(2/32)(3/32)(4/32)(5/32)(6/32)(7/32)(8/32)(9/32...

The following graph shows how the cumulative product decreases as more terms are added to the sequence. The product of the sequence is exactly

P=2×3×4×…×323231cap P equals the fraction with numerator 2 cross 3 cross 4 cross … cross 32 and denominator 32 to the 31st power end-fraction (2/32)(3/32)(4/32)(5/32)(6/32)(7/32)(8/32)(9/32...

AI responses may include mistakes. For legal advice, consult a professional. Learn more The following graph shows how the cumulative product

We can rewrite the product of these 31 fractions as a single expression using factorials: the product is:

To "prepare paper" for the expression , we must first define the product's range and then calculate its value. Assuming the sequence continues until the numerator reaches the denominator's value ( ), the product is: