Difference between revisions of "Diophantine equation"
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has [[infinite]]ly many solutions, two of which are <math>(1,2)</math> and <math>(4,-2)</math>. | has [[infinite]]ly many solutions, two of which are <math>(1,2)</math> and <math>(4,-2)</math>. | ||
− | Finding the solution or solutions to a | + | Finding the solution or solutions to a Diophantine equation is closely tied to [[modular arithmetic]] and [[number theory]]. Often, when a Diophantine equation has infinitely many solutions, [[parametric form]] is used to express the relation between the variables of the equation. |
==See also== | ==See also== |
Revision as of 13:08, 23 June 2006
A Diophantine equation is an equation which must be solved using only integers. For instance, the Diophantine equation
![$4a+3b=10$](http://latex.artofproblemsolving.com/a/4/9/a49699a226c97b45de2e59e9e230e9eaa5e0165b.png)
has infinitely many solutions, two of which are and
.
Finding the solution or solutions to a Diophantine equation is closely tied to modular arithmetic and number theory. Often, when a Diophantine equation has infinitely many solutions, parametric form is used to express the relation between the variables of the equation.
See also
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