Ramanujan prime mathematics , a Ramanujan prime is a prime number that satisfies a result proven by Srinivasa Ramanujan relating to the prime-counting function .In 1919, Ramanujan published a new proof of Bertrand's postulate which, as he notes, was first proved by Chebyshev . At the end of the two-page published paper , Ramanujan derived a generalized result, and that is:equal to the number of primes less than or equal to x .converse of this result is the definition of Ramanujan primes:17 , 29, and 41. Rn is necessarily a prime number: and, hence , must increase by obtaining another prime at x = Rn . Since can increase by at most 1,For all , the boundsp n n th prime number.n tends to infinity , R n asymptotic to the 2n th prime, i.e.,results were proved by Sondow, except for the upper bound R n p 3n which was conjectured by him and proved by Laishram. The bound was improved by Sondow, Nicholson, and Noe toR n c·p 3n since it is an equality for n = 5.
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