Observation on Sums of Powers of Integers Divisible by Four

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1 Applied Mathematical Sciences, Vol. 8, 2014, no. 45, HIKARI Ltd, Observation on Sums of Powers of Integers Divisible by Four Djoko Suprijanto Combinatorial Mathematics Research Group Faculty of Mathematics and Natural Sciences Institut Teknologi Bandung, Bandung 40132, Indonesia Rusliansyah Department of Mathematics Teaching Faculty of Mathematics and Natural Sciences Institut Teknologi Bandung, Bandung 40132, Indonesia Copyright c 2014 D. Suprijanto and Rusliansyah. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited. Abstract Gulliver (2010) considered the sum of powers of integers divisible by two and obtained a simple derivation of some well known sequences as well as construction of many new sequences. Continuing the effort of Gulliver, we consider the sum of powers of integers divisible by four which were not observed by him. We obtain a simple derivation of some well known sequences as well as a construction of many new sequences. We also derive several properties of divisibility of the sequences. Mathematics Subject Classification: 11Y55, 11B50 Keywords: integer sequences, divisibility 1 Introduction The sums of powers of integers have been the subject of research for many years. Among very recent results is the paper of Gulliver [1] where he introduced a new

2 2220 Djoko Suprijanto and Rusliansyah method to reconstructed several well known integer sequences in an elementary way. His method is based on an observation to the following sum of the first n of m-th powers (2k) m (1) and the property of its divisibility. By looking at the sequences (2k) m for any fixed positive integer n, Gulliver reconstructed several known sequences in an easy manner, as well as constructed many new sequences. For examples, for n=2, and n=3 the sequences { 2 (2k) m} and{ 3 m=1 (2k)m} are A m=1 and A074533, in the On-line Encyclopedia of Integer Sequences [2], respectively. Moreover, by fixing the value of m he also succeed to reconstruct another known sequences. As examples, for m=1 and m=2, he obtained the sequences { n (2k)} and { n (2k)2} which are sequence A and A002492, in the On-line Encyclopedia of Integer Sequences [2], respectively. The purpose of this paper is to further discuss the sequences observed by Gulliver, namely the sequences generated by the sum of power of integers of the form (4k) m. By considering sequences of the above form, we succeed to reconstruct several known sequences. We also construct many new sequences which were unknown to exist in [2] before. We follow the method and observation introduced by Gulliver in [1]. m=1, 2 Results In this section we consider the sum of the first n of m-th powers of 4k as follows (4k) m. (2) We divide our observation into two cases: n fixed and m fixed.

3 Observation on sums of powers of integers divisible by four Case 1: n fixed For, we have{4 m }, the sequence A in [2]. For n=2 to 10, the values are 12, 80, 576, 4352, 33792, ,... 24, 224, 2304, 25088, , ,... 40, 480, 6400, 90624, , ,... 60, 880, 14400, , , ,... 84, 1456, 28244, , , , , 2240, 50176, , , , , 3246, 82944, , , , , 4560, , , , , , 6160, , , , ,... (3) The first row is the sequence A in [2] while the other rows are new. Moreover, the first column is the sequence A in [2] while the other columns are new. Considering the third, fourth, eighth, and ninth, row in (3), we find a regularity in the unit digits, namely Proposition 2.1 For any positive integer m, 10 (4k) m m 0 (mod 4), for n=4, 5, 9, and 10. (4) In order to see Proposition 2.1 more clearly, let us observe the unit digit of sequence (2) in the Table 1: power n (number of terms) m Table 1: The residues modulo 10 of the powers of integers of the form (4k) m

4 2222 Djoko Suprijanto and Rusliansyah Consider the residues modulo 10 of the powers of the integers 4, 8, 12, 16, and 20 which are given in Table 2. power integer m Table 2: The residues modulo 10 of integers 4, 8, 12, 16, and 20 The periods of these residues are: 16, 20 : period 1 4 : period 2 8, 12 : period 4 which are all factors ofφ(10)=4, whereφis an Euler-φ function. These values show that the period of the unit digits of numbers (2) must be 4. Determining the unit digits for the sums in the table can simply be done by summing the first n columns of Table 2, which precisely the same with what given in Table 1. Since the entries of Table 1 will repeat for powers m greater than 4 this proves Proposition 2.1. We believe that Proposition 2.1 may be generalized to the following. Conjecture 2.1 For any positive integer m, 10 (4k) m m 0 (mod 4), for n=5r, or 5r 1, r 1. (5) Another interesting case is the residue modulo 5 which are given in Table 3. m

5 Observation on sums of powers of integers divisible by four Table 3: The residues modulo 5 of the powers of integers If we consider the columns n=4, 5, 9, and 10, we conclude that Proposition 2.2 For any positive integer m 5 (4k) m m 0 (mod 4), for n=4, 5, 9, and 10. The expression above is confirmed by the Table 4 that show the residues modulo 5 of (4k) m. m Table 4: The residues modulo 5 of the integers of the form (4k) m The table shows that for k 4 (mod 5) or k 0 (mod 5), the period is 1, for k 1(mod 5) the period is 2, while for k 2(mod 5) or k 3(mod 5), the period is 4. Again, we believe that Proposition 2.2 may be generalized to the following.

6 2224 Djoko Suprijanto and Rusliansyah Conjecture 2.2 For any positive integer m, 5 (4k) m m 0 (mod 4), for n=5r, or 5r 1, r 1. (6) The other case is the residue modulo 3, which are given in the Table 5. m Table 5: The residues modulo 3 of the powers of integers of the form (4k) m In term of divisibility, Table 5 shows that Proposition 2.3 For n=8or 9, 3 (4k) m. (7) Again, we believe that Proposition 2.3 may be generalized to the following. Conjecture 2.3 For any positive integer m, 3 (4k) m, if 0r 2, or 10r 1, r 1. (8)

7 Observation on sums of powers of integers divisible by four Cases 2: m fixed Finally, we consider the sequences from the columns in (2.1). As we mentioned above, for m=1 we obtained 4k ={2n(n+1)}, which is the sequence A in the On-line Encyclopedia of Integer Sequences [2], while for m=2, 3, and 4 we obtained, respectively the following sequences (4k) 2 (4k) 4 (4k) 3 = = { } 8 3 n(n+1)(2n+1), = { 16n 2 (n+1) 2}, { } n(n+1)(2n+1)(3n2 + 3n 1), which are new. Moreover, for m=5 and m=6 we obtained also the following sequences, respectively (4k) 5 (4k) 6 = = { } n2 (2n 2 + 2n 1)(n+1) 2, { } n(n+1)(2n+1)(3n4 + 6n 3 3n+1), which are also new. We may obtain another sequences from another values of m. We can also investigate the divisibility of the above sequences. For example, we can show easily that for any positive integer n=9a+8, we have 9 (4k) 2, while for any positive integer n = 3a or n = 3a + 2, we have 3 (4k) 3, 6 (4k) 3, and 9 (4k) 3.

8 2226 Djoko Suprijanto and Rusliansyah We have also and 6 5 (4k) 3, for n=5a or n=5a+4, (4k) 3, for n=6a, n=6a+2, n=6a+3, or n=6a+5. By a very similar observation, we may also have properties of divisibility of another sequences in an easy way. 3 Remark As we showed above, what we did in this paper is an observation on the sequences of the form (2.1) and their related properties. We reconstructed several known sequences as listed in [2] in an elementary way as well as constructed many new sequences. We are now working on rigorous proofs for the above results and conjectures. These results, which is now in preparation, will be published elsewhere in a separate paper. Acknowledgement The authors would like to thank the anonymous referee(s) for careful reading and many helpful comments. The first author was supported in part by Hibah Riset Ikatan Alumni ITB Tahun 2011 Number 2208b/I1.C01/PL/2011 and Riset dan Inovasi KK ITB Tahun 2012 Number 398/I.1.C01/PL/2012. References [1] T. Aaron Gulliver, Divisibility of sums of powers of even integers, International journal of pure and applied mathematics 64(2), (2010), [2] OEIS Foundation Inc. (2011), On-line Encyclopedia of Integer Sequences, available at Received: January 15, 2014

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