Cody Problem 241, which is based on Project Euler Problem 7, asks us to identify the Nth prime number. That is, the problem seeks the inverse of the prime counting function 
, which provides the number of primes less than or equal to n. The Prime Number Theorem gives approximate forms of for large n. Two such approximations are 
and the offset logarithmic integral 
, where 
(See Cody Problem 46066).
, which provides the number of primes less than or equal to n. The Prime Number Theorem gives approximate forms of for large n. Two such approximations are and the offset logarithmic integral , where (See Cody Problem 46066).Test these approximations by computing two ratios: ![r1 = [n/ln(n)]/pi(n)](data:image/png;base64,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)
and 
. Do not round the approximations to integers. For 
, you will find that the first approximation is about 13% low and the second is about 16% high. However, for 
, the first approximation is 6% low and the second is only 0.01% high.
and . Do not round the approximations to integers. For , you will find that the first approximation is about 13% low and the second is about 16% high. However, for , the first approximation is 6% low and the second is only 0.01% high. Solution Stats
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Test added to discourage lookup table solutions.
In the problem description, r1 and r2 appear to be upside down.
Corrected. Thanks, Tim.