Difference between revisions of "Euler problems/1 to 10"
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(→[http://projecteuler.net/index.php?section=problems&id=5 Problem 5]: clarify remark) |
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Add all the natural numbers below 1000 that are multiples of 3 or 5. |
Add all the natural numbers below 1000 that are multiples of 3 or 5. |
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| + | Two solutions using <hask>sum</hask>: |
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| − | Solution: |
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| + | <haskell> |
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| + | import Data.List (union) |
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| + | problem_1' = sum (union [3,6..999] [5,10..999]) |
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| + | |||
| + | problem_1 = sum [x | x <- [1..999], x `mod` 3 == 0 || x `mod` 5 == 0] |
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| + | </haskell> |
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| + | |||
| + | Another solution which uses algebraic relationships: |
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| + | |||
<haskell> |
<haskell> |
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| − | problem_1 = |
+ | problem_1 = sumStep 3 999 + sumStep 5 999 - sumStep 15 999 |
| + | where |
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| + | sumStep s n = s * sumOnetoN (n `div` s) |
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| + | sumOnetoN n = n * (n+1) `div` 2 |
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</haskell> |
</haskell> |
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| Line 12: | Line 24: | ||
Solution: |
Solution: |
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<haskell> |
<haskell> |
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| − | problem_2 = sum [ x | x <- takeWhile (<= 1000000) fibs, x |
+ | problem_2 = sum [ x | x <- takeWhile (<= 1000000) fibs, even x] |
| + | where |
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| − | where fibs = 1 : 1 : zipWith (+) fibs (tail fibs) |
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| + | fibs = 1 : 1 : zipWith (+) fibs (tail fibs) |
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| + | </haskell> |
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| + | |||
| + | The following two solutions use the fact that the even-valued terms in |
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| + | the Fibonacci sequence themselves form a Fibonacci-like sequence |
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| + | that satisfies |
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| + | <hask>evenFib 0 = 0, evenFib 1 = 2, evenFib (n+2) = evenFib n + 4 * evenFib (n+1)</hask>. |
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| + | <haskell> |
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| + | problem_2 = sumEvenFibs $ numEvenFibsLessThan 1000000 |
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| + | where |
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| + | sumEvenFibs n = (evenFib n + evenFib (n+1) - 2) `div` 4 |
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| + | evenFib n = round $ (2 + sqrt 5) ** (fromIntegral n) / sqrt 5 |
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| + | numEvenFibsLessThan n = |
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| + | floor $ (log (fromIntegral n - 0.5) + 0.5*log 5) / log (2 + sqrt 5) |
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| + | </haskell> |
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| + | |||
| + | The first two solutions work because 10^6 is small. |
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| + | The following solution also works for much larger numbers |
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| + | (up to at least 10^1000000 on my computer): |
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| + | <haskell> |
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| + | problem_2 = sumEvenFibsLessThan 1000000 |
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| + | |||
| + | sumEvenFibsLessThan n = (a + b - 1) `div` 2 |
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| + | where |
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| + | n2 = n `div` 2 |
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| + | (a, b) = foldr f (0,1) |
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| + | . takeWhile ((<= n2) . fst) |
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| + | . iterate times2E $ (1, 4) |
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| + | f x y | fst z <= n2 = z |
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| + | | otherwise = y |
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| + | where z = x `addE` y |
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| + | addE (a, b) (c, d) = (a*d + b*c - 4*ac, ac + b*d) |
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| + | where ac=a*c |
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| + | |||
| + | times2E (a, b) = addE (a, b) (a, b) |
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</haskell> |
</haskell> |
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| Line 21: | Line 68: | ||
Solution: |
Solution: |
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<haskell> |
<haskell> |
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| + | primes = 2 : filter ((==1) . length . primeFactors) [3,5..] |
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| − | problem_3 = maximum [ x | x <- [1..round $ sqrt (fromInteger c)], c `mod` x == 0] |
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| + | |||
| − | where c = 317584931803 |
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| + | primeFactors n = factor n primes |
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| + | where |
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| + | factor n (p:ps) |
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| + | | p*p > n = [n] |
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| + | | n `mod` p == 0 = p : factor (n `div` p) (p:ps) |
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| + | | otherwise = factor n ps |
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| + | |||
| + | problem_3 = last (primeFactors 317584931803) |
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| + | </haskell> |
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| + | |||
| + | Another solution, not using recursion, is: |
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| + | <haskell> |
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| + | problem_3 = (m !! 0) `div` (m !! 1) |
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| + | where |
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| + | m = reverse $ |
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| + | takeWhile (<=n) (scanl1 (*) [ x | x <- 2:[3,5..], (n `mod` x) == 0 ]) |
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| + | n = 600851475143 |
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</haskell> |
</haskell> |
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| Line 30: | Line 94: | ||
Solution: |
Solution: |
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<haskell> |
<haskell> |
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| + | problem_4 = |
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| − | problem_4 = foldr max 0 [ x | y <- [100..999], z <- [100..999], let x = y * z, let s = show x, s == reverse s] |
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| + | maximum [x | y<-[100..999], z<-[y..999], let x=y*z, let s=show x, s==reverse s] |
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</haskell> |
</haskell> |
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| Line 38: | Line 103: | ||
Solution: |
Solution: |
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<haskell> |
<haskell> |
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| − | problem_5 = |
+ | problem_5 = foldr1 lcm [1..20] |
| − | </haskell> |
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| − | An alternative solution that takes advantage of the Prelude to avoid use of the generate and test idiom: |
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| − | <haskell> |
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| − | problem_5' = foldr1 lcm [1..20] |
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</haskell> |
</haskell> |
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| Line 49: | Line 110: | ||
Solution: |
Solution: |
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| + | <!-- |
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<haskell> |
<haskell> |
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| + | fun n = a - b |
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| − | problem_6 = sum [ x^2 | x <- [1..100]] - (sum [1..100])^2 |
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| + | where |
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| + | a=(n^2 * (n+1)^2) `div` 4 |
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| + | b=(n * (n+1) * (2*n+1)) `div` 6 |
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| + | |||
| + | problem_6 = fun 100 |
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| + | </haskell> |
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| + | --> |
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| + | <!-- Might just be me, but I find this a LOT easier to read. Perhaps not as good mathematically, but it runs in an instant, even for n = 25000. |
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| + | <haskell> |
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| + | fun n = a - b |
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| + | where |
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| + | a = (sum [1..n])^2 |
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| + | b = sum (map (^2) [1..n]) |
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| + | |||
| + | problem_6 = fun 100 |
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| + | </haskell> |
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| + | --> |
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| + | <!-- I just made it a oneliner... --> |
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| + | <haskell> |
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| + | problem_6 = (sum [1..100])^2 - sum (map (^2) [1..100]) |
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</haskell> |
</haskell> |
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Solution: |
Solution: |
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<haskell> |
<haskell> |
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| + | --primes in problem_3 |
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| − | problem_7 = head $ drop 10000 primes |
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| − | + | problem_7 = primes !! 10000 |
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</haskell> |
</haskell> |
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| − | |||
== [http://projecteuler.net/index.php?section=problems&id=8 Problem 8] == |
== [http://projecteuler.net/index.php?section=problems&id=8 Problem 8] == |
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Discover the largest product of five consecutive digits in the 1000-digit number. |
Discover the largest product of five consecutive digits in the 1000-digit number. |
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Solution: |
Solution: |
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| + | <!-- |
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<haskell> |
<haskell> |
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| + | import Data.Char |
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| − | problem_8 = undefined |
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| + | groupsOf _ [] = [] |
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| + | groupsOf n xs = |
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| + | take n xs : groupsOf n ( tail xs ) |
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| + | |||
| + | problem_8 x = maximum . map product . groupsOf 5 $ x |
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| + | main = do t <- readFile "p8.log" |
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| + | let digits = map digitToInt $concat $ lines t |
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| + | print $ problem_8 digits |
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| + | </haskell> |
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| + | --> |
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| + | <!-- I just cleaned up a little. --> |
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| + | <haskell> |
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| + | import Data.Char (digitToInt) |
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| + | import Data.List (tails) |
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| + | |||
| + | problem_8 = do str <- readFile "number.txt" |
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| + | -- This line just converts our str(ing) to a list of 1000 Ints |
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| + | let number = map digitToInt (concat $ lines str) |
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| + | print $ maximum $ map (product . take 5) (tails number) |
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</haskell> |
</haskell> |
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Solution: |
Solution: |
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<haskell> |
<haskell> |
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| + | triplets l = [[a,b,c] | m <- [2..limit], |
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| − | problem_9 = head [a*b*c | a <- [1..500], b <- [a..500], let c = 1000-a-b, a^2 + b^2 == c^2] |
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| + | n <- [1..(m-1)], |
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| + | let a = m^2 - n^2, |
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| + | let b = 2*m*n, |
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| + | let c = m^2 + n^2, |
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| + | a+b+c==l] |
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| + | where limit = floor . sqrt . fromIntegral $ l |
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| + | |||
| + | problem_9 = product . head . triplets $ 1000 |
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</haskell> |
</haskell> |
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Solution: |
Solution: |
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<haskell> |
<haskell> |
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| + | --primes in problem_3 |
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problem_10 = sum (takeWhile (< 1000000) primes) |
problem_10 = sum (takeWhile (< 1000000) primes) |
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</haskell> |
</haskell> |
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| − | |||
| − | |||
| − | [[Category:Tutorials]] |
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| − | [[Category:Code]] |
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Revision as of 14:17, 22 October 2012
Problem 1
Add all the natural numbers below 1000 that are multiples of 3 or 5.
Two solutions using sum:
import Data.List (union)
problem_1' = sum (union [3,6..999] [5,10..999])
problem_1 = sum [x | x <- [1..999], x `mod` 3 == 0 || x `mod` 5 == 0]
Another solution which uses algebraic relationships:
problem_1 = sumStep 3 999 + sumStep 5 999 - sumStep 15 999
where
sumStep s n = s * sumOnetoN (n `div` s)
sumOnetoN n = n * (n+1) `div` 2
Problem 2
Find the sum of all the even-valued terms in the Fibonacci sequence which do not exceed one million.
Solution:
problem_2 = sum [ x | x <- takeWhile (<= 1000000) fibs, even x]
where
fibs = 1 : 1 : zipWith (+) fibs (tail fibs)
The following two solutions use the fact that the even-valued terms in
the Fibonacci sequence themselves form a Fibonacci-like sequence
that satisfies
evenFib 0 = 0, evenFib 1 = 2, evenFib (n+2) = evenFib n + 4 * evenFib (n+1).
problem_2 = sumEvenFibs $ numEvenFibsLessThan 1000000
where
sumEvenFibs n = (evenFib n + evenFib (n+1) - 2) `div` 4
evenFib n = round $ (2 + sqrt 5) ** (fromIntegral n) / sqrt 5
numEvenFibsLessThan n =
floor $ (log (fromIntegral n - 0.5) + 0.5*log 5) / log (2 + sqrt 5)
The first two solutions work because 10^6 is small. The following solution also works for much larger numbers (up to at least 10^1000000 on my computer):
problem_2 = sumEvenFibsLessThan 1000000
sumEvenFibsLessThan n = (a + b - 1) `div` 2
where
n2 = n `div` 2
(a, b) = foldr f (0,1)
. takeWhile ((<= n2) . fst)
. iterate times2E $ (1, 4)
f x y | fst z <= n2 = z
| otherwise = y
where z = x `addE` y
addE (a, b) (c, d) = (a*d + b*c - 4*ac, ac + b*d)
where ac=a*c
times2E (a, b) = addE (a, b) (a, b)
Problem 3
Find the largest prime factor of 317584931803.
Solution:
primes = 2 : filter ((==1) . length . primeFactors) [3,5..]
primeFactors n = factor n primes
where
factor n (p:ps)
| p*p > n = [n]
| n `mod` p == 0 = p : factor (n `div` p) (p:ps)
| otherwise = factor n ps
problem_3 = last (primeFactors 317584931803)
Another solution, not using recursion, is:
problem_3 = (m !! 0) `div` (m !! 1)
where
m = reverse $
takeWhile (<=n) (scanl1 (*) [ x | x <- 2:[3,5..], (n `mod` x) == 0 ])
n = 600851475143
Problem 4
Find the largest palindrome made from the product of two 3-digit numbers.
Solution:
problem_4 =
maximum [x | y<-[100..999], z<-[y..999], let x=y*z, let s=show x, s==reverse s]
Problem 5
What is the smallest number divisible by each of the numbers 1 to 20?
Solution:
problem_5 = foldr1 lcm [1..20]
Problem 6
What is the difference between the sum of the squares and the square of the sums?
Solution:
problem_6 = (sum [1..100])^2 - sum (map (^2) [1..100])
Problem 7
Find the 10001st prime.
Solution:
--primes in problem_3
problem_7 = primes !! 10000
Problem 8
Discover the largest product of five consecutive digits in the 1000-digit number.
Solution:
import Data.Char (digitToInt)
import Data.List (tails)
problem_8 = do str <- readFile "number.txt"
-- This line just converts our str(ing) to a list of 1000 Ints
let number = map digitToInt (concat $ lines str)
print $ maximum $ map (product . take 5) (tails number)
Problem 9
There is only one Pythagorean triplet, {a, b, c}, for which a + b + c = 1000. Find the product abc.
Solution:
triplets l = [[a,b,c] | m <- [2..limit],
n <- [1..(m-1)],
let a = m^2 - n^2,
let b = 2*m*n,
let c = m^2 + n^2,
a+b+c==l]
where limit = floor . sqrt . fromIntegral $ l
problem_9 = product . head . triplets $ 1000
Problem 10
Calculate the sum of all the primes below one million.
Solution:
--primes in problem_3
problem_10 = sum (takeWhile (< 1000000) primes)