Create all possible words using a set or letters
$begingroup$
Given a list of letters,
letters = { "A", "B", ..., "F" }
is it possible to get Mathematica to generate all ‘words’ (in this example, 6 letter words), if only one letter can be used one time only, e.g. ABCDEF, ABCDFE, …? TIA.
string-manipulation combinatorics
$endgroup$
add a comment |
$begingroup$
Given a list of letters,
letters = { "A", "B", ..., "F" }
is it possible to get Mathematica to generate all ‘words’ (in this example, 6 letter words), if only one letter can be used one time only, e.g. ABCDEF, ABCDFE, …? TIA.
string-manipulation combinatorics
$endgroup$
add a comment |
$begingroup$
Given a list of letters,
letters = { "A", "B", ..., "F" }
is it possible to get Mathematica to generate all ‘words’ (in this example, 6 letter words), if only one letter can be used one time only, e.g. ABCDEF, ABCDFE, …? TIA.
string-manipulation combinatorics
$endgroup$
Given a list of letters,
letters = { "A", "B", ..., "F" }
is it possible to get Mathematica to generate all ‘words’ (in this example, 6 letter words), if only one letter can be used one time only, e.g. ABCDEF, ABCDFE, …? TIA.
string-manipulation combinatorics
string-manipulation combinatorics
edited 2 hours ago
J. M. is slightly pensive♦
98.3k10307466
98.3k10307466
asked 3 hours ago
mf67mf67
976
976
add a comment |
add a comment |
3 Answers
3
active
oldest
votes
$begingroup$
You can create permutations with all of the letters as strings with:
StringJoin /@ Permutations[letters]
If you want lists of the individual letters just use:
Permutations[letters]
Check the documentation of Permutations to learn about permutations with subsets of letters. If you want to use each letter more than once, look at the documentation for Tuples.
$endgroup$
$begingroup$
Thanks(x2). Is there some way to check how many words contain a ‘sub-word’, like ‘ab’ or even a set of ‘sub-words’ like ‘ab’ and ‘cd’? And is there any web page or text book that deals with combinatorics in Mathematica (on a more ‘basic’ level) that I could visit/buy and read?
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– mf67
1 hour ago
add a comment |
$begingroup$
Pemutations will do it:
letters = {"a", "b", "c"};
Permutations[letters, {3}]
{{"a", "b", "c"}, {"a", "c", "b"}, {"b", "a", "c"},
{"b", "c", "a"}, {"c", "a", "b"}, {"c", "b", "a"}}
$endgroup$
add a comment |
$begingroup$
If I follow the OP's question, I think they want the following:
letters = {"a", "b", "c"};
p = Permutations[letters, {#}] & /@ Range[Length[letters]];
(StringJoin[#] & /@ #) & /@ p
{{a, b, c}, {ab, ac, ba, bc, ca, cb}, {abc, acb, bac, bca, cab, cba}}
$endgroup$
add a comment |
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3 Answers
3
active
oldest
votes
3 Answers
3
active
oldest
votes
active
oldest
votes
active
oldest
votes
$begingroup$
You can create permutations with all of the letters as strings with:
StringJoin /@ Permutations[letters]
If you want lists of the individual letters just use:
Permutations[letters]
Check the documentation of Permutations to learn about permutations with subsets of letters. If you want to use each letter more than once, look at the documentation for Tuples.
$endgroup$
$begingroup$
Thanks(x2). Is there some way to check how many words contain a ‘sub-word’, like ‘ab’ or even a set of ‘sub-words’ like ‘ab’ and ‘cd’? And is there any web page or text book that deals with combinatorics in Mathematica (on a more ‘basic’ level) that I could visit/buy and read?
$endgroup$
– mf67
1 hour ago
add a comment |
$begingroup$
You can create permutations with all of the letters as strings with:
StringJoin /@ Permutations[letters]
If you want lists of the individual letters just use:
Permutations[letters]
Check the documentation of Permutations to learn about permutations with subsets of letters. If you want to use each letter more than once, look at the documentation for Tuples.
$endgroup$
$begingroup$
Thanks(x2). Is there some way to check how many words contain a ‘sub-word’, like ‘ab’ or even a set of ‘sub-words’ like ‘ab’ and ‘cd’? And is there any web page or text book that deals with combinatorics in Mathematica (on a more ‘basic’ level) that I could visit/buy and read?
$endgroup$
– mf67
1 hour ago
add a comment |
$begingroup$
You can create permutations with all of the letters as strings with:
StringJoin /@ Permutations[letters]
If you want lists of the individual letters just use:
Permutations[letters]
Check the documentation of Permutations to learn about permutations with subsets of letters. If you want to use each letter more than once, look at the documentation for Tuples.
$endgroup$
You can create permutations with all of the letters as strings with:
StringJoin /@ Permutations[letters]
If you want lists of the individual letters just use:
Permutations[letters]
Check the documentation of Permutations to learn about permutations with subsets of letters. If you want to use each letter more than once, look at the documentation for Tuples.
answered 2 hours ago
LeeLee
46027
46027
$begingroup$
Thanks(x2). Is there some way to check how many words contain a ‘sub-word’, like ‘ab’ or even a set of ‘sub-words’ like ‘ab’ and ‘cd’? And is there any web page or text book that deals with combinatorics in Mathematica (on a more ‘basic’ level) that I could visit/buy and read?
$endgroup$
– mf67
1 hour ago
add a comment |
$begingroup$
Thanks(x2). Is there some way to check how many words contain a ‘sub-word’, like ‘ab’ or even a set of ‘sub-words’ like ‘ab’ and ‘cd’? And is there any web page or text book that deals with combinatorics in Mathematica (on a more ‘basic’ level) that I could visit/buy and read?
$endgroup$
– mf67
1 hour ago
$begingroup$
Thanks(x2). Is there some way to check how many words contain a ‘sub-word’, like ‘ab’ or even a set of ‘sub-words’ like ‘ab’ and ‘cd’? And is there any web page or text book that deals with combinatorics in Mathematica (on a more ‘basic’ level) that I could visit/buy and read?
$endgroup$
– mf67
1 hour ago
$begingroup$
Thanks(x2). Is there some way to check how many words contain a ‘sub-word’, like ‘ab’ or even a set of ‘sub-words’ like ‘ab’ and ‘cd’? And is there any web page or text book that deals with combinatorics in Mathematica (on a more ‘basic’ level) that I could visit/buy and read?
$endgroup$
– mf67
1 hour ago
add a comment |
$begingroup$
Pemutations will do it:
letters = {"a", "b", "c"};
Permutations[letters, {3}]
{{"a", "b", "c"}, {"a", "c", "b"}, {"b", "a", "c"},
{"b", "c", "a"}, {"c", "a", "b"}, {"c", "b", "a"}}
$endgroup$
add a comment |
$begingroup$
Pemutations will do it:
letters = {"a", "b", "c"};
Permutations[letters, {3}]
{{"a", "b", "c"}, {"a", "c", "b"}, {"b", "a", "c"},
{"b", "c", "a"}, {"c", "a", "b"}, {"c", "b", "a"}}
$endgroup$
add a comment |
$begingroup$
Pemutations will do it:
letters = {"a", "b", "c"};
Permutations[letters, {3}]
{{"a", "b", "c"}, {"a", "c", "b"}, {"b", "a", "c"},
{"b", "c", "a"}, {"c", "a", "b"}, {"c", "b", "a"}}
$endgroup$
Pemutations will do it:
letters = {"a", "b", "c"};
Permutations[letters, {3}]
{{"a", "b", "c"}, {"a", "c", "b"}, {"b", "a", "c"},
{"b", "c", "a"}, {"c", "a", "b"}, {"c", "b", "a"}}
answered 2 hours ago
bill sbill s
54.6k377157
54.6k377157
add a comment |
add a comment |
$begingroup$
If I follow the OP's question, I think they want the following:
letters = {"a", "b", "c"};
p = Permutations[letters, {#}] & /@ Range[Length[letters]];
(StringJoin[#] & /@ #) & /@ p
{{a, b, c}, {ab, ac, ba, bc, ca, cb}, {abc, acb, bac, bca, cab, cba}}
$endgroup$
add a comment |
$begingroup$
If I follow the OP's question, I think they want the following:
letters = {"a", "b", "c"};
p = Permutations[letters, {#}] & /@ Range[Length[letters]];
(StringJoin[#] & /@ #) & /@ p
{{a, b, c}, {ab, ac, ba, bc, ca, cb}, {abc, acb, bac, bca, cab, cba}}
$endgroup$
add a comment |
$begingroup$
If I follow the OP's question, I think they want the following:
letters = {"a", "b", "c"};
p = Permutations[letters, {#}] & /@ Range[Length[letters]];
(StringJoin[#] & /@ #) & /@ p
{{a, b, c}, {ab, ac, ba, bc, ca, cb}, {abc, acb, bac, bca, cab, cba}}
$endgroup$
If I follow the OP's question, I think they want the following:
letters = {"a", "b", "c"};
p = Permutations[letters, {#}] & /@ Range[Length[letters]];
(StringJoin[#] & /@ #) & /@ p
{{a, b, c}, {ab, ac, ba, bc, ca, cb}, {abc, acb, bac, bca, cab, cba}}
answered 1 hour ago
JagraJagra
7,85312159
7,85312159
add a comment |
add a comment |
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