Difference between revisions of "Euler problems/51 to 60"

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== [http://projecteuler.net/index.php?section=view&id=51 Problem 51] ==
 +
== [http://projecteuler.net/index.php?section=problems&id=51 Problem 51] ==
 
Find the smallest prime which, by changing the same part of the number, can form eight different primes.
  
Find the smallest prime which, by changing the same part of the number, can form eight different primes.
   
 
Solution:
  
Solution:
  +
  +
millerRabinPrimality on the [[Prime_numbers]] page
  +
 
<haskell>
  
<haskell>
  +
isPrime x
import List
  
  +
|x==3=True
primes = 2 : filter ((==1) . length . primeFactors) [3,5..]
  
  +
|otherwise=millerRabinPrimality x 2
 
primeFactors n = factor n primes
  
where
  
factor _ [] = []
  
factor m (p:ps) | p*p > m = [m]
  
| m `mod` p == 0 = p : factor (m `div` p) (p:ps)
  
| otherwise = factor m ps
  
 
isPrime 1 = 0
  
isPrime n = case (primeFactors n) of
  
(_:_:_) -> 0
  
_ -> 1
  
 
ch='1'
  
ch='1'
 
numChar n= sum [1|x<-show(n),x==ch]
  
numChar n= sum [1|x<-show(n),x==ch]
Line 23: Line 15:
 
|otherwise=c
  
|otherwise=c
 
nextN repl n= (+0)$read $map repl $show n
 
nextN repl n= (+0)$read $map repl $show n
same n= [isPrime$nextN (replace a) n |a<-['1'..'9']]
 +
same n= [if isPrime$nextN (replace a) n then 1 else 0|a<-['1'..'9']]
 
problem_51=head [n|
  
problem_51=head [n|
 
n<-[100003,100005..999999],
  
n<-[100003,100005..999999],
Line 31: Line 23:
 
</haskell>
  
</haskell>
   
== [http://projecteuler.net/index.php?section=view&id=52 Problem 52] ==
 +
== [http://projecteuler.net/index.php?section=problems&id=52 Problem 52] ==
 
Find the smallest positive integer, x, such that 2x, 3x, 4x, 5x, and 6x, contain the same digits in some order.
  
Find the smallest positive integer, x, such that 2x, 3x, 4x, 5x, and 6x, contain the same digits in some order.
   
 
Solution:
  
Solution:
 
<haskell>
  
<haskell>
  +
import List
problem_52 =
 
  +
head [n | n <- [1..],
  
  +
has_same_digits a b = (show a) \\ (show b) == []
digits (2*n) == digits (3*n),
  
  +
digits (3*n) == digits (4*n),
  
  +
check n = all (has_same_digits n) (map (n*) [2..6])
digits (4*n) == digits (5*n),
  
  +
digits (5*n) == digits (6*n)
  
  +
problem_52 = head $ filter check [1..]
]
  
where
 
digits = sort . show
  
 
</haskell>
  
</haskell>
   
== [http://projecteuler.net/index.php?section=view&id=53 Problem 53] ==
 +
== [http://projecteuler.net/index.php?section=problems&id=53 Problem 53] ==
 
How many values of C(n,r), for 1 ≤ n ≤ 100, exceed one-million?
  
How many values of C(n,r), for 1 ≤ n ≤ 100, exceed one-million?
   
 
Solution:
  
Solution:
 
<haskell>
  
<haskell>
  +
facs = scanl (*) 1 [1..100]
problem_53 =
 
  +
comb (r,n) = facs!!n `div` (facs!!r * facs!!(n-r))
length [n | n <- [1..100], r <- [1..n], n `choose` r > 10^6]
  
  +
perms = [(n,x) | x<-[1..100], n<-[1..x]]
where
 
  +
problem_53 = length $ filter (>1000000) $ map comb $ perms
n `choose` r
  
| r > n || r < 0 = 0
  
| otherwise = foldl (\z j -> z*(n-j+1) `div` j) n [2..r]
  
 
</haskell>
  
</haskell>
   
== [http://projecteuler.net/index.php?section=view&id=54 Problem 54] ==
 +
== [http://projecteuler.net/index.php?section=problems&id=54 Problem 54] ==
 
How many hands did player one win in the [http://www.pokerroom.com poker games]?
  
How many hands did player one win in the [http://www.pokerroom.com poker games]?
   
Line 68: Line 56:
   
 
<haskell>
  
<haskell>
import Data.List (sort, sortBy, tails, lookup, groupBy)
 +
import Data.List
import Data.Maybe (fromJust)
 +
import Data.Maybe
  +
import Control.Monad
  +
  +
readCard [r,s] = (parseRank r, parseSuit s)
  +
where parseSuit = translate "SHDC"
  +
parseRank = translate "23456789TJQKA"
  +
translate from x = fromJust $ elemIndex x from
  +
  +
solveHand hand = (handRank,tiebreak)
  +
where
  +
handRank
  +
| flush && straight = 9
  +
| hasKinds 4 = 8
  +
| all hasKinds [2,3] = 7
  +
| flush = 6
  +
| straight = 5
  +
| hasKinds 3 = 4
  +
| 1 < length (kind 2) = 3
  +
| hasKinds 2 = 2
  +
| otherwise = 1
  +
tiebreak = kind =<< [4,3,2,1]
  +
hasKinds = not . null . kind
  +
kind n = map head $ filter ((n==).length) $ group ranks
  +
ranks = sortBy (flip compare) $ map fst hand
  +
flush = 1 == length (nub (map snd hand))
  +
straight = length (kind 1) == 5 && 4 == head ranks - last ranks
 
 
  +
gameLineToHands = splitAt 5 . map readCard . words
data Hand = HighCard | OnePair | TwoPairs | ThreeOfKind |
  
  +
p1won (a,b) = solveHand a > solveHand b
Straight | Flush | FullHouse | FourOfKind | StraightFlush
  
  +
deriving (Show, Read, Enum, Eq, Ord)
  
  +
problem_54 = do
 
  +
f <- readFile "poker.txt"
values :: [(Char, Int)]
  
  +
let games = map gameLineToHands $ lines f
values = zip ['2','3','4','5','6','7','8','9','T','J','Q','K','A'] [1..]
  
  +
wins = filter p1won games
 
  +
print $ length wins
value :: String -> Int
  
value (c:cs) = fromJust $ lookup c values
  
 
suites :: [[Char]]
  
suites = map sort $ take 9 $ map (take 5) $ tails cards
  
 
cards :: [Char]
  
cards = ['2','3','4','5','6','7','8','9','T','J','Q','K','A']
  
 
flush :: [String] -> Bool
  
flush = a . extractSuit
  
where
  
a (x:y:xs) = x == y && a (y:xs)
  
a _ = True
  
extractSuit = map s
  
where
  
s (_:y:ys) = y
  
 
straight :: [String] -> Bool
  
straight = a . extractValues
 
where
  
a xs = any (==(sort xs)) suites
  
extractValues = map v
  
where
  
v (x:xs) = x
  
 
groupByKind :: [String] -> [[String]]
  
groupByKind = sortBy l . groupBy g . sortBy s
  
where
  
s (a) (b) = compare (value b) (value a)
  
g (a:_) (b:_) = a == b
  
l a b = compare (length b) (length a)
  
 
guessHand :: [String] -> Hand
  
guessHand cards
  
| straight cards && flush cards = StraightFlush
  
| length g1 == 4 = FourOfKind
  
| length g1 == 3 && length g2 == 2 = FullHouse
  
| flush cards = Flush
  
| straight cards = Straight
  
| length g1 == 3 = ThreeOfKind
  
| length g1 == 2 && length g2 == 2 = TwoPairs
  
| length g1 == 2 = OnePair
  
| otherwise = HighCard
  
where
  
g = groupByKind cards
  
g1 = head g
  
g2 = head $ tail g
  
 
playerOneScore :: ([String], [String]) -> Int
  
playerOneScore (p1, p2)
  
| a == b = compare p1 p2
  
| a > b = 1
  
| otherwise = 0
  
where
  
a = guessHand p1
  
b = guessHand p2
  
compare p1 p2 =
  
if ((map value $ concat $ groupByKind p1) >
  
(map value $ concat $ groupByKind p2))
  
then 1
 
else 0
  
 
problem_54 :: String -> Int
  
problem_54 = sum . map (\x -> playerOneScore $ splitAt 5 $ words x) . lines
  
main=do
  
a<-readFile "poker.txt"
  
print $problem_54 a
  
 
</haskell>
  
</haskell>
   
== [http://projecteuler.net/index.php?section=view&id=55 Problem 55] ==
 +
== [http://projecteuler.net/index.php?section=problems&id=55 Problem 55] ==
 
How many Lychrel numbers are there below ten-thousand?
  
How many Lychrel numbers are there below ten-thousand?
   
 
Solution:
  
Solution:
 
<haskell>
  
<haskell>
  +
reverseNum = read . reverse . show
problem_55 =
 
  +
length $ filter isLychrel [1..9999]
  
  +
palindrome x =
where
 
  +
sx == reverse sx
isLychrel n = all notPalindrome (take 50 (tail (iterate revadd n)))
  
  +
where
notPalindrome s = (show s) /= reverse (show s)
  
revadd n = n + rev n
 +
sx = show x
  +
where
 
  +
lychrel =
rev n = read (reverse (show n))
  
  +
not . any palindrome . take 50 . tail . iterate next
  +
where
  +
next x = x + reverseNum x
  +
  +
problem_55 = length $ filter lychrel [1..10000]
 
</haskell>
  
</haskell>
   
== [http://projecteuler.net/index.php?section=view&id=56 Problem 56] ==
 +
== [http://projecteuler.net/index.php?section=problems&id=56 Problem 56] ==
 
Considering natural numbers of the form, a<sup>b</sup>, finding the maximum digital sum.
  
Considering natural numbers of the form, a<sup>b</sup>, finding the maximum digital sum.
   
 
Solution:
  
Solution:
 
<haskell>
  
<haskell>
  +
digitalSum 0 = 0
  +
digitalSum n =
  +
let (d,m) = quotRem n 10 in m + digitalSum d
  +
 
problem_56 =
 
problem_56 =
maximum [dsum (a^b) | a <- [1..99], b <-[1..99]]
 +
maximum [digitalSum (a^b) | a <- [99], b <- [90..99]]
where
  
dsum 0 = 0
  
dsum n = let ( d, m ) = n `divMod` 10 in m + ( dsum d )
  
 
</haskell>
  
</haskell>
   
  +
Alternate solution:
== [http://projecteuler.net/index.php?section=view&id=57 Problem 57] ==
  
  +
<haskell>
  +
import Data.Char (digitToInt)
  +
  +
digiSum :: Integer -> Int
  +
digiSum = sum . map digitToInt . show
  +
  +
problem_56 :: Int
  +
problem_56 = maximum $ map digiSum [a^b | a <- [1..100], b <- [1..100]]
  +
</haskell>
  +
  +
== [http://projecteuler.net/index.php?section=problems&id=57 Problem 57] ==
 
Investigate the expansion of the continued fraction for the square root of two.
  
Investigate the expansion of the continued fraction for the square root of two.
   
 
Solution:
  
Solution:
 
<haskell>
  
<haskell>
  +
twoex = zip ns ds
  +
where
  +
ns = 3 : zipWith (\x y -> x + 2 * y) ns ds
  +
ds = 2 : zipWith (+) ns ds
  +
  +
len = length . show
  +
 
problem_57 =
 
problem_57 =
length $ filter topHeavy $ take 1000 convergents
+
length $ filter (\(n,d) -> len n > len d) $ take 1000 twoex
where
 
topHeavy r = numDigits (numerator r) > numDigits (denominator r)
  
numDigits = length . show
  
convergents = iterate next (3%2)
  
next r = 1 + 1/(1+r)
  
 
</haskell>
  
</haskell>
   
  +
The following solution is based on the observation that the fractions needed appear regularly in the repeating pattern _______$____$ where underscores are ignored and dollars are interesting fractions.
== [http://projecteuler.net/index.php?section=view&id=58 Problem 58] ==
  
Investigate the number of primes that lie on the diagonals of the spiral grid.
  
   
Solution:
  
 
<haskell>
  
<haskell>
base :: (Integral a) => [a]
 +
calc :: Int -> Int
  +
calc n = nd13 * 2 + ((n-nd13*13) `div` 8)
base = base' 2
  
 
where
  
where
base' n = n:n:n:n:(base' $ n + 2)
 +
nd13 = n `div` 13
   
  +
problem_57 :: Int
pascal = scanl (+) 1 base
  
  +
problem_57 = calc 1000
  +
</haskell>
   
  +
== [http://projecteuler.net/index.php?section=problems&id=58 Problem 58] ==
ratios :: [Integer] -> [Double]
  
  +
Investigate the number of primes that lie on the diagonals of the spiral grid.
ratios (x:xs) = 1.0 : ratios' 0 1 xs
  
where
  
ratios' n d (w:x:y:z:xs) =
  
((fromInteger num)/(fromInteger den)) : (ratios' num den xs)
  
where
  
num = (p w + p x + p y + p z + n)
  
den = (d + 4)
  
p n = case isPrime n of
  
True -> 1
  
False -> 0
  
   
  +
Solution:
  +
<haskell>
  +
isPrime x
  +
|x==3=True
  +
|otherwise=and [millerRabinPrimality x n|n<-[2,3]]
  +
diag = 1:3:5:7:zipWith (+) diag [8,10..]
 
problem_58 =
 
problem_58 =
fst $ head $ dropWhile (\(_,a) -> a > 0.1) $
 +
result $ dropWhile tooBig $ drop 2 $ scanl primeRatio (0,0) diag
  +
where
zip [1,3..] (ratios pascal)
  
  +
primeRatio (n,d) num = (if d `mod` 4 /= 0 && isPrime num then n+1 else n,d+1)
  +
tooBig (n,d) = n*10 >= d
  +
result ((_,d):_) = (d+2) `div` 4 * 2 + 1
 
</haskell>
  
</haskell>
   
== [http://projecteuler.net/index.php?section=view&id=59 Problem 59] ==
 +
== [http://projecteuler.net/index.php?section=problems&id=59 Problem 59] ==
 
Using a brute force attack, can you decrypt the cipher using XOR encryption?
  
Using a brute force attack, can you decrypt the cipher using XOR encryption?
   
 
Solution:
  
Solution:
 
<haskell>
  
<haskell>
import Data.Bits (xor)
 +
import Data.Bits
import Data.Char (toUpper, ord, chr)
 +
import Data.Char
import Data.List (sortBy)
 +
import Data.List
  +
import Data.Ord (comparing)
 
  +
common :: [String]
  
  +
keys = [ [a,b,c] | a <- [97..122], b <- [97..122], c <- [97..122] ]
common = ["THE","OF","TO","AND","YOU","THAT","WAS","FOR","WORD"]
  
  +
allAlpha = all (\k -> let a = ord k in (a >= 32 && a <= 122))
 
  +
howManySpaces = length . filter (==' ')
keys :: [[Int]]
  
  +
keys = [a:b:c:[]|
 
  +
problem_59 = do
a <- [ord 'a' .. ord 'z'],
 
  +
s <- readFile "cipher1.txt"
b <- [ord 'a' .. ord 'z'],
 
  +
let
c <- [ord 'a' .. ord 'z']
  
  +
cipher = (read ("[" ++ s ++ "]") :: [Int])
]
  
  +
decrypts = [ map chr (zipWith xor (cycle key) cipher) | key <- keys ]
 
  +
alphaDecrypts = filter allAlpha decrypts
brute :: [Int] -> [Int] -> ([Int], Int)
  
  +
message = maximumBy (comparing howManySpaces) alphaDecrypts
brute text key = (key, score)
  
  +
asciisum = sum (map ord message)
where
  
  +
print asciisum
score = sum $ map (\x -> if (any (==x) common) then 1 else 0)
  
(words $ map toUpper $ decrypt key text)
  
 
decrypt :: [Int] -> [Int] -> String
  
decrypt key text = [chr (t `xor` k)|(t,k) <- zip text (cycle key)]
  
 
problem_59 :: String -> Int
  
problem_59 text = sum $ map ord $ decrypt bestKey b
  
where
  
b = map read $ words $ map (\x -> if x == ',' then ' ' else x) text
  
bestKey = fst $ head $
  
sortBy (\(_,s1) (_,s2) -> compare s2 s1) $
  
map (brute b) $ keys
  
 
</haskell>
  
</haskell>
   
== [http://projecteuler.net/index.php?section=view&id=60 Problem 60] ==
 +
== [http://projecteuler.net/index.php?section=problems&id=60 Problem 60] ==
 
Find a set of five primes for which any two primes concatenate to produce another prime.
  
Find a set of five primes for which any two primes concatenate to produce another prime.
   
Line 262: Line 215:
 
Breadth first search that works on infinite lists. Breaks the 60 secs rule. This program finds the solution in 185 sec on my Dell D620 Laptop.
  
Breadth first search that works on infinite lists. Breaks the 60 secs rule. This program finds the solution in 185 sec on my Dell D620 Laptop.
 
<haskell>
  
<haskell>
  +
problem_60 = print$sum $head solve
import Data.List
  
  +
isPrime x = x==3 || millerRabinPrimality x 2
import Data.Maybe
  
  +
 
  +
solve = do
primes :: [Integer]
  
  +
a <- primesTo10000
primes = 2 : filter (l1 . primeFactors) [3,5..]
  
  +
let m = f a $ dropWhile (<= a) primesTo10000
where
  
  +
b <- m
l1 (_:[]) = True
  
  +
let n = f b $ dropWhile (<= b) m
l1 _ = False
  
  +
c <- n
 
  +
let o = f c $ dropWhile (<= c) n
primeFactors :: Integer -> [Integer]
  
  +
d <- o
primeFactors n = factor n primes
  
  +
let p = f d $ dropWhile (<= d) o
where
  
  +
e <- p
factor _ [] = []
  
  +
return [a,b,c,d,e]
factor m (p:ps) | p*p > m = [m]
  
  +
where
| m `mod` p == 0 = p : factor (m `div` p) (p:ps)
  
  +
f x = filter (\y -> and [isPrime $read $shows x $show y,
| otherwise = factor m ps
  
  +
isPrime $read $shows y $show x])
 
  +
primesTo10000 = 2:filter isPrime [3,5..9999]
isPrime :: Integer -> Bool
  
isPrime 1 = False
  
isPrime n = case (primeFactors n) of
  
(_:[]) -> True
  
_ -> False
  
 
combine :: (Show a, Ord a) => [[a]] -> [[a]]
  
combine ls = combine' [] ls
  
where
  
combine' seen (x:xs) = mapMaybe m seen ++ combine' (seen ++ [x]) xs
  
where
  
c y = group $ sort $ y ++ x
  
d y = map head $ filter l1 $ c y
  
h y = map head $ c y
  
t (x:y:[]) = test x y
  
t _ = False
  
l1 (x:[]) = True
  
l1 _ = False
  
m y
  
| t $ d y = Just $ h y
  
| otherwise = Nothing
  
 
test a b
  
| isPrime c1 && isPrime c2 = True
  
| otherwise = False
  
where
  
c1 = read $ (show a) ++ (show b)
  
c2 = read $ (show b) ++ (show a)
  
 
problem_60 :: Integer
  
problem_60 =
 
sum $ head $ nub $ combine $
  
nub $ combine $ nub $ combine $
  
combine [[x]| x <- primes]
  
 
</haskell>
  
</haskell>

Latest revision as of 00:17, 17 February 2010

Problem 51

Find the smallest prime which, by changing the same part of the number, can form eight different primes.

Solution:

millerRabinPrimality on the Prime_numbers page 

isPrime x
    |x==3=True
    |otherwise=millerRabinPrimality x 2
ch='1'
numChar n= sum [1|x<-show(n),x==ch]
replace d c|c==ch=d
           |otherwise=c
nextN repl n= (+0)$read $map repl $show n  
same n= [if isPrime$nextN (replace a) n then 1 else 0|a<-['1'..'9']]
problem_51=head [n|
    n<-[100003,100005..999999],
    numChar n==3,
    (sum $same n)==8
    ]

Problem 52

Find the smallest positive integer, x, such that 2x, 3x, 4x, 5x, and 6x, contain the same digits in some order.

Solution: 

import List
 
has_same_digits a b = (show a) \\ (show b) == []
 
check n = all (has_same_digits n) (map (n*) [2..6])
 
problem_52 = head $ filter check [1..]

Problem 53

How many values of C(n,r), for 1 ≤ n ≤ 100, exceed one-million?

Solution: 

facs = scanl (*) 1 [1..100]
comb (r,n) = facs!!n `div` (facs!!r * facs!!(n-r))
perms = [(n,x) | x<-[1..100], n<-[1..x]]
problem_53 = length $ filter (>1000000) $ map comb $ perms

Problem 54

How many hands did player one win in the poker games?

Solution:

probably not the most straight forward way to do it. 

import Data.List
import Data.Maybe
import Control.Monad

readCard [r,s] = (parseRank r, parseSuit s)
 where parseSuit = translate "SHDC"
       parseRank = translate "23456789TJQKA"
       translate from x = fromJust $ elemIndex x from

solveHand hand = (handRank,tiebreak)
 where
 handRank
  | flush && straight   = 9
  | hasKinds 4          = 8
  | all hasKinds [2,3]  = 7
  | flush               = 6
  | straight            = 5
  | hasKinds 3          = 4
  | 1 < length (kind 2) = 3
  | hasKinds 2          = 2
  | otherwise           = 1
 tiebreak = kind =<< [4,3,2,1]
 hasKinds = not . null . kind
 kind n = map head $ filter ((n==).length) $ group ranks
 ranks  = sortBy (flip compare) $ map fst hand
 flush  = 1 == length (nub (map snd hand))
 straight = length (kind 1) == 5 && 4 == head ranks - last ranks
 
gameLineToHands = splitAt 5 . map readCard . words
p1won (a,b) = solveHand a > solveHand b

problem_54 = do
    f <- readFile "poker.txt"
    let games = map gameLineToHands $ lines f
        wins = filter p1won games
    print $ length wins

Problem 55

How many Lychrel numbers are there below ten-thousand?

Solution: 

reverseNum = read . reverse . show
 
palindrome x =
    sx == reverse sx
    where
    sx = show x 

lychrel = 
    not . any palindrome . take 50 . tail . iterate next
    where
    next x = x + reverseNum x
 
problem_55 = length $ filter lychrel [1..10000]

Problem 56

Considering natural numbers of the form, ab, finding the maximum digital sum.

Solution: 

digitalSum 0 = 0
digitalSum n = 
    let (d,m) = quotRem n 10 in m + digitalSum d 
 
problem_56 = 
    maximum [digitalSum (a^b) | a <- [99], b <- [90..99]]

Alternate solution: 

import Data.Char (digitToInt)

digiSum :: Integer -> Int
digiSum = sum . map digitToInt . show

problem_56 :: Int
problem_56 = maximum $ map digiSum [a^b | a <- [1..100], b <- [1..100]]

Problem 57

Investigate the expansion of the continued fraction for the square root of two.

Solution: 

twoex = zip ns ds 
    where
    ns = 3 : zipWith (\x y -> x + 2 * y) ns ds
    ds = 2 : zipWith (+) ns ds
 
len = length . show
 
problem_57 = 
    length $ filter (\(n,d) -> len n > len d) $ take 1000 twoex

The following solution is based on the observation that the fractions needed appear regularly in the repeating pattern _______$____$ where underscores are ignored and dollars are interesting fractions. 

calc :: Int -> Int
calc n = nd13 * 2 + ((n-nd13*13) `div` 8)
    where
      nd13 = n `div` 13

problem_57 :: Int
problem_57 = calc 1000

Problem 58

Investigate the number of primes that lie on the diagonals of the spiral grid.

Solution: 

isPrime x
    |x==3=True
    |otherwise=and [millerRabinPrimality x n|n<-[2,3]]
diag = 1:3:5:7:zipWith (+) diag [8,10..]
problem_58 = 
    result $ dropWhile tooBig $ drop 2 $ scanl primeRatio (0,0) diag
    where
    primeRatio (n,d) num = (if d `mod` 4 /= 0 && isPrime num then n+1 else n,d+1)
    tooBig (n,d) = n*10 >= d
    result ((_,d):_) = (d+2) `div` 4 * 2 + 1

Problem 59

Using a brute force attack, can you decrypt the cipher using XOR encryption?

Solution: 

import Data.Bits
import Data.Char
import Data.List
import Data.Ord (comparing)
 
keys = [ [a,b,c] | a <- [97..122], b <- [97..122], c <- [97..122] ]
allAlpha = all (\k -> let a = ord k in (a >= 32 && a <= 122))
howManySpaces = length . filter (==' ')
 
problem_59 = do
	s <- readFile "cipher1.txt"
	let 
		cipher = (read ("[" ++ s ++ "]") :: [Int])
		decrypts = [ map chr (zipWith xor (cycle key) cipher) | key <- keys ]
		alphaDecrypts = filter allAlpha decrypts
		message = maximumBy (comparing howManySpaces) alphaDecrypts
		asciisum = sum (map ord message)
	print asciisum

Problem 60

Find a set of five primes for which any two primes concatenate to produce another prime.

Solution:

Breadth first search that works on infinite lists. Breaks the 60 secs rule. This program finds the solution in 185 sec on my Dell D620 Laptop. 

problem_60 = print$sum $head solve 
isPrime x = x==3 || millerRabinPrimality x 2 
 
solve = do
 a <- primesTo10000
 let m = f a $ dropWhile (<= a) primesTo10000
 b <- m
 let n = f b $ dropWhile (<= b) m
 c <- n
 let o = f c $ dropWhile (<= c) n
 d <- o
 let p = f d $ dropWhile (<= d) o
 e <- p
 return [a,b,c,d,e]
 where
 f x = filter (\y -> and [isPrime $read $shows x $show y,
                 isPrime $read $shows y $show x])
primesTo10000 = 2:filter isPrime [3,5..9999]
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