increases beyond 14, each new term is greater than 1. Because the numerator grows factorially ( ) while the denominator grows exponentially ( 14k14 to the k-th power
The general term of the product can be expressed using factorial notation: (2/14)(3/14)(4/14)(5/14)(6/14)(7/14)(8/14)(9/14...
Infinite products are a cornerstone of analysis, often used to define functions like the Gamma function or the Riemann Zeta function. The sequence presents a unique case where the first twelve terms (for increases beyond 14, each new term is greater than 1