(2/65)(3/65)(4/65)(5/65)(6/65)(7/65)(8/65)(9/65... Apr 2026

The mathematical expression you provided follows the form of a product of fractions:

This sequence can be expressed using factorials. For any given , the product is: (2/65)(3/65)(4/65)(5/65)(6/65)(7/65)(8/65)(9/65...

: Calculations for specific "matching" problems or variations of the Birthday Paradox (though usually with a denominator of 365). The mathematical expression you provided follows the form

RAPD PCR detects co-colonisation of multiple group B ... - PMC - PMC While this specific set of fractions

While this specific set of fractions (denominator 65) does not appear as a standard named constant in common mathematics, similar products appear in:

k!65k−1the fraction with numerator k exclamation mark and denominator 65 raised to the k minus 1 power end-fraction (Note: Since the sequence starts at , the denominator exponent is because there are terms in the product.) Calculated Values

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