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Problem #69

Euler's Totient function, φ(n) [sometimes called the phi function], is used to determine the number of numbers less than n which are relatively prime to n. For example, as 1, 2, 4, 5, 7, and 8, are all less than nine and relatively prime to nine, φ(9)=6.

n	Relatively Prime	φ(n)	n/φ(n)
2	1	1	2
3	1,2	2	1.5
4	1,3	2	2
5	1,2,3,4	4	1.25
6	1,5	2	3
7	1,2,3,4,5,6	6	1.1666...
8	1,3,5,7	4	2
9	1,2,4,5,7,8	6	1.5
10	1,3,7,9	4	2.5

It can be seen that n=6 produces a maximum n/φ(n) for n $≤$ 10.

Find the value of n $≤$ 1,000,000 for which n/φ(n) is a maximum.

Erlang: Running time = 0.14s

+-%echo
echo(Message,Sender)->Sender ! Message.

+-%prime_list
prime_list()->
	case whereis(primeList) of
		undefined->
			Pid=spawn(euler,prime_list,[initialize]),
			register(primeList, Pid),
			Pid;
		Exists->
			Exists
	end.
prime_list(initialize)->
	put(primes,array:from_list([2,3,5,7,11,13,17,19])),
	put(total,8),
	prime_list(idle);
prime_list(idle)->
	Size=get(total),
	receive
		{get,FromZero,Reply} when FromZero < Size ->
			Reply ! {prime,FromZero,array:get(FromZero,get(primes))};
		{get,FromZero,Reply} ->
			echo({get,FromZero,Reply},self()),
			prime_list(gen);
		{all_below,What,Reply} ->
			case array:get(Size-1,get(primes)) < What of 
				true->
					prime_list(gen),
					echo({all_below,What,Reply},self());
				false->
					Reply ! {primes_below,What,prime_list(below,What,0,[])}
			end;
		{is_prime,What,Reply}->
			Skirt=math:sqrt(What),
			Largest=array:get(Size-1,get(primes)),
			case Largest < What of
				true->
					case Largest < Skirt of 
						true->
							prime_list(gen),
							echo({is_prime,What,Reply},self());
						false->
							Reply ! {is_prime,What,prime_list(check_factors,0,What,Skirt)}
					end;
				false->
					Reply ! {is_prime,What,prime_list(binary_search,What,0,Size-1)}
				end
		end,
		prime_list(idle);
prime_list(gen)->
	Size=get(total),
	Start=array:get(Size-1,get(primes))+2,
	End=Start*10+1,
	Sqrt=math:sqrt(End),
	AsList=array:to_list(get(primes)),
	[2|Odds]=AsList,
	RelevantOdds=lists:takewhile(fun(N)->N =< Sqrt end,Odds),
	Newbs=prime_list(gen,Size,Start,End,RelevantOdds,ordsets:from_list(lists:seq(Start,End,2))),
	put(primes,array:from_list(lists:append(AsList,ordsets:to_list(Newbs)))),
	put(total,get(total)+ordsets:size(Newbs)).
prime_list(check_factors,NextIndex,N,Sqrt)->
	NextPrime=array:get(NextIndex,get(primes)),
	case NextPrime > Sqrt of
		true->true;
		false->
			case N rem NextPrime ==0 of
				true->false;
				false->
					prime_list(check_factors,NextIndex+1,N,Sqrt)
			end
		end;
prime_list(binary_search,What,Low,High) when High-Low < 2 ->
	H=array:get(High,get(primes)),
	L=array:get(Low,get(primes)),
	if
		H == What; L == What ->
			true;
		true->false
	end;
prime_list(binary_search,What,Low,High)->
	Mid=Low+((High-Low) div 2),
	Got=array:get(Mid,get(primes)),
	if
		What > Got->prime_list(binary_search,What,Mid+1,High);
		What < Got->prime_list(binary_search,What,Low,Mid-1);
		true->true
	end;

	
prime_list(below,What,Index,SoFar)->
	Next=array:get(Index,get(primes)),
	if
		Next >= What->
			lists:reverse(SoFar);
		true->
			prime_list(below,What,Index+1,[Next|SoFar])
	end.
prime_list(gen,_,_,_,[],Survivors)->Survivors;
prime_list(gen,Total,Lowest,Highest,[MyPrime|RestPrimes],Survivors)->
	prime_list(gen,Total,Lowest,Highest,RestPrimes,
		ordsets:subtract(Survivors,
			ordsets:from_list(
				lists:seq(Lowest-(Lowest rem MyPrime),Highest,MyPrime)))).

+-%prime_iterator
prime_iterator(Pid)->spawn(euler,prime_iterator,[idle,0,2,Pid,prime_list()]).
prime_iterator(idle,Index,Next,Parent,List)->
	receive
		next->
			Parent ! {prime, Next},
			List ! {get, Index+1,self()},
			prime_iterator(wait,Index+1,nothing,Parent,List)
	end;
prime_iterator(wait,Index,_,Parent,List)->
	receive
		{prime,Index,Next}->
			prime_iterator(idle,Index,Next,Parent,List)
	end.

%
% The answer should be the smallest number with the most distinct prime
% factors: thus we multiply the smallest primes together until we hit
% the ceiling
%
% (I could have just printed 2*3*5*7*11*13*17, but that didn't feel
% like much of a program)
%

p69()->
	Iter=prime_iterator(self()),
	Iter!next,
	p69(1,Iter).
p69(Prod,Iter)->
	receive
		{prime,N}->
			if
				N*Prod > 1000000->
					io:format("~w~n",[Prod]);
				true->
					Iter!next,
					p69(Prod*N,Iter)
			end
	end.