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- Blum_integer abstract "In mathematics, a natural number n is a Blum integer if n = p×q is a semiprime for which p and q are distinct prime numbers congruent to 3 mod 4. That is, p and q must be of the form 4t+3, for some integer t. Integers of this form are referred to as Blum primes. This means that the factors of a Blum integer are Gaussian primes with no imaginary part. The first few Blum integers are21, 33, 57, 69, 77, 93, 129, 133, 141, 161, 177, 201, 209, 213, 217, 237, 249, 253, 301, 309, 321, 329, 341, 381, 393, 413, 417, 437, 453, 469, 473, 489, 497, ... (sequence A016105 in OEIS)Blum integers were named for computer scientist Manuel Blum.".
- Blum_integer wikiPageID "2218352".
- Blum_integer wikiPageLength "2799".
- Blum_integer wikiPageOutDegree "24".
- Blum_integer wikiPageRevisionID "646838278".
- Blum_integer wikiPageWikiLink 129_(number).
- Blum_integer wikiPageWikiLink 133_(number).
- Blum_integer wikiPageWikiLink 141_(number).
- Blum_integer wikiPageWikiLink 161_(number).
- Blum_integer wikiPageWikiLink 177_(number).
- Blum_integer wikiPageWikiLink 21_(number).
- Blum_integer wikiPageWikiLink 33_(number).
- Blum_integer wikiPageWikiLink 57_(number).
- Blum_integer wikiPageWikiLink 69_(number).
- Blum_integer wikiPageWikiLink 77_(number).
- Blum_integer wikiPageWikiLink 93_(number).
- Blum_integer wikiPageWikiLink Category:Integer_sequences.
- Blum_integer wikiPageWikiLink Gaussian_integer.
- Blum_integer wikiPageWikiLink General_number_field_sieve.
- Blum_integer wikiPageWikiLink Jacobi_symbol.
- Blum_integer wikiPageWikiLink Manuel_Blum.
- Blum_integer wikiPageWikiLink Mathematics.
- Blum_integer wikiPageWikiLink Modular_arithmetic.
- Blum_integer wikiPageWikiLink Natural_number.
- Blum_integer wikiPageWikiLink Prime_number.
- Blum_integer wikiPageWikiLink Quadratic_residue.
- Blum_integer wikiPageWikiLink Quadratic_sieve.
- Blum_integer wikiPageWikiLink RSA_(cryptosystem).
- Blum_integer wikiPageWikiLink Semiprime.
- Blum_integer wikiPageWikiLinkText "Blum integer".
- Blum_integer wikiPageUsesTemplate Template:OEIS.
- Blum_integer wikiPageUsesTemplate Template:Reflist.
- Blum_integer subject Category:Integer_sequences.
- Blum_integer hypernym Integer.
- Blum_integer type Combinatoric.
- Blum_integer type Integer.
- Blum_integer comment "In mathematics, a natural number n is a Blum integer if n = p×q is a semiprime for which p and q are distinct prime numbers congruent to 3 mod 4. That is, p and q must be of the form 4t+3, for some integer t. Integers of this form are referred to as Blum primes. This means that the factors of a Blum integer are Gaussian primes with no imaginary part.".
- Blum_integer label "Blum integer".
- Blum_integer sameAs Q904395.
- Blum_integer sameAs Entier_de_Blum.
- Blum_integer sameAs Intero_di_Blum.
- Blum_integer sameAs ブラム数.
- Blum_integer sameAs 블럼_정수.
- Blum_integer sameAs m.06wsrt.
- Blum_integer sameAs Q904395.
- Blum_integer wasDerivedFrom Blum_integer?oldid=646838278.
- Blum_integer isPrimaryTopicOf Blum_integer.