All about flooble | fun stuff | Get a free chatterbox | Free JavaScript | Avatars    
perplexus dot info

Home > Numbers
Cubic AND Quartic Challenge (Posted on 2004-02-06) Difficulty: 4 of 5
What is the smallest positive integer that is the sum of two different pairs of (non-zero, positive) cubes?
_____________________________

What is the smallest positive integer that is the sum of two different pairs of integers raised to the 4th power? and how did you find it?

In other words what is the smallest x such that:
x = a^4 + b^4 = c^4 + d^4
(where x, a, b, c, and d are all different, non-zero, positive integers)?
_____________________________

Are you able to determine the answer without looking it up on the internet?

  Submitted by SilverKnight    
Rating: 3.0000 (3 votes)
Solution: (Hide)
1729 = 1³ + 12³ = 9³ + 10³
_________________________

635,318,657 = 59^4 + 158^4 = 133^4 + 134^4
_____________________________________________________

Charlie posted a comment containing program that determines these and the next few solutions.

Comments: ( You must be logged in to post comments.)
  Subject Author Date
Some ThoughtsPuzzle ThoughtsK Sengupta2022-12-12 03:41:21
re(4): A way to do it.===> NO WAY, not quiteFrank Riddle2004-02-25 23:42:14
Some Thoughtsre(3): A way to do it.===> NO WAY, not quiteAdy TZIDON2004-02-25 04:20:09
re(2): A way to do it.===> NO WAYFrank Riddle2004-02-24 21:33:04
re(2): Hardy's StoryRichard2004-02-09 12:58:27
re: Hardy's StoryPenny2004-02-09 01:27:22
re: A way to do it.===> NO WAYAdy TZIDON2004-02-07 04:05:04
Hardy's StoryRichard2004-02-06 16:17:23
A way to do it.Gamer2004-02-06 15:06:51
re: QuestionSilverKnight2004-02-06 13:50:01
QuestionQuestionPenny2004-02-06 13:40:27
Hints/Tipsre(2): LOLe.g.2004-02-06 11:56:39
re: LOLSilverKnight2004-02-06 10:42:59
LOLnikki2004-02-06 10:05:48
SolutionsolutionCharlie2004-02-06 09:30:25
SolutionOld probleme.g.2004-02-06 08:51:39
Please log in:
Login:
Password:
Remember me:
Sign up! | Forgot password


Search:
Search body:
Forums (0)
Newest Problems
Random Problem
FAQ | About This Site
Site Statistics
New Comments (3)
Unsolved Problems
Top Rated Problems
This month's top
Most Commented On

Chatterbox:
Copyright © 2002 - 2024 by Animus Pactum Consulting. All rights reserved. Privacy Information