Cyclops numbers
A cyclops number is a number with an odd number of digits that has a zero in the center, but nowhere else. They are named so in tribute to the one eyed giants Cyclops from Greek mythology.
Cyclops numbers can be found in any base. This task strictly is looking for cyclops numbers in base 10.
There are many different classifications of cyclops numbers with minor differences in characteristics. In an effort to head off a whole series of tasks with tiny variations, we will cover several variants here.
- Task
- Find and display here on this page the first 50 cyclops numbers in base 10 (all of the sub tasks are restricted to base 10).
- Find and display here on this page the first 50 prime cyclops numbers. (cyclops numbers that are prime.)
- Find and display here on this page the first 50 blind prime cyclops numbers. (prime cyclops numbers that remain prime when "blinded"; the zero is removed from the center.)
- Find and display here on this page the first 50 palindromic prime cyclops numbers. (prime cyclops numbers that are palindromes.)
- Stretch
- Find and display the first cyclops number greater than ten million (10,000,000) and the index (place) in the series where it is found.
- Find and display the first prime cyclops number greater than ten million (10,000,000) and the index (place) in the series where it is found.
- Find and display the first blind prime cyclops number greater than ten million (10,000,000) and the index (place) in the series where it is found.
- Find and display the first palindromic prime cyclops number greater than ten million (10,000,000) and the index (place) in the series where it is found.
(Note: there are no cyclops numbers between ten million and one hundred million, they need to have an odd number of digits)
- See also
Raku
<lang perl6>use Lingua::EN::Numbers;
my @cyclops = lazy gather for 0..* -> $exp {
(exp($exp, 10) ..^ exp($exp + 1, 10)).map: -> $start { next if $start.contains: 0; for exp($exp, 10) ..^ exp($exp + 1, 10) -> $end { next if $end.contains: 0; take $start ~ 0 ~ $end; } }
}
my @prime-cyclops = @cyclops.grep: { .is-prime };
for , @cyclops,
'prime ', @prime-cyclops, 'blind prime ', @prime-cyclops.grep( { .trans('0' => ).is-prime } ), 'palindromic prime ', @prime-cyclops.grep( { $_ eq .flip } ) -> $type, $iterator { say "\n\nFirst 50 {$type}cyclops numbers:\n" ~ $iterator[^50].batch(10)».fmt("%7d").join("\n") ~ "\n\nFirst {$type}cyclops number > 10,000,000: " ~ comma($iterator.first: * > 1e7 ) ~ " - at (zero based) index: " ~ comma $iterator.first: * > 1e7, :k;
}</lang>
- Output:
First 50 cyclops numbers: 101 102 103 104 105 106 107 108 109 201 202 203 204 205 206 207 208 209 301 302 303 304 305 306 307 308 309 401 402 403 404 405 406 407 408 409 501 502 503 504 505 506 507 508 509 601 602 603 604 605 First cyclops number > 10,000,000: 111,101,111 - at (zero based) index: 538,083 First 50 prime cyclops numbers: 101 103 107 109 307 401 409 503 509 601 607 701 709 809 907 11027 11047 11057 11059 11069 11071 11083 11087 11093 12011 12037 12041 12043 12049 12071 12073 12097 13033 13037 13043 13049 13063 13093 13099 14011 14029 14033 14051 14057 14071 14081 14083 14087 15013 15017 First prime cyclops number > 10,000,000: 111,101,129 - at (zero based) index: 39,319 First 50 blind prime cyclops numbers: 101 103 107 109 307 401 503 509 601 607 701 709 809 907 11071 11087 11093 12037 12049 12097 13099 14029 14033 14051 14071 14081 14083 14087 15031 15053 15083 16057 16063 16067 16069 16097 17021 17033 17041 17047 17053 17077 18047 18061 18077 18089 19013 19031 19051 19073 First blind prime cyclops number > 10,000,000: 111,101,161 - at (zero based) index: 11,393 First 50 palindromic prime cyclops numbers: 101 16061 31013 35053 38083 73037 74047 91019 94049 1120211 1150511 1160611 1180811 1190911 1250521 1280821 1360631 1390931 1490941 1520251 1550551 1580851 1630361 1640461 1660661 1670761 1730371 1820281 1880881 1930391 1970791 3140413 3160613 3260623 3310133 3380833 3460643 3470743 3590953 3670763 3680863 3970793 7190917 7250527 7310137 7540457 7630367 7690967 7750577 7820287 First palindromic prime cyclops number > 10,000,000: 114,808,411 - at (zero based) index: 66
REXX
<lang rexx>/*REXX pprogram finds and displays the first fifty cyclops numbers, cyclops primes,*/ /*─────────────────────────────── blind cyclops primes, and palindromic cyclops primes.*/ parse arg n cols . /*obtain optional argument from the CL.*/ if n== | n=="," then n= 50 /*Not specified? Then use the default.*/ if cols== | cols=="," then cols= 10 /* " " " " " " */ call genP /*build array of semaphores for primes.*/ w= max(10, length( commas(@.#) ) ) /*max width of a number in any column. */
first= ' the first '
isPri= 0; isBli= 0; isPal= 0; call 0 first commas(n) " cyclops numbers" isPri= 1; isBli= 0; isPal= 0; call 0 first commas(n) " prime cyclops numbers" isPri= 1; isBli= 1; isPal= 0; call 0 first commas(n) " blind prime cyclops numbers" isPri= 1; isBli= 0; isPal= 1; call 0 first commas(n) " palindromic prime cyclops numbers" 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 ? /*──────────────────────────────────────────────────────────────────────────────────────*/ 0: parse arg title /*get the title of this output section.*/
say ' index │'center(title, 1 + cols*(w+1) ) say '───────┼'center("" , 1 + cols*(w+1), '─') finds= 0; idx= 1 /*define # of a type of cyclops # & idx*/ $= /*$: list of the numbers found (so far)*/ do j=101 until finds== n; L= length(j) /*$: list of the numbers found (so far)*/ if L//2==0 then iterate /*Not a cyclops # (odd length)? Skip.*/ z= pos(0, j); if z\==(L+1)%2 then iterate /* " " " " (zero in mid)? " */ if pos(0, j, z+1)>0 then iterate /* " " " " (has two 0's)? " */ if isPri then if \!.j then iterate /*Need a cyclops prime? Then skip.*/ if isBli then do; ?= space(translate(j,,0), 0) /*Need a blind cyclops prime ? */ if \!.? then iterate /*Not a blind cyclops prime? Then skip.*/ end if isPal then do; r= reverse(j) /*Need a palindromic cyclops prime? */ if r\==j then iterate /*Cyclops number not palindromic? Skip.*/ if \!.r then iterate /*Cyclops palindromic not prime? Skip.*/ end finds= finds + 1 /*bump the number of palindromic primes*/ if cols<0 then iterate /*Build the list (to be shown later)? */ $= $ right( commas(j), w) /*add a palindromic prime ──► $ 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*/
if $\== then say center(idx, 7)"│" substr($, 2) /*possible show residual output.*/ say '───────┴'center("" , 1 + cols*(w+1), '─'); say; say return
/*──────────────────────────────────────────────────────────────────────────────────────*/ genP: !.= 0; hip= 8000000 - 1 /*placeholders for primes (semaphores).*/
@.1=2; @.2=3; @.3=5; @.4=7; @.5=11 /*define some low primes. */ !.2=1; !.3=1; !.5=1; !.7=1; !.11=1 /* " " " " flags. */ #=5; s.#= @.# **2 /*number of primes so far; prime². */ do j=@.#+2 by 2 to hip /*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 │ the first 50 cyclops numbers ───────┼─────────────────────────────────────────────────────────────────────────────────────────────────────────────── 1 │ 101 102 103 104 105 106 107 108 109 201 11 │ 202 203 204 205 206 207 208 209 301 302 21 │ 303 304 305 306 307 308 309 401 402 403 31 │ 404 405 406 407 408 409 501 502 503 504 41 │ 505 506 507 508 509 601 602 603 604 605 ───────┴─────────────────────────────────────────────────────────────────────────────────────────────────────────────── index │ the first 50 prime cyclops numbers ───────┼─────────────────────────────────────────────────────────────────────────────────────────────────────────────── 1 │ 101 103 107 109 307 401 409 503 509 601 11 │ 607 701 709 809 907 11,027 11,047 11,057 11,059 11,069 21 │ 11,071 11,083 11,087 11,093 12,011 12,037 12,041 12,043 12,049 12,071 31 │ 12,073 12,097 13,033 13,037 13,043 13,049 13,063 13,093 13,099 14,011 41 │ 14,029 14,033 14,051 14,057 14,071 14,081 14,083 14,087 15,013 15,017 ───────┴─────────────────────────────────────────────────────────────────────────────────────────────────────────────── index │ the first 50 blind prime cyclops numbers ───────┼─────────────────────────────────────────────────────────────────────────────────────────────────────────────── 1 │ 101 103 107 109 307 401 503 509 601 607 11 │ 701 709 809 907 11,071 11,087 11,093 12,037 12,049 12,097 21 │ 13,099 14,029 14,033 14,051 14,071 14,081 14,083 14,087 15,031 15,053 31 │ 15,083 16,057 16,063 16,067 16,069 16,097 17,021 17,033 17,041 17,047 41 │ 17,053 17,077 18,047 18,061 18,077 18,089 19,013 19,031 19,051 19,073 ───────┴─────────────────────────────────────────────────────────────────────────────────────────────────────────────── index │ the first 50 palindromic prime cyclops numbers ───────┼─────────────────────────────────────────────────────────────────────────────────────────────────────────────── 1 │ 101 16,061 31,013 35,053 38,083 73,037 74,047 91,019 94,049 1,120,211 11 │ 1,150,511 1,160,611 1,180,811 1,190,911 1,250,521 1,280,821 1,360,631 1,390,931 1,490,941 1,520,251 21 │ 1,550,551 1,580,851 1,630,361 1,640,461 1,660,661 1,670,761 1,730,371 1,820,281 1,880,881 1,930,391 31 │ 1,970,791 3,140,413 3,160,613 3,260,623 3,310,133 3,380,833 3,460,643 3,470,743 3,590,953 3,670,763 41 │ 3,680,863 3,970,793 7,190,917 7,250,527 7,310,137 7,540,457 7,630,367 7,690,967 7,750,577 7,820,287 ───────┴───────────────────────────────────────────────────────────────────────────────────────────────────────────────
Wren
<lang ecmascript>import "/math" for Int import "/seq" for Lst import "/fmt" for Fmt import "/str" for Str
var findFirst = Fn.new { |list|
var i = 0 for (n in list) { if (n > 1e7) return [n, i] i = i + 1 }
}
var ranges = [0..0, 101..909, 11011..99099, 1110111..9990999, 111101111..119101111] var cyclops = [] for (r in ranges) {
var numDigits = r.from.toString.count var center = (numDigits / 2).floor for (i in r) { var digits = Int.digits(i) if (digits[center] == 0 && digits.count { |d| d == 0 } == 1) cyclops.add(i) }
}
System.print("The first 50 cyclops numbers are:") var candidates = cyclops[0...50] var ni = findFirst.call(cyclops) for (chunk in Lst.chunks(candidates, 10)) Fmt.print("$,6d", chunk) Fmt.print("\nFirst such number > 10 million is $,d at zero-based index $,d", ni[0], ni[1])
System.print("\n\nThe first 50 prime cyclops numbers are:") var primes = cyclops.where { |n| Int.isPrime(n) } candidates = primes.take(50).toList ni = findFirst.call(primes) for (chunk in Lst.chunks(candidates, 10)) Fmt.print("$,6d", chunk) Fmt.print("\nFirst such number > 10 million is $,d at zero-based index $,d", ni[0], ni[1])
System.print("\n\nThe first 50 blind prime cyclops numbers are:") var bpcyclops = [] var ppcyclops = [] for (p in primes) {
var ps = p.toString var numDigits = ps.count var center = (numDigits/2).floor var noMiddle = Num.fromString(Str.delete(ps, center)) if (Int.isPrime(noMiddle)) bpcyclops.add(p) if (ps == ps[-1..0]) ppcyclops.add(p)
} candidates = bpcyclops[0...50] ni = findFirst.call(bpcyclops) for (chunk in Lst.chunks(candidates, 10)) Fmt.print("$,6d", chunk) Fmt.print("\nFirst such number > 10 million is $,d at zero-based index $,d", ni[0], ni[1])
System.print("\n\nThe first 50 palindromic prime cyclops numbers are:") candidates = ppcyclops[0...50] ni = findFirst.call(ppcyclops) for (chunk in Lst.chunks(candidates, 8)) Fmt.print("$,9d", chunk) Fmt.print("\nFirst such number > 10 million is $,d at zero-based index $,d", ni[0], ni[1])</lang>
- Output:
The first 50 cyclops numbers are: 0 101 102 103 104 105 106 107 108 109 201 202 203 204 205 206 207 208 209 301 302 303 304 305 306 307 308 309 401 402 403 404 405 406 407 408 409 501 502 503 504 505 506 507 508 509 601 602 603 604 First such number > 10 million is 111,101,111 at zero-based index 538,084 The first 50 prime cyclops numbers are: 101 103 107 109 307 401 409 503 509 601 607 701 709 809 907 11,027 11,047 11,057 11,059 11,069 11,071 11,083 11,087 11,093 12,011 12,037 12,041 12,043 12,049 12,071 12,073 12,097 13,033 13,037 13,043 13,049 13,063 13,093 13,099 14,011 14,029 14,033 14,051 14,057 14,071 14,081 14,083 14,087 15,013 15,017 First such number > 10 million is 111,101,129 at zero-based index 39,319 The first 50 blind prime cyclops numbers are: 101 103 107 109 307 401 503 509 601 607 701 709 809 907 11,071 11,087 11,093 12,037 12,049 12,097 13,099 14,029 14,033 14,051 14,071 14,081 14,083 14,087 15,031 15,053 15,083 16,057 16,063 16,067 16,069 16,097 17,021 17,033 17,041 17,047 17,053 17,077 18,047 18,061 18,077 18,089 19,013 19,031 19,051 19,073 First such number > 10 million is 111,101,161 at zero-based index 11,393 The first 50 palindromic prime cyclops numbers are: 101 16,061 31,013 35,053 38,083 73,037 74,047 91,019 94,049 1,120,211 1,150,511 1,160,611 1,180,811 1,190,911 1,250,521 1,280,821 1,360,631 1,390,931 1,490,941 1,520,251 1,550,551 1,580,851 1,630,361 1,640,461 1,660,661 1,670,761 1,730,371 1,820,281 1,880,881 1,930,391 1,970,791 3,140,413 3,160,613 3,260,623 3,310,133 3,380,833 3,460,643 3,470,743 3,590,953 3,670,763 3,680,863 3,970,793 7,190,917 7,250,527 7,310,137 7,540,457 7,630,367 7,690,967 7,750,577 7,820,287 First such number > 10 million is 114,808,411 at zero-based index 66