How many alphabets need to be there in a language if one were to make 1 million distinct 3 digit initials using the alphabets of the language?(a) 26 (b) 50 (c) 100 (d) 1000

• 1 million distinct 3 digit initials are needed.
  
  Let the number of required alphabets in the language be ‘n’.
  
  Therefore, using ‘n’ alphabets we can form n * n * n = n3 distinct 3 digit initials.
  
  Note distinct initials is different from initials where the digits are different.
  For instance, AAA and BBB are acceptable combinations in the case of distinct initials while they are not permitted when the digits of the initials need to be different.
  
  This n3 different initials = 1 million
  
  i.e. n3 = 106 (1 million = 106)
  => n3 = (102)3 => n = 102 = 100
  
  Hence, the language needs to have a minimum of 100 alphabets to achieve the objective.
• 11 years agoHelpfull: Yes(28) No(12)
• 1 million distinct 3 digit initials are needed.
  Let the number of required alphabets in the language be ‘n’.
  Therefore, using ‘n’ alphabets we can form n * n * n = n^3 distinct 3 digit initials.
  Note distinct initials is different from initials where the digits are different.
  For instance, AAA and BBB are acceptable combinations in the case of distinct initials while they are not permitted when the digits of the initials need to be different.
  This n^3 different initials = 1 million
  i.e. n^3 = 10^6 (1 million = 10^6)
  => n^3 = (10^2)^3 => n = 10^2 = 100
  Hence, the language needs to have a minimum of 100 alphabets to achieve the objective.
• 9 years agoHelpfull: Yes(2) No(0)