In this paper we prove that all Smarandache concatenated k-power decimals are irrational numbers
A Smarandache-Wellin Number, SWN(n), in a given base b, is a number resulted from the concatenation ...
AbstractWe prove the recent irrationality theorem of Mahler and Bundschuh by a simpler method that a...
The studies concerning the series with Smarandache numbers have been done recently and represents an...
1. Let Sen) be the Smarandache function. In paper [1] it is proved the irrationality of i S(7). We n...
have proved the irrationality of L-,-. n=l n. The author of this note [5] showed that this is a cons...
We establish that there exist computable real numbers whose irrationality exponent is not computable...
We present the best k-digit rational bounds for a given irrational number, where the numerator has k...
The irrationality exponent a of a real number x is the supremum of the set of real numbers z for whi...
The Smarandache Irratioality Conjecture (see [lD claims: Conjecture. Let a(n) be the nth term of a S...
AbstractIn 1979 R. Apéry introduced the numbers an = Σ0n(kn)2(kn+k)2 in his irrationality proof for ...
This paper is centered around proving the irrationality of some common known real numbers. For sever...
AbstractIn 1979 R. Apéry introduced the numbers an = Σ0n(kn)2(kn + k) and un = Σ0n(kn)2(kn + k)2 in ...
Przedstawienie dowodu niewymierności liczby e oraz pi, a także ich wyższych, dowolnych potęg.Present...
Denote by sigma(k)(n) the sum of the k-th powers of the divisors of n, and let S-k = Sigma(n >= 1) (...
The Pseudo-Smarandache function was introduced by Kenichiro Kashihara in a book that is highly recom...
A Smarandache-Wellin Number, SWN(n), in a given base b, is a number resulted from the concatenation ...
AbstractWe prove the recent irrationality theorem of Mahler and Bundschuh by a simpler method that a...
The studies concerning the series with Smarandache numbers have been done recently and represents an...
1. Let Sen) be the Smarandache function. In paper [1] it is proved the irrationality of i S(7). We n...
have proved the irrationality of L-,-. n=l n. The author of this note [5] showed that this is a cons...
We establish that there exist computable real numbers whose irrationality exponent is not computable...
We present the best k-digit rational bounds for a given irrational number, where the numerator has k...
The irrationality exponent a of a real number x is the supremum of the set of real numbers z for whi...
The Smarandache Irratioality Conjecture (see [lD claims: Conjecture. Let a(n) be the nth term of a S...
AbstractIn 1979 R. Apéry introduced the numbers an = Σ0n(kn)2(kn+k)2 in his irrationality proof for ...
This paper is centered around proving the irrationality of some common known real numbers. For sever...
AbstractIn 1979 R. Apéry introduced the numbers an = Σ0n(kn)2(kn + k) and un = Σ0n(kn)2(kn + k)2 in ...
Przedstawienie dowodu niewymierności liczby e oraz pi, a także ich wyższych, dowolnych potęg.Present...
Denote by sigma(k)(n) the sum of the k-th powers of the divisors of n, and let S-k = Sigma(n >= 1) (...
The Pseudo-Smarandache function was introduced by Kenichiro Kashihara in a book that is highly recom...
A Smarandache-Wellin Number, SWN(n), in a given base b, is a number resulted from the concatenation ...
AbstractWe prove the recent irrationality theorem of Mahler and Bundschuh by a simpler method that a...
The studies concerning the series with Smarandache numbers have been done recently and represents an...