Final answer:
We need to find the smallest positive integer x such that 2^n/x has exactly n digits after the decimal point, and determine the number of positive integer divisors of 2^n/x. Therefore, the number of positive integer divisors that 2n/x has would be 1.
Step-by-step explanation:
The subject of this question is Mathematics and it is suitable for High School level students.
In this question, we are given a positive integer n and we need to find the smallest positive integer x such that 2n/x has exactly n digits after the decimal point.
Let's illustrate this with an example:
If n = 3, then our decimal number would be 0.500 and the smallest positive integer divisor of x would be 2.
Therefore, the number of positive integer divisors that 2n/x has would be 1.