Sum of square and cube digits of an integer are primes: Difference between revisions

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Line 13: =={{header\|ALGOL 68}}== {{libheader\|ALGOL 68-primes}} <~~lang~~syntaxhighlight lang="algol68">BEGIN # find numbers where the digit sums of the square and cube are prtime # INT max number = 99; # maximum number to consider # PR read "primes.incl.a68" PR Line 41: FI OD END</~~lang~~syntaxhighlight> {{out}} <pre> 16 17 25 28 34 37 47 52 64 </pre> =={{header\|ALGOL W}}== <syntaxhighlight lang="algolw"> begin integer procedure digitSum( integer value n ) ; begin integer sum, v, vOver10; sum := 0; v := n; while v > 0 do begin vover10 := v div 10; sum := sum + ( v - ( vover10 * 10 ) ); v := vover10 end while_v_gt_0 ; sum end digitSum ; logical procedure isPrime( integer value n ) ; if n < 2 then false else if not odd( n ) then n = 2 else begin logical prime; integer p; prime := true; p := 3; while p * p <= n and prime do begin prime := n rem p not = 0; p := p + 2; end while_p2_le_n_and_prime ; prime end isPrime ; for i := 1 until 99 do begin integer i2; i2 := i * i; if isPrime( digitSum( i2 ) ) then begin; if isPrime( digitSum( i2 * i ) ) then writeon( i_w := 1, s_w := 1, i ) end end end. </syntaxhighlight> {{out}} <pre> 16 17 25 28 34 37 47 52 64 </pre> =={{header\|APL}}== <~~lang~~syntaxhighlight lang="apl">(⊢(/⍨)∧/∘((2=0+.=⍳\|⊢)∘(+/⍎¨∘⍕)¨∘2 3)¨)⍳100</~~lang~~syntaxhighlight> {{out}} <pre>16 17 25 28 34 37 47 52 64</pre> =={{header\|Arturo}}== <~~lang~~syntaxhighlight lang="rebol">print select 1..100 'x -> and? [prime? sum digits x^2] [prime? sum digits x^3]</~~lang~~syntaxhighlight> {{out}} Line 62 ⟶ 106: =={{header\|AWK}}== <syntaxhighlight lang="awk"> ~~<lang AWK>~~ # syntax: GAWK -f SUM_OF_SQUARE_AND_CUBE_DIGITS_OF_AN_INTEGER_ARE_PRIMES.AWK # converted from FreeBASIC Line 96 ⟶ 140: return(1) } </syntaxhighlight> ~~</lang>~~ {{out}} <pre> Line 102 ⟶ 146: Sum of square and cube digits are prime 1-99: 9 </pre> =={{header\|BASIC}}== ==={{header\|FreeBASIC}}=== <syntaxhighlight lang="freebasic"> function digsum(byval n as uinteger, b as const uinteger) as uinteger 'digital sum of n in base b dim as integer s while n s+=n mod b n\=b wend return s end function function isprime(n as const uinteger) as boolean if n<2 then return false if n<4 then return true if n mod 2 = 0 then return false dim as uinteger i = 3 while ii<=n if n mod i = 0 then return false i+=2 wend return true end function for n as uinteger = 1 to 99 if isprime(digsum(n^3,10)) andalso isprime(digsum(n^2,10)) then print n;" "; next n</syntaxhighlight> {{out}}<pre>16 17 25 28 34 37 47 52 64</pre> ==={{header\|QuickBASIC}}=== {{trans\|XPL0}} <syntaxhighlight lang="qbasic"> ' Sum of square and cube digits of an integer are primes DECLARE FUNCTION SumDigits% (Num&) DECLARE FUNCTION IsPrime% (Num%) CONST TRUE% = -1, FALSE% = 0 FOR N = 0 TO 99 IF IsPrime%(SumDigits%(N * N)) AND IsPrime%(SumDigits%(N * N * N)) THEN PRINT N; NEXT N PRINT END FUNCTION IsPrime% (Num%) IF Num% < 2 THEN IsPrime% = FALSE% ELSEIF Num% = 2 THEN IsPrime% = TRUE% ELSEIF Num% MOD 2 = 0 THEN IsPrime% = FALSE% ELSE I% = 3: FoundFac% = FALSE% WHILE I% * I% <= Num% AND NOT FoundFac% IF Num% MOD I% = 0 THEN FoundFac% = TRUE% I% = I% + 2 WEND IsPrime% = NOT FoundFac% END IF END FUNCTION FUNCTION SumDigits% (Num&) Sum% = 0 WHILE Num& <> 0 Sum% = Sum% + Num& MOD 10 Num& = Num& \ 10 WEND SumDigits% = Sum% END FUNCTION </syntaxhighlight> {{out}} <pre> 16 17 25 28 34 37 47 52 64 </pre> ==={{header\|Tiny BASIC}}=== {{works with\|TinyBasic}} This can only go up to 31 because 32^3 is too big to fit in a signed 16-bit int. <syntaxhighlight lang="basic">10 REM Sum of square and cube digits of an integer are primes 20 REM N, the number to be tested 30 REM D, the digital sum of its square or cube 40 REM T, temporary variable 50 REM Z, did D test as prime or not 60 LET N = 1 70 LET T = N * N * N 80 GOSUB 200 90 GOSUB 260 100 IF Z = 0 THEN GOTO 160 110 LET T = N * N 120 GOSUB 200 130 GOSUB 260 140 IF Z = 0 THEN GOTO 160 150 PRINT N 160 IF N = 31 THEN END 170 LET N = N + 1 180 GOTO 70 190 REM Calculate sum of digits 200 LET D = 0 210 IF T = 0 THEN RETURN 220 LET D = D + (T - (T / 10) * 10) 230 LET T = T / 10 240 GOTO 210 250 REM Check if is prime 260 LET Z = 0 270 IF D < 2 THEN RETURN 280 LET Z = 1 290 IF D < 4 THEN RETURN 300 LET Z = 0 310 IF (D / 2) * 2 = D THEN RETURN 320 LET T = 1 330 LET T = T + 2 340 IF T * T > D THEN GOTO 370 350 IF (D / T) * T = D THEN RETURN 360 GOTO 330 370 LET Z = 1 380 RETURN</syntaxhighlight> {{out}}<pre>16 17 25 28</pre> ==={{header\|Yabasic}}=== {{trans\|Ring}} <syntaxhighlight lang="yabasic">// Rosetta Code problem: http://rosettacode.org/wiki/Sum_of_square_and_cube_digits_of_an_integer_are_primes // by Galileo, 04/2022 sub isPrime(n) local i if n < 4 return n >= 2 for i = 2 to sqrt(n) if not mod(n, i) return false next return true end sub limit = 100 for n = 1 to limit sums = 0 sumc = 0 sps$ = str$(n^2) spc$ = str$(n^3) for m = 1 to len(sps$) sums = sums + val(mid$(sps$, m, 1)) next for p = 1 to len(spc$) sumc = sumc + val(mid$(spc$, p, 1)) next if isPrime(sums) and isPrime(sumc) then print n, " "; endif next print</syntaxhighlight> {{out}} <pre>16 17 25 28 34 37 47 52 64 ---Program done, press RETURN---</pre> =={{header\|BQN}}== <~~lang~~syntaxhighlight lang="bqn"># 'Library' functions from BQNCrate Digits ← 10 {⌽𝕗\|⌊∘÷⟜𝕗⍟(↕1+·⌊𝕗⋆⁼1⌈⊢)} Prime ← 2=·+´0=(1+↕)⊸\| (∧˝∘⍉∘((Prime +´∘Digits)¨⋆⌜⟜2‿3))⊸/↕100</~~lang~~syntaxhighlight> {{out}} <pre>⟨ 16 17 25 28 34 37 47 52 64 ⟩</pre> =={{header\|C}}== <~~lang~~syntaxhighlight lang="c">#include <stdio.h> #include <stdbool.h> Line 136 ⟶ 337: printf("\n"); return 0; }</~~lang~~syntaxhighlight> {{out}} <pre>16 17 25 28 34 37 47 52 64</pre> =={{header\|CLU}}== <~~lang~~syntaxhighlight lang="clu">digit_sum = proc (n: int) returns (int) sum: int := 0 while n>0 do Line 173 ⟶ 374: end end end start_up</~~lang~~syntaxhighlight> {{out}} <pre>16 17 25 28 34 37 47 52 64</pre> =={{header\|COBOL}}== <~~lang~~syntaxhighlight lang="cobol"> IDENTIFICATION DIVISION. PROGRAM-ID. SQUARE-CUBE-DIGITS-PRIME. Line 241 ⟶ 442: CHECK-DIVISOR. DIVIDE SUM BY DIVISOR GIVING DIV-TEST. IF DIVISIBLE, MOVE SPACE TO PRIME-FLAG.</~~lang~~syntaxhighlight> {{out}} <pre>16 Line 252 ⟶ 453: 52 64</pre> =={{header\|Delphi}}== {{works with\|Delphi\|6.0}} {{libheader\|SysUtils,StdCtrls}} <syntaxhighlight lang="Delphi"> procedure GetDigits(N: integer; var IA: TIntegerDynArray); {Get an array of the integers in a number} {Numbers returned from least to most significant} var T,I,DC: integer; begin DC:=Trunc(Log10(N))+1; SetLength(IA,DC); for I:=0 to DC-1 do begin T:=N mod 10; N:=N div 10; IA[I]:=T; end; end; procedure SquareCubeDigitsPrime(Memo: TMemo); var Dg1,Dg2: TIntegerDynArray; var SQ,CU: integer; var Sum1,Sum2: integer; var I,J: integer; var S: string; begin S:=''; for I:=1 to 100-1 do begin SQ:=II; CU:=III; GetDigits(SQ,Dg1); GetDigits(CU,Dg2); Sum1:=0; for J:=0 to High(Dg1) do Sum1:=Sum1+Dg1[J]; Sum2:=0; for J:=0 to High(Dg2) do Sum2:=Sum2+Dg2[J]; if IsPrime(Sum1) and IsPrime(Sum2) then S:=S+' '+IntToStr(I); end; Memo.Lines.Add(S); end; </syntaxhighlight> {{out}} <pre> 16 17 25 28 34 37 47 52 64 Elapsed Time: 1.809 ms. </pre> =={{header\|F_Sharp\|F#}}== This task uses [http://www.rosettacode.org/wiki/Extensible_prime_generator#The_functions Extensible Prime Generator (F#)] <~~lang~~syntaxhighlight lang="fsharp"> // Sum of square and cube digits of an integer are primes. Nigel Galloway: December 22nd., 2021 let rec fN g=function 0->g \|n->fN(g+n%10)(n/10) [1..99]\|>List.filter(fun g->isPrime(fN 0 (gg)) && isPrime(fN 0 (ggg)))\|>List.iter(printf "%d "); printfn "" </syntaxhighlight> ~~</lang>~~ {{out}} <pre> Line 267 ⟶ 525: =={{header\|Factor}}== {{works with\|Factor\|0.99 2021-06-02}} <~~lang~~syntaxhighlight lang="factor">USING: kernel math math.functions math.primes math.text.utils prettyprint sequences ; 100 <iota> [ [ sq ] [ 3 ^ ] bi [ 1 digit-groups sum prime? ] both? ] filter .</~~lang~~syntaxhighlight> {{out}} <pre> Line 276 ⟶ 534: =={{header\|FOCAL}}== <~~lang~~syntaxhighlight lang="focal">01.10 F I=1,100;D 2 01.20 Q Line 297 ⟶ 555: 05.10 S Z=S/D 05.20 I (FITR(Z)-Z)5.3;S C=-1 05.30 R</~~lang~~syntaxhighlight> {{out}} <pre>= 16 Line 308 ⟶ 566: = 52 = 64</pre> ~~=={{header\|FreeBASIC}}==~~ ~~<lang freebasic>~~ ~~function digsum(byval n as uinteger, b as const uinteger) as uinteger~~ ~~'digital sum of n in base b~~ ~~dim as integer s~~ ~~while n~~ ~~s+=n mod b~~ ~~n\=b~~ ~~wend~~ ~~return s~~ ~~end function~~ ~~function isprime(n as const uinteger) as boolean~~ ~~if n<2 then return false~~ ~~if n<4 then return true~~ ~~if n mod 2 = 0 then return false~~ ~~dim as uinteger i = 3~~ ~~while ii<=n~~ ~~if n mod i = 0 then return false~~ ~~i+=2~~ ~~wend~~ ~~return true~~ ~~end function~~ ~~for n as uinteger = 1 to 99~~ ~~if isprime(digsum(n^3,10)) andalso isprime(digsum(n^2,10)) then print n;" ";~~ ~~next n</lang>~~ ~~{{out}}<pre>16 17 25 28 34 37 47 52 64</pre>~~ =={{header\|Go}}== {{libheader\|Go-rcu}} <~~lang~~syntaxhighlight lang="go">package main import ( Line 357 ⟶ 586: } fmt.Println() }</~~lang~~syntaxhighlight> {{out}} Line 365 ⟶ 594: =={{header\|Haskell}}== <~~lang~~syntaxhighlight lang="haskell">import Data.Bifunctor (first) import Data.Numbers.Primes (isPrime) Line 387 ⟶ 616: where go 0 = 0 go n = uncurry (+) . first go $ quotRem n base</~~lang~~syntaxhighlight> {{Out}} <pre>[16,17,25,28,34,37,47,52,64]</pre> =={{header\|J}}== <~~lang~~syntaxhighlight lang="j">((1./@p:[:+/@\|:10#.^:_1^&2 3)"0#]) i.100</~~lang~~syntaxhighlight> {{out}} <pre>16 17 25 28 34 37 47 52 64</pre> =={{header\|jq}}== {{works with\|jq}} ''Also works with gojq and fq'' '''Preliminaries''' <syntaxhighlight lang=jq> def is_prime: . as $n \| if ($n < 2) then false elif ($n % 2 == 0) then $n == 2 elif ($n % 3 == 0) then $n == 3 elif ($n % 5 == 0) then $n == 5 elif ($n % 7 == 0) then $n == 7 elif ($n % 11 == 0) then $n == 11 elif ($n % 13 == 0) then $n == 13 elif ($n % 17 == 0) then $n == 17 elif ($n % 19 == 0) then $n == 19 else 23 \| until( (. * .) > $n or ($n % . == 0); .+2) \| . * . > $n end; # emit an array of the decimal digits of the integer input, least significant digit first. def digits: recurse( if . >= 10 then ((. - (.%10)) / 10) else empty end) \| . % 10; def digitSum: def add(s): reduce s as $_ (0; .+$_); add(digits); </syntaxhighlight> '''The Task''' <syntaxhighlight lang=jq> range(1;100) \| (..) as $sq \| select( ($sq \| digitSum \| is_prime) and ($sq . \| digitSum \| is_prime ) ) </syntaxhighlight> {{output}} <pre> 16 17 25 28 34 37 47 52 64 </pre> =={{header\|Julia}}== <~~lang~~syntaxhighlight lang="julia">using Primes is_sqcubsumprime(n) = isprime(sum(digits(nn))) && isprime(sum(digits(nnn))) println(filter(is_sqcubsumprime, 1:100)) # [16, 17, 25, 28, 34, 37, 47, 52, 64] </syntaxhighlight> ~~</lang>~~ =={{header\|MAD}}== <~~lang~~syntaxhighlight ~~MAD~~lang="mad"> NORMAL MODE IS INTEGER BOOLEAN PRIME Line 436 ⟶ 714: VECTOR VALUES FMT = $I2$ END OF PROGRAM </~~lang~~syntaxhighlight> {{out}} <pre>16 Line 447 ⟶ 725: 52 64</pre> =={{header\|Nim}}== <syntaxhighlight lang="Nim">const Primes = {2, 3, 5, 7, 11, 13, 17, 19} func digitSum(n: Positive): int = ## Return the sum of digits of "n". var n = n.Natural while n != 0: result += n mod 10 n = n div 10 for n in 5..99: let n² = n * n if digitSum(n²) in Primes and digitSum(n * n²) in Primes: stdout.write n, ' ' echo() </syntaxhighlight> {{out}} <pre>16 17 25 28 34 37 47 52 64 </pre> =={{header\|OCaml}}== <syntaxhighlight lang="ocaml">let is_prime n = let rec test x = let q = n / x in x > q \|\| x * q <> n && n mod (x + 2) <> 0 && test (x + 6) in if n < 5 then n lor 1 = 3 else n land 1 <> 0 && n mod 3 <> 0 && test 5 let rec digit_sum n = if n < 10 then n else n mod 10 + digit_sum (n / 10) let is_square_and_cube_digit_sum_prime n = is_prime (digit_sum (n * n)) && is_prime (digit_sum (n * n * n)) let () = Seq.ints 1 \|> Seq.take_while ((>) 100) \|> Seq.filter is_square_and_cube_digit_sum_prime \|> Seq.iter (Printf.printf " %u") \|> print_newline</syntaxhighlight> {{out}} <pre> 16 17 25 28 34 37 47 52 64</pre> =={{header\|Perl}}== {{libheader\|ntheory}} <~~lang~~syntaxhighlight lang="perl">#!/usr/bin/perl use strict; # https://rosettacode.org/wiki/Sum_of_square_and_cube_digits_of_an_integer_are_primes Line 459 ⟶ 776: is_prime( vecsum( split //, $_ 2 ) ) && is_prime( vecsum( split //, $_ 3 ) ), 1 .. 100; print "@results\n";</~~lang~~syntaxhighlight> {{out}} <pre> Line 466 ⟶ 783: =={{header\|Phix}}== <!--<~~lang~~syntaxhighlight ~~Phix~~lang="phix">(phixonline)--> <span style="color: #008080;">with</span> <span style="color: #008080;">javascript_semantics</span> <span style="color: #008080;">function</span> <span style="color: #000000;">ipsd</span><span style="color: #0000FF;">(</span><span style="color: #004080;">integer</span> <span style="color: #000000;">n</span><span style="color: #0000FF;">)</span> <span style="color: #008080;">return</span> <span style="color: #7060A8;">is_prime</span><span style="color: #0000FF;">(</span><span style="color: #7060A8;">sum</span><span style="color: #0000FF;">(</span><span style="color: #7060A8;">sq_sub</span><span style="color: #0000FF;">(</span><span style="color: #7060A8;">sprintf</span><span style="color: #0000FF;">(</span><span style="color: #008000;">"%d"</span><span style="color: #0000FF;">,</span><span style="color: #000000;">n</span><span style="color: #0000FF;">),</span><span style="color: #008000;">'0'</span><span style="color: #0000FF;">)))</span> <span style="color: #008080;">end</span> <span style="color: #008080;">function</span> <span style="color: #008080;">function</span> <span style="color: #000000;">scdp</span><span style="color: #0000FF;">(</span><span style="color: #004080;">integer</span> <span style="color: #000000;">n</span><span style="color: #0000FF;">)</span> <span style="color: #008080;">return</span> <span style="color: #000000;">ipsd</span><span style="color: #0000FF;">(</span><span style="color: #000000;">n</span><span style="color: #0000FF;"></span><span style="color: #000000;">n</span><span style="color: #0000FF;">)</span> <span style="color: #008080;">and</span> <span style="color: #000000;">ipsd</span><span style="color: #0000FF;">(</span><span style="color: #000000;">n</span><span style="color: #0000FF;"></span><span style="color: #000000;">n</span><span style="color: #0000FF;"></span><span style="color: #000000;">n</span><span style="color: #0000FF;">)</span> <span style="color: #008080;">end</span> <span style="color: #008080;">function</span> <span style="color: #7060A8;">pp</span><span style="color: #0000FF;">(</span><span style="color: #7060A8;">filter</span><span style="color: #0000FF;">(</span><span style="color: #7060A8;">tagset</span><span style="color: #0000FF;">(</span><span style="color: #000000;">99</span><span style="color: #0000FF;">),</span><span style="color: #000000;">scdp</span><span style="color: #0000FF;">))</span> <!--</~~lang~~syntaxhighlight>--> {{out}} <pre> Line 477 ⟶ 794: </pre> =={{header\|PL/0}}== <syntaxhighlight lang="pascal"> const maxnumber = 99; var n, sum, prime, i, i2, i3; procedure sumdigitsofn; var v, vover10; begin sum := 0; v := n; while v > 0 do begin vover10 := v / 10; sum := sum + ( v - ( vover10 10 ) ); v := vover10 end end; procedure isnprime; var p; begin prime := 1; if n < 2 then prime := 0; if n > 2 then begin prime := 0; if odd( n ) then prime := 1; p := 3; while p * p <= n * prime do begin if n - ( ( n / p ) * p ) = 0 then prime := 0; p := p + 2; end end end; begin i := 0; while i <= maxnumber do begin i := i + 1; i2 := i * i; n := i2; call sumdigitsofn; n := sum; call isnprime; if prime = 1 then begin n := i2 * i; call sumdigitsofn; n := sum; call isnprime; if prime = 1 then ! i end end end. </syntaxhighlight> {{out}} <pre> 16 17 25 28 34 37 47 52 64 </pre> =={{header\|Python}}== ===Procedural=== <~~lang~~syntaxhighlight lang="python">#!/usr/bin/python def isPrime(n): Line 499 ⟶ 878: if isPrime(digSum(n3, 10)) and isPrime(digSum(n2, 10)): print(n, end = " ") </syntaxhighlight> ~~</lang>~~ {{out}} <pre>16 17 25 28 34 37 47 52 64</pre> ===Functional=== <~~lang~~syntaxhighlight lang="python">'''Square and cube both have prime decimal digit sums''' # p :: Int -> Bool Line 563 ⟶ 942: # MAIN --- if __name__ == '__main__': main()</~~lang~~syntaxhighlight> {{Out}} <pre>[16, 17, 25, 28, 34, 37, 47, 52, 64]</pre> Line 571 ⟶ 950: <code>isprime</code> is defined at [[Primality by trial division#Quackery]]. <~~lang~~syntaxhighlight ~~Quackery~~lang="quackery"> [ 0 swap [ dup while 10 /mod Line 583 ⟶ 962: [ i^ 1+ 3 ** digitsum isprime if [ i^ 1+ echo sp ] ] ]</~~lang~~syntaxhighlight> {{out}} Line 590 ⟶ 969: =={{header\|Raku}}== <syntaxhighlight lang="raku" ~~perl6~~line>say ^100 .grep: { .².comb.sum.is-prime && .³.comb.sum.is-prime }</~~lang~~syntaxhighlight> {{out}} <pre>(16 17 25 28 34 37 47 52 64)</pre> =={{header\|Ring}}== <~~lang~~syntaxhighlight lang="ring"> load "stdlib.ring" see "working..." +nl Line 618 ⟶ 997: see nl + "done..." + nl </syntaxhighlight> ~~</lang>~~ {{out}} <pre> Line 626 ⟶ 1,005: </pre> =={{header\|~~TinyBASIC~~Ruby}}== <syntaxhighlight lang="ruby">require 'prime' ~~This can only go up to 31 because 32^3 is too big to fit in a signed 16-bit int.~~ ~~<lang tinybasic>REM N, the number to be tested~~ ~~REM D, the digital sum of its square or cube~~ ~~REM T, temporary variable~~ ~~REM Z, did D test as prime or not~~ p (1..100).select{\|n\|(nn).digits.sum.prime? && (n3).digits.sum.prime?}</syntaxhighlight> ~~LET N = 1~~ {{out}} ~~10 LET T = NNN~~ <pre> ~~GOSUB 20~~ [16, 17, 25, 28, 34, 37, 47, 52, 64] ~~GOSUB 30~~ </pre> ~~IF Z = 0 THEN GOTO 11~~ ~~LET T = NN~~ =={{header\|Rust}}== ~~GOSUB 20~~ <syntaxhighlight lang="rust"> ~~GOSUB 30~~ fn is_prime( number : u32 ) -> bool { ~~IF Z = 0 THEN GOTO 11~~ if ~~PRINT~~number N< 2 { 11 IF N = 31 ~~THEN~~ ~~END~~false } ~~LET N = N + 1~~ else ~~GOTO 10~~{ let limit : u32 = (number as f32).sqrt( ).floor( ) as u32 ; ~~20 LET D = 0~~ let mut nums : Vec<u32> = Vec::new( ) ; ~~21 IF T = 0 THEN RETURN~~ ~~LET~~ D =for Di +in 2..=limit ~~(T-(T/10)10)~~{ ~~LET~~ T = ~~T/10~~ nums.push( i ) ; ~~GOTO~~ 21 } nums.iter( ).filter( \| n \| number % n == 0 ).count( ) == 0 ~~30 LET Z = 0~~ } ~~IF D < 2 THEN RETURN~~ } ~~LET Z = 1~~ ~~IF D < 4 THEN RETURN~~ fn to_digits( mut number : u32 ) -> Vec<u32> { ~~LET Z = 0~~ let mut digits : Vec<u32> = Vec::new( ) ; ~~IF (D/2)2 = D THEN RETURN~~ while ~~LET T~~number != 10 { let remainder : u32 = number % 10 ; ~~31 LET T = T + 2~~ IF ~~TT>D~~ ~~THEN~~digits.push( ~~GOTO~~remainder 32) ; IF (D number /~~T)T~~=D ~~THEN~~10 ~~RETURN~~; ~~GOTO 31~~} digits ~~32 LET Z = 1~~ } ~~RETURN</lang>~~ ~~{{out}}<pre>~~ fn digit_sum( number : u32 ) -> u32 { 16 let digits : Vec<u32> = to_digits( number ) ; 17 digits.iter( ).sum( ) 25 } ~~28</pre>~~ fn main() { let mut solution : Vec<u32> = Vec::new( ) ; for i in 2..=100 { let square = i i ; let cube = square * i ; if is_prime( digit_sum( square ) ) && is_prime( digit_sum(cube ) ) { solution.push( i ) ; } } println!("{:?}" , solution); }</syntaxhighlight> {{out}} <pre> [16, 17, 25, 28, 34, 37, 47, 52, 64] </pre> =={{header\|Sidef}}== <syntaxhighlight lang="ruby">1..99 -> grep { .square.digits_sum.is_prime && .cube.digits_sum.is_prime }.say</syntaxhighlight> {{out}} <pre> [16, 17, 25, 28, 34, 37, 47, 52, 64] </pre> =={{header\|Wren}}== {{libheader\|Wren-math}} <~~lang~~syntaxhighlight ~~ecmascript~~lang="wren">import "./math" for Int for (i in 1..99) { if (Int.isPrime(Int.digitSum(ii)) && Int.isPrime(Int.digitSum(iii))) System.write("%(i) ") } System.print()</~~lang~~syntaxhighlight> {{out}} Line 685 ⟶ 1,083: =={{header\|XPL0}}== <~~lang~~syntaxhighlight ~~XPL0~~lang="xpl0">func IsPrime(N); \Return 'true' if N is prime int N, I; [if N <= 2 then return N = 2; Line 710 ⟶ 1,108: if IsPrime(SumDigits(NN)) & IsPrime(SumDigits(NNN)) then [IntOut(0, N); ChOut(0, ^ )]; ]</~~lang~~syntaxhighlight> {{out}} Line 716 ⟶ 1,114: 16 17 25 28 34 37 47 52 64 </pre> ~~=={{header\|Yabasic}}==~~ ~~{{trans\|Ring}}~~ ~~<lang Yabasic>// Rosetta Code problem: http://rosettacode.org/wiki/Sum_of_square_and_cube_digits_of_an_integer_are_primes~~ ~~// by Galileo, 04/2022~~ ~~sub isPrime(n)~~ ~~local i~~ ~~if n < 4 return n >= 2~~ ~~for i = 2 to sqrt(n)~~ ~~if not mod(n, i) return false~~ ~~next~~ ~~return true~~ ~~end sub~~ ~~limit = 100~~ ~~for n = 1 to limit~~ ~~sums = 0~~ ~~sumc = 0~~ ~~sps$ = str$(n^2)~~ ~~spc$ = str$(n^3)~~ ~~for m = 1 to len(sps$)~~ ~~sums = sums + val(mid$(sps$, m, 1))~~ ~~next~~ ~~for p = 1 to len(spc$)~~ ~~sumc = sumc + val(mid$(spc$, p, 1))~~ ~~next~~ ~~if isPrime(sums) and isPrime(sumc) then~~ ~~print n, " ";~~ ~~endif~~ ~~next~~ ~~print</lang>~~ ~~{{out}}~~ ~~<pre>16 17 25 28 34 37 47 52 64~~ ~~---Program done, press RETURN---</pre>~~