime(x+2)}
``````

Note how this code is a direct translation of the problem specification, "A Prime Pair is a pair of consecutive odd numbers that are both prime."

P.S. I'm trying to give you the correct problem solving technique without actually giving away the answer to the homework problem.

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Although problem 2 can be simplified to just looping over the result frim problem 1, as hinted in the instructions. – tripleee Feb 14 '14 at 5:30

You can generate pairs like this:

``````{(x, x + 2) for x in r if x + 2 in r}
``````

Then all that is left to do is to get a condition to make them prime, which you have already done in the first example.

A different way of doing it: (Although slower for large sets of primes)

``````{(x, y) for x in r for y in r if x + 2 == y}
``````
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I'm not sure why your better way is better. The OP already has the primes less than 100 in `r`, so `{(x, x + 2) for x in r if x + 2 in r}` suffices. – DSM Feb 14 '14 at 4:43
You are right, I misread his code. Thanks. – icedtrees Feb 14 '14 at 4:44
`and x % 2 == 1` is not necessary. – thefourtheye Feb 14 '14 at 4:46
fixed, thank you, for some reason I thought that primes could be even – icedtrees Feb 14 '14 at 4:52
For some reason, I don't see which ones are missing. I get set([(29, 31), (59, 61), (5, 7), (71, 73), (41, 43), (3, 5), (17, 19), (11, 13)]). Which pairs are missing? You already applied the condition (of being prime) to r, so the code should be okay. – icedtrees Feb 14 '14 at 5:00