Manuals/calci/BINOMIAL

• This function gives the coefficent of the binomial distribution.
• Binomial coefficient is the set of positive integer which equals the number of combinations of k items that can be selected from a set of n items.
• The coefficients satisfy the Pascals recurrence.
• The binomial coefficents are denoted by   and it is read by n choose k.
• It is the coefficient of the   term in the polynomial expansion of the binomial thorem  .
• The coefficient is occur in the formula of binomial thorem:

  where  . 

• To find the coefficient of the binomial ,we can use several methods.

  1. Recursive formula 
  2. Multiplicative formula 
  3. Factorial formula.

• 1.Recursive Formula:

   for   and  .

• 2. Multiplicative formula:

• 3.Factorial formula:

  where  ,and which is zero when  .

• Also for the initial values   for  .
• Most compact formula for the coefficient of the binomial value is Factorial formula.
• Factorial formula is symmetric of the combination formula.

• The syntax is to calculate BINOMIAL in ZOS is  .
  •   is the number of items.
  •   is the number of selection.
• For e.g., BINOMIAL(20..25,4)
• BINOMIAL(10..14,7..8)

1. =BINOMIAL(10,3)= 120
2. =BINOMIAL(20,7)= 77520
3. =BINOMIAL(15,0)= 1
4. =BINOMIAL(12,12)=1
5. =BINOMIAL(1,-1) = 0

• BINOMDIST
• BINOMIALDIST

• Binomial Distribution
• Binomial Coefficient

• List of Main Z Functions

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