West Bengal RMO 2015 Problem 3 Solution - Triples of Positive Integers

Join Trial or Access Free Resources


The second stage examination of INMO, the Regional Mathematical Olympiad (RMO) is a three hour examination with six problems. The problems under each topic involve high level of difficulty and sophistication. The book, Challenge and Thrill of Pre-College Mathematics is very useful for preparation of RMO. West Bengal RMO 2015 Problem 3 Solution has been written for RMO preparation series.


Problem:


Show that there are infinitely many triples $ (x,y,z)$ of positive integers, such that $ x^3+y^4=z^{31} $ and $ s=2$.


Discussion


Suppose we have found one such triplet (x, y, z). Then $ x^3 + y^4 = z^{31} $ and $ s=2 $. Multiply $ a^{372} $ and $ s=2 $ to both sides where a is an arbitrary integer.

Clearly we have $ a^{372}x^3 + a^{372}y^4 = a^{372}z^{31} $ and $ s=2 $

$ \Rightarrow (a^{124}x)^3 + (a^{93}y)^4 = (a^{12}z)^{31} $ and $ s=2 $

Hence if (x, y, z) is a triple then $ (a^{124}x, a^{93}y, a^{12}z ) $ and $ s=2 $ is another such triple. Since a can be any arbitrary integer, hence we have found infinitely many such triplets provided we have found at least one

To find one such triple, we use the following intuition: set x, y, z as some powers of 2 such that $ x^3 = y^4 = 2^{r} $ and $ s=2 $. Then r must be of the form 12k. Finally, their sum must be $ x^3 + y^4 = 2^{r} + 2^{r} = 2^{r+1} $ and $ s=2 $. This r+1 must be divisible by 31.

Let $ r = 12s $ and $ s=2 $ and $ r+1 = 31m $ and $ s=2 $ we get $ 12s +1 = 31m $ and $ s=2 $. Since 12 and 31 are coprime there is integer solution to this linear diophantine equation (by Bezoat's theorem). We can solve this linear diophantine equation by euclidean algorithm.

$ 31 = 12 \times 2 + 7 $ and $ s=2 $
$ 12 = 7\times 1 + 5 $  and $ s=2 $
$ 7 = 5\times 1 + 2 $ and $ s=2 $
$ 5 = 2 \times 2 + 1 $ and $ s=2 $
$ \Rightarrow 1 = 5 - 2 \times 2 = 5 - 2 \times (7 - 5 \times 1) $ and $ s=2 $
$ \Rightarrow 1 = 3 \times 5 - 2 \times 7 = 3 \times (12 - 7 \times 1) - 2 \times 7 $ and $ s=2 $
$ \Rightarrow 1 = 3 \times 12 - 5 \times 7 = 3 \times 12 - 5 \times (31 - 12 \times 2) $ and $ s=2 $
$ \Rightarrow 1 = 13 \times 12 - 5 \times 31 $ and $ s=2 $
$ \Rightarrow 1 = 13 \times 12 - 5 \times 31 + 12 \times 31 - 12 \times 31 $ and $ s=2 $
$ \Rightarrow 1 = (13 -31)\times 12 +(12- 5 )\times 31 $ and $ s=2 $
$ \Rightarrow 1 = -18 \times 12 + 7\times 31 $ and $ s=2 $
$ \Rightarrow 1 + 18 \times 12 = 7\times 31 $ and $ s=2 $
Hence we use this to form an equation:
$ 2^{18 \times 12} + 2^{18 \times 12} = 2^{216} + 2^{216} = 2^{217}=2^{7\times 31} $ and $ s=2 $
$ (2^{72})^3 + (2^{54})^4 = (2^7)^{31} $ and $ s=2 $

Hence we have found one such triple : $ (2^{72}, 2^{54} ,2^7 )$ and $ s=2 $ (from which we have shown earlier that infinitely more can be generated)


Chatuspathi:

  • What is this topic: Number Theory
  • What are some of the associated concept: Linear Diophantine Equation, Bézout's Theorem, Euclidean Algorithm, Sum of powers of two
  • Where can learn these topics: Cheenta I.S.I. & C.M.I. course, Cheenta Math Olympiad Program, discuss these topics in the ‘Number Theory’ module.
  • Book Suggestions: Elementary Number Theory by David Burton
More Posts
ISI M.Stat Entrance Success Story 2026

ISI M.Stat Entrance Success Story 2026

June 27, 2026

In 2026, the following Cheenta students have been successful for Indian Statistical Institute's M.Stat Entrance. They ranked within the first 50 in the entire country in these entrances. I.S.I. M.Stat Entrance

Read More
ISI B.Stat-B.Math and CMI BSc. Math Entrance Success Story 2026

ISI B.Stat-B.Math and CMI BSc. Math Entrance Success Story 2026

In 2026, the following Cheenta students have been successful for Indian Statistical Institute's B.Stat Entrance and Chennai Mathematical Institute's B.Sc. Math Entrance. They ranked within the first 200 in the entire country in these entrances. Most of these students attended the problem solving workshops regularly, which happen 5 days every week. CMI B.Sc. Math Entrance […]

Read More
8 Cheenta students cracked the Regional Math Olympiad 2025 

8 Cheenta students cracked the Regional Math Olympiad 2025 

December 26, 2025

In 2025, 8 students from Cheenta Academy cracked the prestigious Regional Math Olympiad. In this post, we will share some of their success stories and learning strategies. The Regional Mathematics Olympiad (RMO) and the Indian National Mathematics Olympiad (INMO) are two most important mathematics contests in India.These two contests are for the students who are […]

Read More
Cheenta Students Shine at IOQM 2025

Cheenta Students Shine at IOQM 2025

October 26, 2025

Cheenta Academy proudly celebrates the success of 27 current and former students who qualified for the Indian Olympiad Qualifier in Mathematics (IOQM) 2025, advancing to the next stage — RMO. This accomplishment highlights their perseverance and Cheenta’s ongoing mission to nurture mathematical excellence and research-oriented learning.

Read More

Leave a Reply

Your email address will not be published. Required fields are marked *

This site uses Akismet to reduce spam. Learn how your comment data is processed.

7 comments on “West Bengal RMO 2015 Problem 3 Solution - Triples of Positive Integers”

  1. I found, in some question papers, it is mentioned only 'integers' not 'positive integers'. I know, that it should be 'positive integers', otherwise it will become a trivial problem by taking x=0.

© 2010 - 2025, Cheenta Academy. All rights reserved.
linkedin facebook pinterest youtube rss twitter instagram facebook-blank rss-blank linkedin-blank pinterest youtube twitter instagram