Numbers whose count of divisors is prime: Difference between revisions
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(Added XPL0 example.) |
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Found 79 such integers (16 under 1,000). |
Found 79 such integers (16 under 1,000). |
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</pre> |
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=={{header|XPL0}}== |
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<lang XPL0>func IsPrime(N); \Return 'true' if N is a prime number |
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int N, I; |
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[if N <= 1 then return false; |
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for I:= 2 to sqrt(N) do |
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if rem(N/I) = 0 then return false; |
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return true; |
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]; |
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func Divisors(N); \Return number of unique divisors of N |
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int N, SN, Count, D; |
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[SN:= sqrt(N); \N must be a perfect square to get an odd (prime>2) count |
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if SN*SN # N then return 0; |
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Count:= 3; \SN, 1 and N are unique divisors of N >= 4 |
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for D:= 2 to SN-1 do |
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if rem(N/D) = 0 then Count:= Count+2; |
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return Count; |
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]; |
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int N, Count; |
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[Count:= 0; |
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for N:= 4 to 100_000-1 do |
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if IsPrime(Divisors(N)) then |
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[Count:= Count+1; |
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IntOut(0, N); |
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if rem(Count/10) = 0 then CrLf(0) else ChOut(0, 9\tab\); |
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]; |
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]</lang> |
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{{out}} |
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<pre> |
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4 9 16 25 49 64 81 121 169 289 |
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361 529 625 729 841 961 1024 1369 1681 1849 |
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2209 2401 2809 3481 3721 4096 4489 5041 5329 6241 |
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6889 7921 9409 10201 10609 11449 11881 12769 14641 15625 |
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16129 17161 18769 19321 22201 22801 24649 26569 27889 28561 |
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29929 32041 32761 36481 37249 38809 39601 44521 49729 51529 |
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52441 54289 57121 58081 59049 63001 65536 66049 69169 72361 |
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73441 76729 78961 80089 83521 85849 94249 96721 97969 |
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</pre> |
</pre> |
Revision as of 17:22, 15 July 2021
- Task
Find positive integers n which count of divisors is prime, but not equal to 2, where n < 1,000.
Stretch goal: (as above), but where n < 100,000.
ALGOL 68
Counts the divisors without using division. <lang algol68>BEGIN # find numbers with prime divisor counts #
INT max number := 1 000; TO 2 DO INT max divisors := 0; # construct a table of the divisor counts # [ 1 : max number ]INT ndc; FOR i FROM 1 TO UPB ndc DO ndc[ i ] := 1 OD; FOR i FROM 2 TO UPB ndc DO FOR j FROM i BY i TO UPB ndc DO ndc[ j ] +:= 1 OD OD; # show the numbers with prime divisor counts # print( ( "Numbers up to ", whole( max number, 0 ), " with odd prime divisor counts:", newline ) ); INT p count := 0; FOR i TO UPB ndc DO INT divisor count = ndc[ i ]; IF ODD divisor count AND ndc[ divisor count ] = 2 THEN print( ( whole( i, -8 ) ) ); IF ( p count +:= 1 ) MOD 10 = 0 THEN print( ( newline ) ) FI FI OD; print( ( newline ) ); max number := 100 000 OD
END</lang>
- Output:
Numbers up to 1000 with odd prime divisor counts: 4 9 16 25 49 64 81 121 169 289 361 529 625 729 841 961 Numbers up to 100000 with odd prime divisor counts: 4 9 16 25 49 64 81 121 169 289 361 529 625 729 841 961 1024 1369 1681 1849 2209 2401 2809 3481 3721 4096 4489 5041 5329 6241 6889 7921 9409 10201 10609 11449 11881 12769 14641 15625 16129 17161 18769 19321 22201 22801 24649 26569 27889 28561 29929 32041 32761 36481 37249 38809 39601 44521 49729 51529 52441 54289 57121 58081 59049 63001 65536 66049 69169 72361 73441 76729 78961 80089 83521 85849 94249 96721 97969
C++
<lang cpp>#include <cmath>
- include <cstdlib>
- include <iomanip>
- include <iostream>
int divisor_count(int n) {
int total = 1; for (; (n & 1) == 0; n >>= 1) ++total; for (int p = 3; p * p <= n; p += 2) { int count = 1; for (; n % p == 0; n /= p) ++count; total *= count; } if (n > 1) total *= 2; return total;
}
bool is_prime(int n) {
if (n < 2) return false; if (n % 2 == 0) return n == 2; if (n % 3 == 0) return n == 3; for (int p = 5; p * p <= n; p += 4) { if (n % p == 0) return false; p += 2; if (n % p == 0) return false; } return true;
}
int main(int argc, char** argv) {
int limit = 1000; switch (argc) { case 1: break; case 2: limit = std::strtol(argv[1], nullptr, 10); if (limit <= 0) { std::cerr << "Invalid limit\n"; return EXIT_FAILURE; } break; default: std::cerr << "usage: " << argv[0] << " [limit]\n"; return EXIT_FAILURE; } int width = static_cast<int>(std::ceil(std::log10(limit))); int count = 0; for (int i = 1;; ++i) { int n = i * i; if (n >= limit) break; int divisors = divisor_count(n); if (divisors != 2 && is_prime(divisors)) std::cout << std::setw(width) << n << (++count % 10 == 0 ? '\n' : ' '); } std::cout << "\nCount: " << count << '\n'; return EXIT_SUCCESS;
}</lang>
- Output:
Default input:
4 9 16 25 49 64 81 121 169 289 361 529 625 729 841 961 Count: 16
Stretch goal:
4 9 16 25 49 64 81 121 169 289 361 529 625 729 841 961 1024 1369 1681 1849 2209 2401 2809 3481 3721 4096 4489 5041 5329 6241 6889 7921 9409 10201 10609 11449 11881 12769 14641 15625 16129 17161 18769 19321 22201 22801 24649 26569 27889 28561 29929 32041 32761 36481 37249 38809 39601 44521 49729 51529 52441 54289 57121 58081 59049 63001 65536 66049 69169 72361 73441 76729 78961 80089 83521 85849 94249 96721 97969 Count: 79
F#
This task uses Extensible Prime Generator (F#) <lang fsharp> // Numbers whose divisor count is prime. Nigel Galloway: July 13th., 2021 primes64()|>Seq.takeWhile(fun n->n*n<100000L)|>Seq.collect(fun n->primes32()|>Seq.skip 1|>Seq.map(fun g->pown n (g-1))|>Seq.takeWhile((>)100000L))|>Seq.sort|>Seq.iter(printf "%d "); printfn "" </lang>
- Output:
4 9 16 25 49 64 81 121 169 289 361 529 625 729 841 961 1024 1369 1681 1849 2209 2401 2809 3481 3721 4096 4489 5041 5329 6241 6889 7921 9409 10201 10609 11449 11881 12769 14641 15625 16129 17161 18769 19321 22201 22801 24649 26569 27889 28561 29929 32041 32761 36481 37249 38809 39601 44521 49729 51529 52441 54289 57121 58081 59049 63001 65536 66049 69169 72361 73441 76729 78961 80089 83521 85849 94249 96721 97969
Factor
<lang factor>USING: formatting grouping io kernel math math.primes math.primes.factors math.ranges sequences sequences.extras ; FROM: math.extras => integer-sqrt ;
- odd-prime? ( n -- ? ) dup 2 = [ drop f ] [ prime? ] if ;
- pdc-upto ( n -- seq )
integer-sqrt [1,b] [ sq ] [ divisors length odd-prime? ] map-filter ;
100,000 pdc-upto 10 group [ [ "%-8d" printf ] each nl ] each</lang>
- Output:
4 9 16 25 49 64 81 121 169 289 361 529 625 729 841 961 1024 1369 1681 1849 2209 2401 2809 3481 3721 4096 4489 5041 5329 6241 6889 7921 9409 10201 10609 11449 11881 12769 14641 15625 16129 17161 18769 19321 22201 22801 24649 26569 27889 28561 29929 32041 32761 36481 37249 38809 39601 44521 49729 51529 52441 54289 57121 58081 59049 63001 65536 66049 69169 72361 73441 76729 78961 80089 83521 85849 94249 96721 97969
Go
<lang go>package main
import (
"fmt" "rcu"
)
func countDivisors(n int) int {
count := 0 i := 1 k := 1 if n%2 == 1 { k = 2 } for ; i*i <= n; i += k { if n%i == 0 { count++ j := n / i if j != i { count++ } } } return count
}
func main() {
const limit = 1e5 var results []int for i := 2; i * i < limit; i++ { n := countDivisors(i * i) if n > 2 && rcu.IsPrime(n) { results = append(results, i * i) } } climit := rcu.Commatize(limit) fmt.Printf("Positive integers under %7s whose number of divisors is an odd prime:\n", climit) under1000 := 0 for i, n := range results { fmt.Printf("%7s", rcu.Commatize(n)) if (i+1)%10 == 0 { fmt.Println() } if n < 1000 { under1000++ } } fmt.Printf("\n\nFound %d such integers (%d under 1,000).\n", len(results), under1000)
}</lang>
- Output:
Positive integers under 100,000 whose number of divisors is an odd prime: 4 9 16 25 49 64 81 121 169 289 361 529 625 729 841 961 1,024 1,369 1,681 1,849 2,209 2,401 2,809 3,481 3,721 4,096 4,489 5,041 5,329 6,241 6,889 7,921 9,409 10,201 10,609 11,449 11,881 12,769 14,641 15,625 16,129 17,161 18,769 19,321 22,201 22,801 24,649 26,569 27,889 28,561 29,929 32,041 32,761 36,481 37,249 38,809 39,601 44,521 49,729 51,529 52,441 54,289 57,121 58,081 59,049 63,001 65,536 66,049 69,169 72,361 73,441 76,729 78,961 80,089 83,521 85,849 94,249 96,721 97,969 Found 79 such integers (16 under 1,000).
Julia
<lang julia>using Primes
ispdc(n) = (ndivs = prod(collect(values(factor(n))).+ 1); ndivs > 2 && isprime(ndivs))
foreach(p -> print(rpad(p[2], 8), p[1] % 10 == 0 ? "\n" : ""), enumerate(filter(ispdc, 1:100000)))
</lang>
- Output:
4 9 16 25 49 64 81 121 169 289 361 529 625 729 841 961 1024 1369 1681 1849 2209 2401 2809 3481 3721 4096 4489 5041 5329 6241 6889 7921 9409 10201 10609 11449 11881 12769 14641 15625 16129 17161 18769 19321 22201 22801 24649 26569 27889 28561 29929 32041 32761 36481 37249 38809 39601 44521 49729 51529 52441 54289 57121 58081 59049 63001 65536 66049 69169 72361 73441 76729 78961 80089 83521 85849 94249 96721 97969
Nim
Checking only divisors of squares (see discussion).
<lang Nim>import math, sequtils, strformat, strutils
func divCount(n: Positive): int =
var n = n for d in 1..n: if d * d > n: break if n mod d == 0: inc result if n div d != d: inc result
func isOddPrime(n: Positive): bool =
if n < 3 or n mod 2 == 0: return false if n mod 3 == 0: return n == 3 var d = 5 while d <= sqrt(n.toFloat).int: if n mod d == 0: return false inc d, 2 if n mod d == 0: return false inc d, 4 result = true
iterator numWithOddPrimeDivisorCount(lim: Positive): int =
for k in 1..sqrt(lim.toFloat).int: let n = k * k if n.divCount().isOddPrime(): yield n
var list = toSeq(numWithOddPrimeDivisorCount(1000))
echo &"Found {list.len} numbers between 1 and 999 whose number of divisors is an odd prime:" echo list.join(" ") echo()
list = toSeq(numWithOddPrimeDivisorCount(100_000)) echo &"Found {list.len} numbers between 1 and 99_999 whose number of divisors is an odd prime:" for i, n in list:
stdout.write &"{n:5}", if (i + 1) mod 10 == 0: '\n' else: ' '
echo()</lang>
- Output:
Found 16 numbers between 1 and 999 whose number of divisors is an odd prime: 4 9 16 25 49 64 81 121 169 289 361 529 625 729 841 961 Found 79 numbers between 1 and 99_999 whose number of divisors is an odd prime: 4 9 16 25 49 64 81 121 169 289 361 529 625 729 841 961 1024 1369 1681 1849 2209 2401 2809 3481 3721 4096 4489 5041 5329 6241 6889 7921 9409 10201 10609 11449 11881 12769 14641 15625 16129 17161 18769 19321 22201 22801 24649 26569 27889 28561 29929 32041 32761 36481 37249 38809 39601 44521 49729 51529 52441 54289 57121 58081 59049 63001 65536 66049 69169 72361 73441 76729 78961 80089 83521 85849 94249 96721 97969
Pascal
<lang pascal>program FacOfInteger; {$IFDEF FPC} // {$R+,O+} //debuging purpose
{$MODE DELPHI} {$Optimization ON,ALL}
{$ELSE}
{$APPTYPE CONSOLE}
{$ENDIF} uses
sysutils;
//############################################################################# //Prime decomposition type
tPot = record potSoD : Uint64; potPrim, potMax :Uint32; end;
tprimeFac = record pfPrims : array[0..13] of tPot; pfSumOfDivs : Uint64; pfCnt, pfNum, pfDivCnt: Uint32; end; tSmallPrimes = array[0..6541] of Word; tItem = NativeUint; tDivisors = array of tItem; tpDivisor = pNativeUint;
var
SmallPrimes: tSmallPrimes;
procedure InsertSort(pDiv:tpDivisor; Left, Right : NativeInt );
var
I, J: NativeInt; Pivot : tItem;
begin
for i:= 1 + Left to Right do begin Pivot:= pDiv[i]; j:= i - 1; while (j >= Left) and (pDiv[j] > Pivot) do begin pDiv[j+1]:=pDiv[j]; Dec(j); end; pDiv[j+1]:= pivot; end;
end;
procedure InitSmallPrimes; var
pr,testPr,j,maxprimidx,delta: Uint32; isPrime : boolean;
Begin
SmallPrimes[0] := 2; SmallPrimes[1] := 3; delta := 2; maxprimidx := 1; pr := 5; repeat isprime := true; j := 0; repeat testPr := SmallPrimes[j]; IF testPr*testPr > pr then break; If pr mod testPr = 0 then Begin isprime := false; break; end; inc(j); until false; if isprime then Begin inc(maxprimidx); SmallPrimes[maxprimidx]:= pr; end; inc(pr,delta); delta := 2+4-delta; until pr > 1 shl 16 -1;
end;
function isPrime(n:Uint32):boolean; var
pr,idx: NativeInt;
begin
result := n in [2,3]; if NOT(result) AND (n>4) AND (n AND 1 <> 0 ) then begin idx := 1; repeat pr := SmallPrimes[idx]; result := (n mod pr) <>0; inc(idx); until NOT(result) or (sqr(pr)>n) or (idx > High(SmallPrimes)); end;
end;
procedure PrimeFacOut(const primeDecomp:tprimeFac;proper:Boolean=true); var
i,k : Int32;
begin
with primeDecomp do Begin write(pfNum,' = '); k := pfCnt-1; For i := 0 to k-1 do with pfPrims[i] do If potMax = 1 then write(potPrim,'*') else write(potPrim,'^',potMax,'*'); with pfPrims[k] do If potMax = 1 then write(potPrim) else write(potPrim,'^',potMax); if proper then writeln(' got ',pfDivCnt-1,' proper divisors with sum : ',pfSumOfDivs-pfNum) else writeln(' got ',pfDivCnt,' divisors with sum : ',pfSumOfDivs); end;
end;
procedure PrimeDecomposition(var res:tprimeFac;n:Uint32); var
DivSum,fac:Uint64; i,pr,cnt,DivCnt,quot{to minimize divisions} : NativeUint;
Begin
if SmallPrimes[0] <> 2 then InitSmallPrimes; res.pfNum := n; cnt := 0; DivCnt := 1; DivSum := 1; i := 0; if n <= 1 then Begin with res.pfPrims[0] do Begin potPrim := n; potMax := 1; end; cnt := 1; end else repeat pr := SmallPrimes[i]; IF pr*pr>n then Break; quot := n div pr; IF pr*quot = n then with res do Begin with pfPrims[Cnt] do Begin potPrim := pr; potMax := 0; fac := pr; repeat n := quot; quot := quot div pr; inc(potMax); fac *= pr; until pr*quot <> n; DivCnt *= (potMax+1); DivSum *= (fac-1)DIV (pr-1); end; inc(Cnt); end; inc(i); until false; //a big prime left over? IF n > 1 then with res do Begin with pfPrims[Cnt] do Begin potPrim := n; potMax := 1; end; inc(Cnt); DivCnt *= 2; DivSum *= n+1; end; with res do Begin pfCnt:= cnt; pfDivCnt := DivCnt; pfSumOfDivs := DivSum; end;
end;
function isAbundant(const pD:tprimeFac):boolean;inline; begin
with pd do result := pfSumOfDivs-pfNum > pfNum;
end;
function DivCount(const pD:tprimeFac):NativeUInt;inline; begin
result := pD.pfDivCnt;
end;
function SumOfDiv(const primeDecomp:tprimeFac):NativeUInt;inline; begin
result := primeDecomp.pfSumOfDivs;
end;
procedure GetDivs(var pD:tprimeFac;var Divs:tDivisors); var
pDivs : tpDivisor; i,len,j,l,p,pPot,k: NativeInt;
Begin
i := DivCount(pD); IF i > Length(Divs) then setlength(Divs,i); pDivs := @Divs[0]; pDivs[0] := 1; len := 1; l := len; For i := 0 to pD.pfCnt-1 do with pD.pfPrims[i] do Begin //Multiply every divisor before with the new primefactors //and append them to the list k := potMax-1; p := potPrim; pPot :=1; repeat pPot *= p; For j := 0 to len-1 do Begin pDivs[l]:= pPot*pDivs[j]; inc(l); end; dec(k); until k<0; len := l; end; //Sort. Insertsort much faster than QuickSort in this special case InsertSort(pDivs,0,len-1);
end;
Function GetDivisors(var pD:tprimeFac;n:Uint32;var Divs:tDivisors):Int32; var
i:Int32;
Begin
if pD.pfNum <> n then PrimeDecomposition(pD,n); i := DivCount(pD); IF i > Length(Divs) then setlength(Divs,i+1); GetDivs(pD,Divs); result := DivCount(pD);
end;
procedure AllFacsOut(var pD:tprimeFac;n: Uint32;Divs:tDivisors;proper:boolean=true); var
k,j: Int32;
Begin
k := GetDivisors(pD,n,Divs)-1;// zero based PrimeFacOut(pD,proper); IF proper then dec(k); IF k > 0 then Begin For j := 0 to k-1 do write(Divs[j],','); writeln(Divs[k]); end;
end; //Prime decomposition //############################################################################# procedure SpeedTest(var pD: tprimeFac;Limit:Uint32); var
Ticks : Int64; number,numSqr,Cnt: UInt32;
Begin
Ticks := GetTickCount64; Cnt := 0; number := 1; numSqr:=1; repeat number += 1; numSqr := sqr(number); PrimeDecomposition(pD,numSqr); IF DivCount(pD)>2 then if isPrime(DivCount(pD)) then inc(cnt);//writeln(number:5,numSqr:10,DivCount(pD):5); until numSqr>= Limit; writeln('SpeedTest ',(GetTickCount64-Ticks)/1000:0:3,' secs for 1..',Limit,' found ',Cnt); writeln;
end;
var
pD: tprimeFac; Divisors : tDivisors; numroot,num,cnt : Uint32;
BEGIN
InitSmallPrimes; setlength(Divisors,1); write(:4); for cnt := 1 to 10 do write(cnt:7); writeln; cnt := 0; write(cnt:3,':'); For numroot := 2 to 1000 do begin num := sqr(numroot); PrimeDecomposition(pD,num); IF DivCount(pD)>2 then if isPrime(DivCount(pD)) then begin write(num:7); inc(cnt); if cnt MOD 10 =0 then Begin writeln;write(cnt:3,':'); end; end; end; if cnt MOD 8 <>0 then writeln; writeln; SpeedTest(pD,4000*1000*1000);
END.</lang>
- Output:
1 2 3 4 5 6 7 8 9 10 0: 4 9 16 25 49 64 81 121 169 289 10: 361 529 625 729 841 961 1024 1369 1681 1849 20: 2209 2401 2809 3481 3721 4096 4489 5041 5329 6241 30: 6889 7921 9409 10201 10609 11449 11881 12769 14641 15625 40: 16129 17161 18769 19321 22201 22801 24649 26569 27889 28561 50: 29929 32041 32761 36481 37249 38809 39601 44521 49729 51529 60: 52441 54289 57121 58081 59049 63001 65536 66049 69169 72361 70: 73441 76729 78961 80089 83521 85849 94249 96721 97969 100489 80: 109561 113569 117649 120409 121801 124609 128881 130321 134689 139129 90: 143641 146689 151321 157609 160801 167281 175561 177241 185761 187489 100: 192721 196249 201601 208849 212521 214369 218089 229441 237169 241081 110: 249001 253009 259081 262144 271441 273529 279841 292681 299209 310249 120: 316969 323761 326041 332929 344569 351649 358801 361201 368449 375769 130: 380689 383161 398161 410881 413449 418609 426409 434281 436921 452929 140: 458329 466489 477481 491401 502681 516961 528529 531441 537289 546121 150: 552049 564001 573049 579121 591361 597529 619369 635209 654481 657721 160: 674041 677329 683929 687241 703921 707281 727609 734449 737881 744769 170: 769129 776161 779689 786769 822649 829921 844561 863041 877969 885481 180: 896809 908209 923521 935089 942841 954529 966289 982081 994009 SpeedTest 0.230 secs for 1..4000000000 found 6417
Phix
with javascript_semantics function pd(integer n) n = length(factors(n,1)) return n!=2 and is_prime(n) end function for k=3 to 5 by 2 do integer n = power(10,k) sequence res = filter(tagset(n),pd) printf(1,"%d < %,d found: %V\n",{length(res),n,shorten(res,"",5)}) end for
- Output:
16 < 1,000 found: {4,9,16,25,49,"...",529,625,729,841,961} 79 < 100,000 found: {4,9,16,25,49,"...",83521,85849,94249,96721,97969}
Raku
<lang perl6>use Prime::Factor;
my $ceiling = ceiling sqrt 1e5;
say display :10cols, :fmt('%6d'), (^$ceiling)».² .grep: { .&divisors.is-prime };
sub display ($list, :$cols = 10, :$fmt = '%6d', :$title = "{+$list} matching:\n" ) {
cache $list; $title ~ $list.batch($cols)».fmt($fmt).join: "\n"
}</lang>
- Output:
79 matching: 4 9 16 25 49 64 81 121 169 289 361 529 625 729 841 961 1024 1369 1681 1849 2209 2401 2809 3481 3721 4096 4489 5041 5329 6241 6889 7921 9409 10201 10609 11449 11881 12769 14641 15625 16129 17161 18769 19321 22201 22801 24649 26569 27889 28561 29929 32041 32761 36481 37249 38809 39601 44521 49729 51529 52441 54289 57121 58081 59049 63001 65536 66049 69169 72361 73441 76729 78961 80089 83521 85849 94249 96721 97969
REXX
<lang rexx>/*REXX pgm finds positive integers N whose # of divisors is prime (& ¬=2), where N<1000.*/ parse arg hi cols . /*obtain optional arguments from the CL*/ if hi== | hi=="," then hi= 1000 /*Not specified? Then use the defaults*/ if cols== | cols=="," then cols= 10 /* " " " " " " */ call genP /*build array of semaphores for primes.*/ w= 10 /*W: the maximum width of any column. */ title= ' positive integers N whose number of divisors is prime (and not equal to 2), ' ,
"where N < " commas(hi)
say ' index │'center(title, 1 + cols*(w+1) ) say '───────┼'center("" , 1 + cols*(w+1), '─') finds= 0; idx= 1; $=
do j=2; jj= j*j; if jj>=hi then leave /*process positive square ints in range*/ n= nDivs(jj); if n==2 then iterate /*get number of divisors of composite J*/ if \!.n then iterate /*Number divisors prime? No, then skip*/ finds= finds + 1 /*bump the number of found numbers. */ $= $ right( commas(j), w) /*add a positive integer ──► $ list. */ if finds//cols\==0 then iterate /*have we populated a line of output? */ say center(idx, 7)'│' substr($, 2); $= /*display what we have so far (cols). */ idx= idx + cols /*bump the index count for the output*/ end /*j*/ /* [↑] process a range of integers. */
if $\== then say center(idx, 7)"│" substr($, 2) /*possible display residual output.*/ say '───────┴'center("" , 1 + cols*(w+1), '─') say say 'Found ' commas(finds) title exit 0 /*stick a fork in it, we're all done. */ /*──────────────────────────────────────────────────────────────────────────────────────*/ commas: parse arg ?; do jc=length(?)-3 to 1 by -3; ?=insert(',', ?, jc); end; return ? /*──────────────────────────────────────────────────────────────────────────────────────*/ nDivs: procedure; parse arg x; d= 2; if x==1 then return 1 /*handle special case of 1*/
odd= x // 2 /* [↓] process EVEN or ODD ints. ___*/ do j=2+odd by 1+odd while j*j<x /*divide by all the integers up to √ x */ if x//j==0 then d= d + 2 /*÷? Add two divisors to the total. */ end /*j*/ /* [↑] % ≡ integer division. */ if j*j==x then return d + 1 /*Was X a square? Then add 1 to total.*/ return d /*return the total. */
/*──────────────────────────────────────────────────────────────────────────────────────*/ genP: @.1=2; @.2=3; @.3=5; @.4=7; @.5=11 /*define some low primes. */
!.=0; !.2=1; !.3=1; !.5=1; !.7=1; !.11=1 /* " " " " semaphores. */ #=5; s.#= @.# **2 /*number of primes so far; prime². */ do j=@.#+2 by 2 to hi-1 /*find odd primes from here on. */ parse var j -1 _; if _==5 then iterate /*J divisible by 5? (right dig)*/ if j// 3==0 then iterate /*" " " 3? */ if j// 7==0 then iterate /*" " " 7? */ do k=5 while s.k<=j /* [↓] divide by the known odd primes.*/ if j // @.k == 0 then iterate j /*Is J ÷ X? Then not prime. ___ */ end /*k*/ /* [↑] only process numbers ≤ √ J */ #= #+1; @.#= j; s.#= j*j; !.j= 1 /*bump # of Ps; assign next P; P²; P# */ end /*j*/; return</lang>
- output when using the default inputs:
index │ positive integers N whose number of divisors is prime (and not equal to 2), where N < 1,000 ───────┼─────────────────────────────────────────────────────────────────────────────────────────────────────────────── 1 │ 4 9 16 25 49 64 81 121 169 289 11 │ 361 529 625 729 841 961 ───────┴─────────────────────────────────────────────────────────────────────────────────────────────────────────────── Found 16 positive integers N whose number of divisors is prime (and not equal to 2), where N < 1,000
- output when using the input of: 100000
index │ positive integers N whose number of divisors is prime (and not equal to 2), where N < 100,000 ───────┼─────────────────────────────────────────────────────────────────────────────────────────────────────────────── 1 │ 4 9 16 25 49 64 81 121 169 289 11 │ 361 529 625 729 841 961 1,024 1,369 1,681 1,849 21 │ 2,209 2,401 2,809 3,481 3,721 4,096 4,489 5,041 5,329 6,241 31 │ 6,889 7,921 9,409 10,201 10,609 11,449 11,881 12,769 14,641 15,625 41 │ 16,129 17,161 18,769 19,321 22,201 22,801 24,649 26,569 27,889 28,561 51 │ 29,929 32,041 32,761 36,481 37,249 38,809 39,601 44,521 49,729 51,529 61 │ 52,441 54,289 57,121 58,081 59,049 63,001 65,536 66,049 69,169 72,361 71 │ 73,441 76,729 78,961 80,089 83,521 85,849 94,249 96,721 97,969 ───────┴─────────────────────────────────────────────────────────────────────────────────────────────────────────────── Found 79 positive integers N whose number of divisors is prime (and not equal to 2), where N < 100,000
Ring
<lang ring> load "stdlib.ring" row = 0
see "working..." + nl see "Numbers which count of divisors is prime are:" + nl
for n = 1 to 1000
num = 0 for m = 1 to n if n%m = 0 num++ ok next if isprime(num) and num != 2 see "" + n + " " row++ if row%5 = 0 see nl ok ok
next
see nl + "Found " + row + " numbers" + nl see "done..." + nl </lang>
- Output:
working... Numbers which count of divisors is prime are: 4 9 16 25 49 64 81 121 169 289 361 529 625 729 841 961 Found 16 numbers done...
Wren
<lang ecmascript>import "/math" for Int import "/seq" for Lst import "/fmt" for Fmt
var limit = 1e5 var results = [] var i = 2 while (i * i < limit) {
var n = Int.divisors(i * i).count if (n > 2 && Int.isPrime(n)) results.add(i * i) i = i + 1
} Fmt.print("Positive integers under $,7d whose number of divisors is an odd prime:", limit) for (chunk in Lst.chunks(results, 10)) Fmt.print("$,7d", chunk) var under1000 = results.count { |r| r < 1000 } System.print("\nFound %(results.count) such integers (%(under1000) under 1,000).")</lang>
- Output:
Positive integers under 100,000 whose number of divisors is an odd prime: 4 9 16 25 49 64 81 121 169 289 361 529 625 729 841 961 1,024 1,369 1,681 1,849 2,209 2,401 2,809 3,481 3,721 4,096 4,489 5,041 5,329 6,241 6,889 7,921 9,409 10,201 10,609 11,449 11,881 12,769 14,641 15,625 16,129 17,161 18,769 19,321 22,201 22,801 24,649 26,569 27,889 28,561 29,929 32,041 32,761 36,481 37,249 38,809 39,601 44,521 49,729 51,529 52,441 54,289 57,121 58,081 59,049 63,001 65,536 66,049 69,169 72,361 73,441 76,729 78,961 80,089 83,521 85,849 94,249 96,721 97,969 Found 79 such integers (16 under 1,000).
XPL0
<lang XPL0>func IsPrime(N); \Return 'true' if N is a prime number int N, I; [if N <= 1 then return false; for I:= 2 to sqrt(N) do
if rem(N/I) = 0 then return false;
return true; ];
func Divisors(N); \Return number of unique divisors of N int N, SN, Count, D; [SN:= sqrt(N); \N must be a perfect square to get an odd (prime>2) count if SN*SN # N then return 0; Count:= 3; \SN, 1 and N are unique divisors of N >= 4 for D:= 2 to SN-1 do
if rem(N/D) = 0 then Count:= Count+2;
return Count; ];
int N, Count; [Count:= 0; for N:= 4 to 100_000-1 do
if IsPrime(Divisors(N)) then [Count:= Count+1; IntOut(0, N); if rem(Count/10) = 0 then CrLf(0) else ChOut(0, 9\tab\); ];
]</lang>
- Output:
4 9 16 25 49 64 81 121 169 289 361 529 625 729 841 961 1024 1369 1681 1849 2209 2401 2809 3481 3721 4096 4489 5041 5329 6241 6889 7921 9409 10201 10609 11449 11881 12769 14641 15625 16129 17161 18769 19321 22201 22801 24649 26569 27889 28561 29929 32041 32761 36481 37249 38809 39601 44521 49729 51529 52441 54289 57121 58081 59049 63001 65536 66049 69169 72361 73441 76729 78961 80089 83521 85849 94249 96721 97969