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Revision as of 09:25, 2 April 2021 (view source) rosettacode>Gerard Schildberger (→‎{{header\|REXX}}: added the computer programming language REXX.) ← Older edit		Latest revision as of 14:06, 3 April 2021 (view source) Simonjsaunders (talk \| contribs) m (Link to new page)
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Line 1: Task moved to [[Odd squarefree semiprimes]] one. ~~{{Draft task}}~~ ~~[[Category:Prime Numbers]]~~ ~~;Task:~~ ~~Odd numbers of the form pq where p and q are distinct primes, where '''pq < 1000'''~~ ~~<br><br>~~ ~~=={{header\|Julia}}==~~ ~~<lang julia>using Primes~~ ~~twoprimeproduct(n) = (a = factor(n).pe; length(a) == 2 && all(p -> p[2] == 1, a))~~ ~~special1k = filter(n -> isodd(n) && twoprimeproduct(n), 1:1000)~~ ~~foreach(p -> print(rpad(p[2], 4), p[1] % 20 == 0 ? "\n" : ""), enumerate(special1k))~~ ~~</lang>{{out}}~~ ~~<pre>~~ ~~15 21 33 35 39 51 55 57 65 69 77 85 87 91 93 95 111 115 119 123~~ ~~129 133 141 143 145 155 159 161 177 183 185 187 201 203 205 209 213 215 217 219~~ ~~221 235 237 247 249 253 259 265 267 287 291 295 299 301 303 305 309 319 321 323~~ ~~327 329 335 339 341 355 365 371 377 381 391 393 395 403 407 411 413 415 417 427~~ ~~437 445 447 451 453 469 471 473 481 485 489 493 497 501 505 511 515 517 519 527~~ ~~533 535 537 543 545 551 553 559 565 573 579 581 583 589 591 597 611 623 629 633~~ ~~635 649 655 667 669 671 679 681 685 687 689 695 697 699 703 707 713 717 721 723~~ ~~731 737 745 749 753 755 763 767 771 779 781 785 789 791 793 799 803 807 813 815~~ ~~817 831 835 843 849 851 865 869 871 879 889 893 895 899 901 905 913 917 921 923~~ ~~933 939 943 949 951 955 959 965 973 979 985 989 993 995~~ ~~</pre>~~ ~~=={{header\|REXX}}==~~ ~~<lang rexx>/REXX program finds squarefree semiprimes (product of 2 primes) that are less then N. /~~ ~~parse arg hi cols . /obtain optional argument from the CL./~~ ~~if hi=='' \| hi=="," then hi= 1000 /* " " " " " " /~~ ~~if cols=='' \| cols=="," then cols= 10 / " " " " " " /~~ ~~call genP /build array of semaphores for primes./~~ ~~w= 10 /width of a number in any column. /~~ ~~@sss= ' squarefree semiprimes < ' commas(1000)~~ ~~if cols>0 then say ' index │'center(@sss, 1 + cols(w+1) )~~ ~~if cols>0 then say '───────┼'center("" , 1 + cols(w+1), '─')~~ ~~idx= 1 /initialize the index of output lines./~~ ~~$=; ss.= 0 /a list of squarefree semiprimes. /~~ ~~do j=2 while @.j < hi /generate squarefree semiprimes < HI./~~ ~~do k=j+1 while @.k < hi /ensure primes are squarefree & < HI./~~ ~~_= @.j @.k /calculate the product of 2 odd primes/~~ ~~if _>=hi then leave /Is the product ≥ HI? Then skip it. /~~ ~~ss._= 1 /mark # as being squarefree semiprime./~~ ~~end /k/~~ ~~end /j/~~ ~~sss= 0 /the number of squarefree semiprimes. /~~ ~~do m=3 by 2 to hi-1 /search a list of possible candicates./~~ ~~if \ss.m then iterate /Does this number exist? No, skip it./~~ ~~sss= sss + 1 /bump count of squarefree semiprimes. /~~ ~~if cols==0 then iterate /Build the list (to be shown later)? /~~ ~~c= commas(m) /maybe add commas to the number. /~~ ~~$= $ right(c, max(w, length(c) ) ) /add a Frobenius #──►list, allow big #/~~ ~~if sss//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 /m/~~ ~~if $\=='' then say center(idx, 7)"│" substr($, 2) /possible display residual output./~~ ~~say~~ ~~say 'Found ' commas(sss) @sss~~ ~~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 ?~~ /──────────────────────────────────────────────────────────────────────────────────────/ ~~genP: @.1=2; @.2=3; @.3=5; @.4=7; @.5=11; @.6= 13 /define some low primes. /~~ ~~#=6; s.#= @.# *2 /number of primes so far; prime²/~~ ~~/ [↓] generate more primes ≤ high./~~ ~~do j=@.#+4 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? /~~ ~~if j//11==0 then iterate /" " " 11? /~~ ~~/ [↑] the above four lines saves time/~~ ~~do k=6 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.#= jj /bump # Ps; assign next P; P squared/~~ ~~end /j/; return</lang>~~ ~~{{out\|output\|text=  when using the default inputs:}}~~ ~~<pre>~~ ~~index │ squarefree semiprimes < 1,000~~ ───────┼─────────────────────────────────────────────────────────────────────────────────────────────────────────────── ~~1 │ 15 21 33 35 39 51 55 57 65 69~~ ~~11 │ 77 85 87 91 93 95 111 115 119 123~~ ~~21 │ 129 133 141 143 145 155 159 161 177 183~~ ~~31 │ 185 187 201 203 205 209 213 215 217 219~~ ~~41 │ 221 235 237 247 249 253 259 265 267 287~~ ~~51 │ 291 295 299 301 303 305 309 319 321 323~~ ~~61 │ 327 329 335 339 341 355 365 371 377 381~~ ~~71 │ 391 393 395 403 407 411 413 415 417 427~~ ~~81 │ 437 445 447 451 453 469 471 473 481 485~~ ~~91 │ 489 493 497 501 505 511 515 517 519 527~~ ~~101 │ 533 535 537 543 545 551 553 559 565 573~~ ~~111 │ 579 581 583 589 591 597 611 623 629 633~~ ~~121 │ 635 649 655 667 669 671 679 681 685 687~~ ~~131 │ 689 695 697 699 703 707 713 717 721 723~~ ~~141 │ 731 737 745 749 753 755 763 767 771 779~~ ~~151 │ 781 785 789 791 793 799 803 807 813 815~~ ~~161 │ 817 831 835 843 849 851 865 869 871 879~~ ~~171 │ 889 893 895 899 901 905 913 917 921 923~~ ~~181 │ 933 939 943 949 951 955 959 965 973 979~~ ~~191 │ 985 989 993 995~~ ~~Found 194 squarefree semiprimes < 1,000~~ ~~</pre>~~ ~~=={{header\|Ring}}==~~ ~~<lang ring>~~ ~~load "stdlib.ring"~~ ~~see "working..." + nl~~ ~~see "Special odd numbers are:" + nl~~ ~~row = 0~~ ~~limit1 = 150~~ ~~Prim = []~~ ~~for n = 1 to limit1~~ ~~for m = n+1 to limit1-1~~ ~~if isprime(n) and isprime(m)~~ ~~prod = n*m~~ ~~if prod%2 = 1~~ ~~add(Prim,prod)~~ ok ok ~~next~~ ~~next~~ ~~Prim = sort(Prim)~~ ~~for n = 1 to len(Prim)~~ ~~if Prim[n] > 1000~~ ~~n = n - 1~~ ~~exit~~ ok ~~see "" + Prim[n] + " "~~ ~~if n%10 = 0~~ ~~see nl~~ ok ~~next~~ ~~see nl + "Found " + n + " Special odd numbers." + nl~~ ~~see "done..." + nl~~ ~~</lang>~~ ~~{{out}}~~ ~~<pre>~~ ~~working...~~ ~~Special odd numbers are:~~ ~~15 21 33 35 39 51 55 57 65 69~~ ~~77 85 87 91 93 95 111 115 119 123~~ ~~129 133 141 143 145 155 159 161 177 183~~ ~~185 187 201 203 205 209 213 215 217 219~~ ~~221 235 237 247 249 253 259 265 267 287~~ ~~291 295 299 301 303 305 309 319 321 323~~ ~~327 329 335 339 341 355 365 371 377 381~~ ~~391 393 395 403 407 411 413 415 417 427~~ ~~437 445 447 451 469 473 481 485 493 497~~ ~~505 511 515 517 527 533 535 545 551 553~~ ~~559 565 581 583 589 611 623 629 635 649~~ ~~655 667 671 679 685 689 695 697 703 707~~ ~~713 721 731 737 745 749 763 767 779 781~~ ~~791 793 799 803 817 851 869 871 889 893~~ ~~899 901 913 917 923 943 949 959 973 979~~ ~~989~~ ~~Found 151 Special odd numbers.~~ ~~done...~~ ~~</pre>~~