(2/14)(3/14)(4/14)(5/14)(6/14)(7/14)(8/14)(9/14...

, the term is exactly 1, and the product reaches its local minimum. As

The following graph illustrates the "U-shaped" trajectory of the sequence, highlighting the dramatic shift once the numerator surpasses the constant divisor of 14. 4. Conclusion The sequence (2/14)(3/14)(4/14)(5/14)(6/14)(7/14)(8/14)(9/14...

) act as "decay factors," significantly reducing the product's value before the linear growth of eventually dominates the exponential growth of 14k14 to the k-th power 2. Sequence Analysis , the term is exactly 1, and the