The Journal of the Indian Mathematical Society

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On a Paper of Andre Schlnzfel


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1 Department of Mathematics, Andhra University, Waltair, India
     

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Andre Schinzel [1] proved that the equation 3/(2n + 1) = 1/x + l/y + 1/z is solvable for any fixed integer n > 1 in three distinct odd positive integers x, y. z. Here our object is to specify certain distinct odd positive integral solutions for the above equation and to discuss the solvability.
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  • On a Paper of Andre Schlnzfel

Abstract Views: 237  |  PDF Views: 0

Authors

D. Suryanarayana
Department of Mathematics, Andhra University, Waltair, India
N. Venkateswara Rao
Department of Mathematics, Andhra University, Waltair, India

Abstract


Andre Schinzel [1] proved that the equation 3/(2n + 1) = 1/x + l/y + 1/z is solvable for any fixed integer n > 1 in three distinct odd positive integers x, y. z. Here our object is to specify certain distinct odd positive integral solutions for the above equation and to discuss the solvability.