Sum of two cubes: Difference between revisions
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:<math>16^3 + 2^3</math>, <math>15^3 + 9^3</math> or <math>(-12)^3+18^3</math> |
:<math>16^3 + 2^3</math>, <math>15^3 + 9^3</math> or <math>(-12)^3+18^3</math> |
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== See also == |
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* [[Difference of two squares]] |
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== References == |
== References == |
Revision as of 09:52, 7 March 2023
An editor has performed a search and found that sufficient sources exist to establish the subject's notability. (January 2023) |
In mathematics, the sum of two cubes is a cubed number added to another cubed number.
Factorization
Every sum of cubes may be factored according to the identity
For the general of this factorization to higher odd powers see Binomial number#Factorization.
Proof
Starting with the expression, is multiplied by a and b
By distributing a and b to , we get
And by cancelling the alike terms, we get
Fermat's last theorem
Fermat's last theorem in the case of exponent 3 states that the sum of two non-zero integer cubes does not result in a non-zero integer cube. The first recorded proof of the exponent 3 case was given by Euler.[1]
Taxicab numbers
Taxicab numbers are numbers that can be expressed as a sum of two positive integer cubes in n distinct ways. The smallest taxicab number is 1729,[2] expressed as
- or
The smallest taxicab number expressed in 3 different ways is 87,539,319, expressed as
- , or
The smallest taxicab number expressed in 3 different ways by using both positive and negative integers is 4104,[3] expressed as
- , or
See also
References
- ^ Dickson, L. E. (1917). "Fermat's Last Theorem and the Origin and Nature of the Theory of Algebraic Numbers". Annals of Mathematics. 18 (4): 161–187. doi:10.2307/2007234. ISSN 0003-486X.
- ^ "A001235 - OEIS". oeis.org. Retrieved 2023-01-04.
- ^ Silverman, Joseph H. (1993). "Taxicabs and Sums of Two Cubes". The American Mathematical Monthly. 100 (4): 331–340. doi:10.2307/2324954. ISSN 0002-9890.
Further reading
- Broughan, Kevin A. (January 2003). "Characterizing the Sum of Two Cubes" (PDF). Journal of Integer Sequences. 6 (4): 46. Bibcode:2003JIntS...6...46B.