# Euler problems/101 to 110

### From HaskellWiki

## Contents |

## 1 Problem 101

Investigate the optimum polynomial function to model the first k terms of a given sequence.

Solution:

problem_101 = undefined

## 2 Problem 102

For how many triangles in the text file does the interior contain the origin?

Solution:

import List split :: Char -> String -> [String] split = unfoldr . split' split' :: Char -> String -> Maybe (String, String) split' c l | null l = Nothing | otherwise = Just (h, drop 1 t) where (h, t) = span (/=c) l isOrig (x1:y1:x2:y2:x3:y3:[])= t1*t2>=0 && t3*t4>=0 && t5*t6>=0 where x4=0 y4=0 t1=(y2-y1)*(x4-x1)+(x1-x2)*(y4-y1) t2=(y2-y1)*(x3-x1)+(x1-x2)*(y3-y1) t3=(y3-y1)*(x4-x1)+(x1-x3)*(y4-y1) t4=(y3-y1)*(x2-x1)+(x1-x3)*(y2-y1) t5=(y3-y2)*(x4-x2)+(x2-x3)*(y4-y2) t6=(y3-y2)*(x1-x2)+(x2-x3)*(y1-y2) sToInt x=map ((+0).read) $split ',' x problem_102=do x<-readFile "triangles.txt" print $length$ filter isOrig$map sToInt $lines x

## 3 Problem 103

Investigating sets with a special subset sum property.

Solution:

six=[11,18,19,20,22,25] seven=[mid+a|let mid=six!!3,a<-0:six] problem_103=foldl (++) "" $map show seven

## 4 Problem 104

Finding Fibonacci numbers for which the first and last nine digits are pandigital.

Solution:

Very nice problem. I didnt realize you could deal with the precision problem. Therefore I used this identity to speed up the fibonacci calculation: f_(2*n+k) = f_k*(f_(n+1))^2 + 2*f_(k-1)*f_(n+1)*f_n + f_(k-2)*(f_n)^2

import Data.List import Data.Char fibos = rec 0 1 where rec a b = a:rec b (a+b) fibo_2nk n k = let fkm1 = fibo (k-1) fkm2 = fibo (k-2) fk = fkm1 + fkm2 fnp1 = fibo (n+1) fnp1sq = fnp1^2 fn = fibo n fnsq = fn^2 in fk*fnp1sq + 2*fkm1*fnp1*fn + fkm2*fnsq fibo x = let threshold = 30000 n = div x 3 k = n+mod x 3 in if x < threshold then fibos !! x else fibo_2nk n k findCandidates = rec 0 1 0 where m = 10^9 rec a b n = let continue = rec b (mod (a+b) m) (n+1) isBackPan a = (sort $ show a) == "123456789" in if isBackPan a then n:continue else continue search = let isFrontPan x = (sort $ take 9 $ show x) == "123456789" in map fst $ take 1 $ dropWhile (not.snd) $ zip findCandidates $ map (isFrontPan.fibo) findCandidates problem_104 = search

It took 8 sec on a 2.2Ghz machine.

The lesson I learned fom this challenge, is: know mathematical identities and exploit them. They allow you take short cuts. Normally you compute all previous fibonacci numbers to compute a random fibonacci number. Which has linear costs. The aforementioned identity builds the number not from its two predecessors but from 4 much smaller ones. This makes the algorithm logarithmic in its complexity. It really shines if you want to compute a random very large fibonacci number. f.i. the 10mio.th fibonacci number which is over 2mio characters long, took 20sec to compute on my 2.2ghz laptop.

## 5 Problem 105

Find the sum of the special sum sets in the file.

Solution:

import List digitstwo n k |k==0=[] |otherwise= y:digitstwo x (k-1) where (x,y)=divMod n 2 subset lst= [delzero t| n<-[0..2^len-1], let a=digitstwo n len, let t=zip lst a ] where len=length lst delzero x=[a|(a,b)<-x,b/=0] notEqu lst= length sm ==(length.nub) sm where su=subset lst sm=[sum a|a<-su] moreElem lst= foldl (&&) True [k|a<-su,let len=length a,let k=sum a>maE!!len] where le=length lst su=subset lst maxsum su a=maximum[sum b|b<-su,length b==a] maxElem lst = (-1):0:[maxsum su a|a<-[1..le-1]]++[sum lst] maE=maxElem lst split :: Char -> String -> [String] split = unfoldr . split' split' :: Char -> String -> Maybe (String, String) split' c l | null l = Nothing | otherwise = Just (h, drop 1 t) where (h, t) = span (/=c) l sToInt x=map ((+0).read) $split ',' x problem_105=do x<-readFile "sets.txt" let sm=[a|a<-map sToInt $lines x,notEqu a] let me=[a|a<-sm,moreElem a] print $sum$concat me

## 6 Problem 106

Find the minimum number of comparisons needed to identify special sum sets.

Solution:

problem_106 = undefined

## 7 Problem 107

Determining the most efficient way to connect the network.

Solution:

problem_107 = undefined

## 8 Problem 108

Solving the Diophantine equation 1/x + 1/y = 1/n.

Solution:

import List primes=[2,3,5,7,11,13,17,19,23,29,31,37,41,43,47,53,59,61,67,71,73] series _ 1 =[[0]] series xs n =[x:ps|x<-xs,ps<-series [0..x] (n-1) ] distinct=product. map (+1) sumpri x=product $map (\(x,y)->x^y)$zip primes x prob x y =head$sort[(sumpri m ,m)|m<-series [1..3] x,(>y)$distinct$map (*2) m] problem_108=prob 7 2000

## 9 Problem 109

How many distinct ways can a player checkout in the game of darts with a score of less than 100?

Solution:

problem_109 = undefined

## 10 Problem 110

Find an efficient algorithm to analyse the number of solutions of the equation 1/x + 1/y = 1/n.

Solution:

-- prob in problem_108 problem_110 = prob 13 (8*10^6)