Category:Diophantine Equations
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This category contains results about Diophantine Equations.
Definitions specific to this category can be found in Definitions/Diophantine Equations.
A Diophantine equation is an indeterminate polynomial equation that allows the variables to take integer values only.
Subcategories
This category has the following 9 subcategories, out of 9 total.
A
- Approximate Fermat Equations (1 P)
- Archimedes' Cattle Problem (2 P)
D
- Diophantine m-Tuples (2 P)
L
P
- Pell's Equation (11 P)
R
- Ramanujan-Nagell Equation (2 P)
S
Pages in category "Diophantine Equations"
The following 13 pages are in this category, out of 13 total.
A
S
- Smallest Solution to Equation p^p times q^q = r^r
- Solution of Ljunggren Equation
- Solutions of Diophantine Equation x^4 + y^4 = z^2 + 1 for x = 239
- Solutions of Pythagorean Equation
- Solutions to Diophantine Equation 16x^2+32x+20 = y^2+y
- Solutions to Diophantine Equation x (x + 1) = y (y + 5) (y + 10) (y + 15)
- Solutions to Diophantine Equation x (x + 1) = y (y + 5) (y + 10) (y + 15)/Historical Note
- Solutions to x^3 + y^3 + z^3 = 6xyz