balancing with balancing powers - Miskolc Mathematical Notes

Miskolc Mathematical Notes Vol. 14 (2013), No. 3, pp. 951–957

HU e-ISSN 1787-2413

BALANCING WITH BALANCING POWERS NURETTIN IRMAK Received 21 March, 2013 l l Abstract. In this paper, the Diophantine equation B1k C B2k C


C Bnk 1 D BnC1 C BnC2 C l


C BnCr for the positive integer unknowns n  2; k; l and r is studied in certain cases, where Bn denotes the nt h term of the balancing sequence.

2010 Mathematics Subject Classification: 11B39 Keywords: balancing numbers, powers

1. I NTRODUCTION The first definition of balancing numbers is essentially due to Finkelstein [5], though he named them numerical centers. A positive integer n  2 is called balancing number if 1 C 2 C


C .n

1/ D .n C 1/ C .n C 2/ C


C .n C r/

(1.1)

holds for some positive integer r which is called balancer corresponding to the balancing number n: The mt h term of the sequence of balancing numbers is denoted by Bm : It is known that the balancing numbers satisfy the recurrence Bn D 6Bn

1

Bn

(1.2)

2

where initial contidions are defined by B0 D 0 and B1 D 1: The first few terms of the balancing sequence are 0; 1; 6; 35; 204; 1189; 6930; 40391; : : : : The Binet formula of the balancing numbers is given by  p n  p n n n 3 C 2 2 3 2 2 ˛ ˇ D ; Bn D p ˛ ˇ 4 2 where ˛ and ˇ are the roots of the chaeacteristic polynomial x 2 recursive sequence (1.2). Behera et al. [4] showed that the diophantine equation F1k C F2k C


C Fnk

1

l l l D FnC1 C FnC2 C


C FnCr

6x C 1 of the

(1.3)

c 2013 Miskolc University Press

952

NURETTIN IRMAK

has no solution in the positive integers n; r; k; l with n  2 in the case k  l and .k; l/ D .2; 1/ ; .3; 1/ ; .3; 2/ :

(1.4)

nt h

Here Fn denotes the Fibonacci number. They also conjectured in [4] that only the quadruple .n; r; k; l/ D .4; 3; 8; 2/ satisfies (1.3). Their conjecture was proved by Alvarado et al. [2]. In this paper, we focus on the diophantine equation B1k C B2k C


C Bnk

l l l D BnC1 C BnC2 C


C BnCr :

1

(1.5)

In the specific cases (1.4) we found no solutions. Based on Theorems 6-9 and an extended computer search, we conjectured the following. Conjecture 1. There is no quadruple .n; r; k; l/ of positive integers .n  2/ which satisfies (1.5). 2. L EMMAS The proofs of the theorems use several statements collected in this section. Lemma 1. For any positive integer m (a): BmC1 Bm 1 D .Bm C 1/ .Bm 1/ ; 2 2 (b): B2m 1 D Bm Bm 1; 2; (c): B1 C B3 C


C B2m 1 D Bm 2 2 2 (d): B1 C B2 C


C Bm 1 < BmC1 C BmC2 C


C B2m 3 for m  5; 2 2 2 3 (e): B2mC5 C B2mC6 C


C B3mC4 < B13 C B23 C


C B2mC3 for m  2; (f): 4Bm < BmC1 Bm < 5Bm hold. Proof. The first three identities appear in [3] and [6]. The fourth property (d) can be justified by induction on m: Clearly, B12 C B22 C B32 C B42 < B6 C B7 : Now suppose that, 2 B12 C B22 C


C Bm

1

< BmC1 C BmC2 C


C B2m

3:

2 1 C Bm

< BmC1 C BmC2 C


C B2m

2 3 C Bm

Evaluating 2 B12 C B22 C


C Bm 2 0 and b  0 are real numbers and u0 is a positive  real number. Then a˛ u C b  ˛ uC holds for any u  u0 where  D log˛ a C ˛bu0 : Proof. For the proof, see Lemma 2.4 in [4].



954

NURETTIN IRMAK

3. THE RESULTS Here we present four theorems and their proofs which confirm Conjecture 1. l l C C BnC2 Theorem 1. The diophantine equation B1k C B2k C


C Bnk 1 D BnC1 l


C BnCr has no solution for any positive integers r and n  2 if k  l:

Proof. Applying Lemma 2(a) for k  l; we get B1k

C B2k

C


C Bnk 1

 .B1 C B2 C


C Bn 

Bn

Bn  4 which completes the proof of Theorem 1.

1

1

l

1/

k

 D

Bn

Bn 4

1

1

k

< Bnl ; 

Theorem 2. The diophantine equation B12 C B22 C


C Bn2


C BnCr has no solution in positive integers r and n  2:

1

D BnC1 C BnC2 C

Proof. By the virtue of Lemma 2(a) and (b), the equation B12 C B22 C


C Bn2

1

D BnC1 C BnC2 C


C BnCr

(3.1)

is equvalent to B2n

1 C 8 .BnC1

Bn /

.2n

1/ D 8 .BnCrC1

BnCr / :

For brevity, we use the following labels: LS WD B2n

1 C 8 .BnC1

RS WD 8 .BnCrC1

Bn /

.2n

1/

BnCr / :

Using Lemma 1(f), B2n

1

< LS < B2n

1 C 40Bn

hold. The by Lemma 3, ˛ 2n

1:99

< LS < ˛ 2n

1:98

C 40˛ n

0:98

 ˛ 2n

1:98

C ˛ nC1:12 :

According to the Lemma 4, if a D b D 1 we obtain  < 0:02: Thus
˛ 2n 1:99 < LS < ˛ nC1:12 ˛ n 3:1 C 1 < ˛ nC1:12 ˛ n 3:1 ˛ 0:02 : Consequently, ˛ 2n 1:99 < LS < ˛ 2n On the other hand, Lemma 1(f) implies

1:96

:

(3.2)

32BnCr < RS < 40BnCr ; and then ˛ nCr

0:99 1:95

˛

D ˛ nCrC0:96 < RS < ˛ nCrC1:12 D ˛ nCr

0:98 2:1

˛

(3.3)

BALANCING POWERS

955

follow. Thus, from (3.2) and (3.3) we get 1:99; n C r C 0:96g < min f2n

max f2n

1:96; n C r C 1:12g

which yields the inequalities 1:99 < n C r C 1:12

2n and

n C r C 0:96 < 2n Hence, the positive integer n and r satisfy n that is r D n

1:96:

3:11 < r < n

3: If we plug r D n

2:92;

3 in (3.1), we obtain

B12 C B22 C


C Bn2 1

D BnC1 C BnC2 C


C B2n

(3.4)

3



which contradicts to Lemma 1(d). B13 C B23 C


C Bn3 1

D BnC1 C BnC2 C Theorem 3. The diophantine equation


C BnCr has no solution for any positive integers r and n  2: Proof. Obviously, n D 2 the case provides no solution. Therefore we may assume n  3; By Lemma 2(a) and (c), the equation in the theorem is equivalent to B3n B3.n

1/ C 1568BnC1

1715Bn C 147Bn

1 C 112 D 1568 .BnCrC1

BnCr / : (3.5)

Using the labels again, put LS WD B3n

B3.n

1/ C 1568BnC1

RS WD 1568 .BnCrC1

1715Bn C 147Bn

1 C 112;

BnCr / :

By Lemma 3, it is obvious that 196B3.n

1/

< LS < 197B3.n

1/ :

< LS < ˛ 3n

D ˛ 3n

Further we have ˛ 3n

3:99 2:98

˛

D ˛ 3n

1:01

0:98

3:98 3:00

˛

(3.6)

On the other hand, applying Lemma 1(f), ˛ nCrC3:96 D 1568
4
BnCr < RS < 1568
5BnCr D ˛ nCrC4:11

(3.7)

hold. From (3.6) and (3.7) we get max f3n

1:01; n C r C 3:96g < min f3n

0:98; n C r C 4:11g ;

and we deduce 2n 5:12 < r < 2n 4:94: Since n and r are integers in this inequality, only r D 2n n  3). But it contradicts to B3n

B3.n

1/ C 1568BnC1

1715Bn C 147Bn

1 C 112

5 is possible (recall that < 1568 .B3n

4

B3n

5/ :

956

NURETTIN IRMAK



Therefore, there is no solution which satisfies (3.5).

2 2 C C BnC2 Theorem 4. The diophantine equation B13 C B23 C


C Bn3 1 D BnC1 2


C BnCr has no solution for any positive integers r and n  2:

Proof. For 2  n  4; th statement is obvious. Assume now n  5: The application of Lemma 2(b)and (c) converts the equation B13 C B23 C


C Bn3

1

2 2 2 D BnC1 C BnC2 C


C BnCr

(3.8)

to 147 .Bn 32
196 which is equivalent to B3n

B3n

B3.n

B3.n

Bn

1/

147 .Bn

1/

Bn

1 / C 112

D

1 B2.nCr/C1 32

1 / C 196B2nC1 C 112

B2nC1


2r ;

D 196 B2.nCr/C1


2r :

Put LS WD B3n

B3.n

1/

RS WD 196 B2.nCr/C1

147 .Bn
2r :

Bn

1 / C 196B2nC1 C 112;

Now use Lemma 3 and Lemma 1(f) to obtain ˛ 2nC2rC3 < RS < ˛ 2nC2rC3:02 :

(3.9)

Similarly,

˛

196B3.n 1/ 3n 3 0:99 2:98 ˛

< LS < .197 C 196/ B3.n D˛

3n 1:01

< LS < ˛

1/ ; 3n 0:59

D ˛ 3n

3 0:98 3:39

˛

(3.10)

hold. From (3.9) and (3.10) max f2n C 2r C 3; 3n

1:01g < min f2n C 2r C 3:02; 3n

0:59g

follows, which yields n Clearly, only 2r D n

4:03 < 2r < n

3:59:

4 is possible. Inserting n D 2r C 4 to (3.8), we obtain

3 2 2 2 D B2rC5 C B2rC6 C


C B3rC4 ; B13 C B23 C


C B2rC3

and we arrived at a contradiction with Lemma 1(e). ACKNOWLEDGEMENT The authors would like to thank L´aszl´o Szalay for his helpful suggestions.



BALANCING POWERS

957

R EFERENCES [1] M. Alp, N. Irmak, and L. Szalay, “Balancing diophantine triples,” Acta Univ. Sapientiae, Math., vol. 4, no. 1, pp. 11–19, 2012. [2] S. D. Alvarado, A. Dujella, and F. Luca, “On a conjecture regarding balancing with powers of Fibonacci numbers,” Integers, vol. 12, no. 6, pp. 1127–1158, a2, 2012. [3] A. Behera and G. K. Panda, “On the square roots of triangular numbers,” Fibonacci Q., vol. 37, no. 2, pp. 98–105, 1999. [4] A. Behera, K. Liptai, G. K. Panda, and L. Szalay, “Balancing with Fibonacci powers,” Fibonacci Q., vol. 49, no. 1, pp. 28–33, 2011. [5] R. Finkelstein, “The house problem,” Am. Math. Mon., vol. 72, pp. 1082–1088, 1965. [6] G. K. Panda, “Some fascinating properties of balancing numbers,” Congr. Numerantium, vol. 194, pp. 185–189, 2009.

Author’s address Nurettin Irmak Ni˘gde University, Art and Science Faculty, Mathematics Department, 51110 Ni˘gde, TURKEY E-mail address: [email protected]