Difference between revisions of "Lattice point"
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− | A '''lattice point''' is a [[point]] in a [[Cartesian coordinate system]] such that both its <math>x</math>- | + | {{stub}} |
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+ | A '''lattice point''' is a [[point]] in a [[Cartesian coordinate system]] such that both its <math>x</math>- and <math>y</math>-coordinates are [[integer]]s. A lattice point is a point at the [[intersection]] of two or more grid lines in a regularly spaced array of points, which is a ''' point lattice'''. In a [[plane]], point lattices can be constructed having unit cells in the shape of a [[square]], [[rectangle]], [[hexagon]], and other shapes. If not specified, a point lattice is usually a point in a square array. Lattice points are complicated, so don't get stressed if you don't get it right away! Here's an example to help you to understand it better: | ||
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+ | ==Example== | ||
+ | A point lattice is constructed by plotting all of the points <math>(a,b)</math> such that <math>a</math> and <math>b</math> are positive integers. How many points in the point lattice lie on the line <math>y = -3x + 8</math>? | ||
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+ | ==Solution== | ||
+ | Notice that <math>y > 0 \implies -3x + 8 > 0 \implies x \leq 2</math>. So, <math>(1,5)</math> and <math>(2,2)</math> are the only such points, giving us <math>\boxed{2}</math> points. | ||
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+ | ~advanture | ||
==See Also== | ==See Also== | ||
+ | * [[Pick's Theorem]] | ||
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[[Category:Geometry]] | [[Category:Geometry]] | ||
+ | [[Category:Definition]] |
Latest revision as of 10:45, 2 August 2024
This article is a stub. Help us out by expanding it.
A lattice point is a point in a Cartesian coordinate system such that both its - and -coordinates are integers. A lattice point is a point at the intersection of two or more grid lines in a regularly spaced array of points, which is a point lattice. In a plane, point lattices can be constructed having unit cells in the shape of a square, rectangle, hexagon, and other shapes. If not specified, a point lattice is usually a point in a square array. Lattice points are complicated, so don't get stressed if you don't get it right away! Here's an example to help you to understand it better:
Example
A point lattice is constructed by plotting all of the points such that and are positive integers. How many points in the point lattice lie on the line ?
Solution
Notice that . So, and are the only such points, giving us points.
~advanture