Advances in Pure Mathematics
Vol.05 No.13(2015), Article ID:60982,3 pages
10.4236/apm.2015.513071
Integer Part of Cube Root and Its Combination
Zhongguo Zhou
College of Science, Hohai University, Nanjing, China
Copyright © 2015 by author and Scientific Research Publishing Inc.
This work is licensed under the Creative Commons Attribution International License (CC BY).
Received 6 July 2015; accepted 8 November 2015; published 11 November 2015
ABSTRACT
For the cube root of a positive integer, a direct method to determine the floor of integer combination of the cube root and its square is given.
Keywords:
Cube Root, Integer Part, Continued Fraction
1. Introduction
The continued fraction expansion of 
can be calculated as follow(cf. [1] -[3] ).
Because
hence
When one calculates the continued fraction expansion of 
it is important to determine the integer part of 
For square root, its continued fraction expansion can be obtained easily because it is circled while there is no obvious method to do so for cube root. In this note, we will determine the integer part of cube root and its combination. So we can achieve the continued fraction expansion of cube root according to the integer part of the cube root.
2. Main Results
Let N be a positive integer and not a cube. Denote 
as its cube root. For 
set
Then these numbers are satisfied the identity:
(1)
We achieve two interesting properties on 
and
.
Theorem 1. If
, then
. Therefore the number 
has the same sign as M.
We consider two cases respectively.
1) If
.
a) If
. Substituting 
into the expression
, then we have
since every term in the last expression is nonnegative.
b) If
. We have also the similar expression as case a):
The above inequality holds because 
2) If 
a) If 
Then we have
We also have
Hence by the identity (1)
b) If 
Then 
Because of 
therefore
So we show that 
for both cases. According to identity (1), both 
and M have the same sign.
Remark 1. The result is very amazing. Because the quotient ring 
is a filed, where 
is the maximal ideal generated by the irreducible polynomial
. For any 
there exists 
such that
But it is surprising that the number 
defined in Theorem 1 is always positive.
Theorem 2. If 
and 
then
That is to say, 
is the biggest integer less than or equal to 
According to Theorem 1,
Hence
So
The proof is completed.
Remark 2. Applying the Theorem 2, we can design an algorithm to calculate the continued fraction expansion of the cube root
.
Acknowledgements
The authors wish to thank Prof. Xiangqin Meng for her some helpful advices.
Cite this paper
ZhongguoZhou, (2015) Integer Part of Cube Root and Its Combination. Advances in Pure Mathematics,05,774-776. doi: 10.4236/apm.2015.513071
References