6, the first of theseries of perfectnumbers, whoseproper factors sumto the numberitself.9, the firstodd numberthat iscomposite1, the multiplicativeidentity. Also the onlynatural number (notincluding 0) that isn'tprime or composite.30, thesmallestsphenicnumber.3, 22-1, the firstMersenne prime. Itis the first oddprime, and it isalso the 2 bitinteger maximumvalue.28, thesecondperfectnumber.25, the firstcentered squarenumber besides1 that is also asquare number.496, thethirdperfectnumber.36, the smallestnumber whichis perfect powerbut not primepower.341, thesmallest base2 Fermatpseudoprime.27, thecube of 3,the valueof 33.142857, thesmallestbase 10cyclicnumber.24, all Dirichletcharacters modn are real if andonly if n is adivisor of 24.11, the fifthprime and firstpalindromicmulti-digitnumber in base10.9814072356, thelargest perfectpower thatcontains norepeated digits inbase ten.72, thesmallestAchillesnumber.17, the sum of thefirst 4 primenumbers, and theonly prime whichis the sum of 4consecutiveprimes.1729, the Hardy–Ramanujan number, alsoknown as the secondtaxicab number; that is, thesmallest positive integerthat can be written as thesum of two positive cubesin two different ways.[1]12, thefirstsublimenumber.4, the firstcompositenumber255, 28 − 1, thesmallest perfect totientnumber that is neithera power of three northrice a prime; it is alsothe largest number thatcan be representedusing an 8-bit unsignedinteger32, thesmallestnontrivialfifth power.2, the base of thebinary numbersystem, used inalmost all moderncomputers andinformationsystems.8128, thefourthperfectnumber.6, the first of theseries of perfectnumbers, whoseproper factors sumto the numberitself.9, the firstodd numberthat iscomposite1, the multiplicativeidentity. Also the onlynatural number (notincluding 0) that isn'tprime or composite.30, thesmallestsphenicnumber.3, 22-1, the firstMersenne prime. Itis the first oddprime, and it isalso the 2 bitinteger maximumvalue.28, thesecondperfectnumber.25, the firstcentered squarenumber besides1 that is also asquare number.496, thethirdperfectnumber.36, the smallestnumber whichis perfect powerbut not primepower.341, thesmallest base2 Fermatpseudoprime.27, thecube of 3,the valueof 33.142857, thesmallestbase 10cyclicnumber.24, all Dirichletcharacters modn are real if andonly if n is adivisor of 24.11, the fifthprime and firstpalindromicmulti-digitnumber in base10.9814072356, thelargest perfectpower thatcontains norepeated digits inbase ten.72, thesmallestAchillesnumber.17, the sum of thefirst 4 primenumbers, and theonly prime whichis the sum of 4consecutiveprimes.1729, the Hardy–Ramanujan number, alsoknown as the secondtaxicab number; that is, thesmallest positive integerthat can be written as thesum of two positive cubesin two different ways.[1]12, thefirstsublimenumber.4, the firstcompositenumber255, 28 − 1, thesmallest perfect totientnumber that is neithera power of three northrice a prime; it is alsothe largest number thatcan be representedusing an 8-bit unsignedinteger32, thesmallestnontrivialfifth power.2, the base of thebinary numbersystem, used inalmost all moderncomputers andinformationsystems.8128, thefourthperfectnumber.

Untitled Bingo - Call List

(Print) Use this randomly generated list as your call list when playing the game. There is no need to say the BINGO column name. Place some kind of mark (like an X, a checkmark, a dot, tally mark, etc) on each cell as you announce it, to keep track. You can also cut out each item, place them in a bag and pull words from the bag.


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  1. 6, the first of the series of perfect numbers, whose proper factors sum to the number itself.
  2. 9, the first odd number that is composite
  3. 1, the multiplicative identity. Also the only natural number (not including 0) that isn't prime or composite.
  4. 30, the smallest sphenic number.
  5. 3, 22-1, the first Mersenne prime. It is the first odd prime, and it is also the 2 bit integer maximum value.
  6. 28, the second perfect number.
  7. 25, the first centered square number besides 1 that is also a square number.
  8. 496, the third perfect number.
  9. 36, the smallest number which is perfect power but not prime power.
  10. 341, the smallest base 2 Fermat pseudoprime.
  11. 27, the cube of 3, the value of 33.
  12. 142857, the smallest base 10 cyclic number.
  13. 24, all Dirichlet characters mod n are real if and only if n is a divisor of 24.
  14. 11, the fifth prime and first palindromic multi-digit number in base 10.
  15. 9814072356, the largest perfect power that contains no repeated digits in base ten.
  16. 72, the smallest Achilles number.
  17. 17, the sum of the first 4 prime numbers, and the only prime which is the sum of 4 consecutive primes.
  18. 1729, the Hardy–Ramanujan number, also known as the second taxicab number; that is, the smallest positive integer that can be written as the sum of two positive cubes in two different ways.[1]
  19. 12, the first sublime number.
  20. 4, the first composite number
  21. 255, 28 − 1, the smallest perfect totient number that is neither a power of three nor thrice a prime; it is also the largest number that can be represented using an 8-bit unsigned integer
  22. 32, the smallest nontrivial fifth power.
  23. 2, the base of the binary number system, used in almost all modern computers and information systems.
  24. 8128, the fourth perfect number.