How to Install and Uninstall perl-Math-PlanePath Package on openSUSE Leap
Last updated: November 24,2024
1. Install "perl-Math-PlanePath" package
This guide let you learn how to install perl-Math-PlanePath on openSUSE Leap
$
sudo zypper refresh
Copied
$
sudo zypper install
perl-Math-PlanePath
Copied
2. Uninstall "perl-Math-PlanePath" package
Learn how to uninstall perl-Math-PlanePath on openSUSE Leap:
$
sudo zypper remove
perl-Math-PlanePath
Copied
3. Information about the perl-Math-PlanePath package on openSUSE Leap
Information for package perl-Math-PlanePath:
--------------------------------------------
Repository : Main Repository
Name : perl-Math-PlanePath
Version : 129-bp155.2.8
Arch : x86_64
Vendor : openSUSE
Installed Size : 3.9 MiB
Installed : No
Status : not installed
Source package : perl-Math-PlanePath-129-bp155.2.8.src
Upstream URL : https://metacpan.org/release/Math-PlanePath
Summary : Points on a path through the 2-D plane
Description :
This is a base class for some mathematical paths which map an integer
position '$n' to and from coordinates '$x,$y' in the 2D plane.
The current classes include the following. The intention is that any
'Math::PlanePath::Something' is a PlanePath, and supporting base classes or
related things are further down like 'Math::PlanePath::Base::Xyzzy'.
SquareSpiral four-sided spiral
PyramidSpiral square base pyramid
TriangleSpiral equilateral triangle spiral
TriangleSpiralSkewed equilateral skewed for compactness
DiamondSpiral four-sided spiral, looping faster
PentSpiral five-sided spiral
PentSpiralSkewed five-sided spiral, compact
HexSpiral six-sided spiral
HexSpiralSkewed six-sided spiral skewed for compactness
HeptSpiralSkewed seven-sided spiral, compact
AnvilSpiral anvil shape
OctagramSpiral eight pointed star
KnightSpiral an infinite knight's tour
CretanLabyrinth 7-circuit extended infinitely
SquareArms four-arm square spiral
DiamondArms four-arm diamond spiral
AztecDiamondRings four-sided rings
HexArms six-arm hexagonal spiral
GreekKeySpiral square spiral with Greek key motif
MPeaks "M" shape layers
SacksSpiral quadratic on an Archimedean spiral
VogelFloret seeds in a sunflower
TheodorusSpiral unit steps at right angles
ArchimedeanChords unit chords on an Archimedean spiral
MultipleRings concentric circles
PixelRings concentric rings of midpoint pixels
FilledRings concentric rings of pixels
Hypot points by distance
HypotOctant first octant points by distance
TriangularHypot points by triangular distance
PythagoreanTree X^2+Y^2=Z^2 by trees
PeanoCurve 3x3 self-similar quadrant
PeanoDiagonals across unit squares
WunderlichSerpentine transpose parts of PeanoCurve
HilbertCurve 2x2 self-similar quadrant
HilbertSides along sides of unit squares
HilbertSpiral 2x2 self-similar whole-plane
ZOrderCurve replicating Z shapes
GrayCode Gray code splits
WunderlichMeander 3x3 "R" pattern quadrant
BetaOmega 2x2 self-similar half-plane
AR2W2Curve 2x2 self-similar of four parts
KochelCurve 3x3 self-similar of two parts
DekkingCurve 5x5 self-similar, edges
DekkingCentres 5x5 self-similar, centres
CincoCurve 5x5 self-similar
ImaginaryBase replicate in four directions
ImaginaryHalf half-plane replicate three directions
CubicBase replicate in three directions
SquareReplicate 3x3 replicating squares
CornerReplicate 2x2 replicating "U"
LTiling self-similar L shapes
DigitGroups digits grouped by zeros
FibonacciWordFractal turns by Fibonacci word bits
Flowsnake self-similar hexagonal tile traversal
FlowsnakeCentres likewise but centres of hexagons
GosperReplicate self-similar hexagonal tiling
GosperIslands concentric island rings
GosperSide single side or radial
QuintetCurve self-similar "+" traversal
QuintetCentres likewise but centres of squares
QuintetReplicate self-similar "+" tiling
DragonCurve paper folding
DragonRounded paper folding rounded corners
DragonMidpoint paper folding segment midpoints
AlternatePaper alternating direction folding
AlternatePaperMidpoint alternating direction folding, midpoints
TerdragonCurve ternary dragon
TerdragonRounded ternary dragon rounded corners
TerdragonMidpoint ternary dragon segment midpoints
AlternateTerdragon alternate ternary dragon
R5DragonCurve radix-5 dragon curve
R5DragonMidpoint radix-5 dragon curve midpoints
CCurve "C" curve
ComplexPlus base i+realpart
ComplexMinus base i-realpart, including twindragon
ComplexRevolving revolving base i+1
SierpinskiCurve self-similar right-triangles
SierpinskiCurveStair self-similar right-triangles, stair-step
HIndexing self-similar right-triangles, squared up
KochCurve replicating triangular notches
KochPeaks two replicating notches
KochSnowflakes concentric notched 3-sided rings
KochSquareflakes concentric notched 4-sided rings
QuadricCurve eight segment zig-zag
QuadricIslands rings of those zig-zags
SierpinskiTriangle self-similar triangle by rows
SierpinskiArrowhead self-similar triangle connectedly
SierpinskiArrowheadCentres likewise but centres of triangles
Rows fixed-width rows
Columns fixed-height columns
Diagonals diagonals between X and Y axes
DiagonalsAlternating diagonals Y to X and back again
DiagonalsOctant diagonals between Y axis and X=Y centre
Staircase stairs down from the Y to X axes
StaircaseAlternating stairs Y to X and back again
Corner expanding stripes around a corner
CornerAlternating expanding up and down around a corner
PyramidRows expanding stacked rows pyramid
PyramidSides along the sides of a 45-degree pyramid
CellularRule cellular automaton by rule number
CellularRule54 cellular automaton rows pattern
CellularRule57 cellular automaton (rule 99 mirror too)
CellularRule190 cellular automaton (rule 246 mirror too)
UlamWarburton cellular automaton diamonds
UlamWarburtonQuarter cellular automaton quarter-plane
DiagonalRationals rationals X/Y by diagonals
FactorRationals rationals X/Y by prime factorization
GcdRationals rationals X/Y by rows with GCD integer
RationalsTree rationals X/Y by tree
FractionsTree fractions 0
ChanTree rationals X/Y multi-child tree
CfracDigits continued fraction 0
CoprimeColumns coprime X,Y
DivisibleColumns X divisible by Y
WythoffArray Fibonacci recurrences
WythoffPreliminaryTriangle
PowerArray powers in rows
File points from a disk file
And in the separate Math-PlanePath-Toothpick distribution
ToothpickTree pattern of toothpicks
ToothpickReplicate same by replication rather than tree
ToothpickUpist toothpicks only growing upwards
ToothpickSpiral toothpicks around the origin
LCornerTree L-shape corner growth
LCornerReplicate same by replication rather than tree
OneOfEight
HTree H shapes replicated
The paths are object oriented to allow parameters, though many have none.
See 'examples/numbers.pl' in the Math-PlanePath sources for a sample
printout of numbers from selected paths or all paths.
--------------------------------------------
Repository : Main Repository
Name : perl-Math-PlanePath
Version : 129-bp155.2.8
Arch : x86_64
Vendor : openSUSE
Installed Size : 3.9 MiB
Installed : No
Status : not installed
Source package : perl-Math-PlanePath-129-bp155.2.8.src
Upstream URL : https://metacpan.org/release/Math-PlanePath
Summary : Points on a path through the 2-D plane
Description :
This is a base class for some mathematical paths which map an integer
position '$n' to and from coordinates '$x,$y' in the 2D plane.
The current classes include the following. The intention is that any
'Math::PlanePath::Something' is a PlanePath, and supporting base classes or
related things are further down like 'Math::PlanePath::Base::Xyzzy'.
SquareSpiral four-sided spiral
PyramidSpiral square base pyramid
TriangleSpiral equilateral triangle spiral
TriangleSpiralSkewed equilateral skewed for compactness
DiamondSpiral four-sided spiral, looping faster
PentSpiral five-sided spiral
PentSpiralSkewed five-sided spiral, compact
HexSpiral six-sided spiral
HexSpiralSkewed six-sided spiral skewed for compactness
HeptSpiralSkewed seven-sided spiral, compact
AnvilSpiral anvil shape
OctagramSpiral eight pointed star
KnightSpiral an infinite knight's tour
CretanLabyrinth 7-circuit extended infinitely
SquareArms four-arm square spiral
DiamondArms four-arm diamond spiral
AztecDiamondRings four-sided rings
HexArms six-arm hexagonal spiral
GreekKeySpiral square spiral with Greek key motif
MPeaks "M" shape layers
SacksSpiral quadratic on an Archimedean spiral
VogelFloret seeds in a sunflower
TheodorusSpiral unit steps at right angles
ArchimedeanChords unit chords on an Archimedean spiral
MultipleRings concentric circles
PixelRings concentric rings of midpoint pixels
FilledRings concentric rings of pixels
Hypot points by distance
HypotOctant first octant points by distance
TriangularHypot points by triangular distance
PythagoreanTree X^2+Y^2=Z^2 by trees
PeanoCurve 3x3 self-similar quadrant
PeanoDiagonals across unit squares
WunderlichSerpentine transpose parts of PeanoCurve
HilbertCurve 2x2 self-similar quadrant
HilbertSides along sides of unit squares
HilbertSpiral 2x2 self-similar whole-plane
ZOrderCurve replicating Z shapes
GrayCode Gray code splits
WunderlichMeander 3x3 "R" pattern quadrant
BetaOmega 2x2 self-similar half-plane
AR2W2Curve 2x2 self-similar of four parts
KochelCurve 3x3 self-similar of two parts
DekkingCurve 5x5 self-similar, edges
DekkingCentres 5x5 self-similar, centres
CincoCurve 5x5 self-similar
ImaginaryBase replicate in four directions
ImaginaryHalf half-plane replicate three directions
CubicBase replicate in three directions
SquareReplicate 3x3 replicating squares
CornerReplicate 2x2 replicating "U"
LTiling self-similar L shapes
DigitGroups digits grouped by zeros
FibonacciWordFractal turns by Fibonacci word bits
Flowsnake self-similar hexagonal tile traversal
FlowsnakeCentres likewise but centres of hexagons
GosperReplicate self-similar hexagonal tiling
GosperIslands concentric island rings
GosperSide single side or radial
QuintetCurve self-similar "+" traversal
QuintetCentres likewise but centres of squares
QuintetReplicate self-similar "+" tiling
DragonCurve paper folding
DragonRounded paper folding rounded corners
DragonMidpoint paper folding segment midpoints
AlternatePaper alternating direction folding
AlternatePaperMidpoint alternating direction folding, midpoints
TerdragonCurve ternary dragon
TerdragonRounded ternary dragon rounded corners
TerdragonMidpoint ternary dragon segment midpoints
AlternateTerdragon alternate ternary dragon
R5DragonCurve radix-5 dragon curve
R5DragonMidpoint radix-5 dragon curve midpoints
CCurve "C" curve
ComplexPlus base i+realpart
ComplexMinus base i-realpart, including twindragon
ComplexRevolving revolving base i+1
SierpinskiCurve self-similar right-triangles
SierpinskiCurveStair self-similar right-triangles, stair-step
HIndexing self-similar right-triangles, squared up
KochCurve replicating triangular notches
KochPeaks two replicating notches
KochSnowflakes concentric notched 3-sided rings
KochSquareflakes concentric notched 4-sided rings
QuadricCurve eight segment zig-zag
QuadricIslands rings of those zig-zags
SierpinskiTriangle self-similar triangle by rows
SierpinskiArrowhead self-similar triangle connectedly
SierpinskiArrowheadCentres likewise but centres of triangles
Rows fixed-width rows
Columns fixed-height columns
Diagonals diagonals between X and Y axes
DiagonalsAlternating diagonals Y to X and back again
DiagonalsOctant diagonals between Y axis and X=Y centre
Staircase stairs down from the Y to X axes
StaircaseAlternating stairs Y to X and back again
Corner expanding stripes around a corner
CornerAlternating expanding up and down around a corner
PyramidRows expanding stacked rows pyramid
PyramidSides along the sides of a 45-degree pyramid
CellularRule cellular automaton by rule number
CellularRule54 cellular automaton rows pattern
CellularRule57 cellular automaton (rule 99 mirror too)
CellularRule190 cellular automaton (rule 246 mirror too)
UlamWarburton cellular automaton diamonds
UlamWarburtonQuarter cellular automaton quarter-plane
DiagonalRationals rationals X/Y by diagonals
FactorRationals rationals X/Y by prime factorization
GcdRationals rationals X/Y by rows with GCD integer
RationalsTree rationals X/Y by tree
FractionsTree fractions 0
CfracDigits continued fraction 0
DivisibleColumns X divisible by Y
WythoffArray Fibonacci recurrences
WythoffPreliminaryTriangle
PowerArray powers in rows
File points from a disk file
And in the separate Math-PlanePath-Toothpick distribution
ToothpickTree pattern of toothpicks
ToothpickReplicate same by replication rather than tree
ToothpickUpist toothpicks only growing upwards
ToothpickSpiral toothpicks around the origin
LCornerTree L-shape corner growth
LCornerReplicate same by replication rather than tree
OneOfEight
HTree H shapes replicated
The paths are object oriented to allow parameters, though many have none.
See 'examples/numbers.pl' in the Math-PlanePath sources for a sample
printout of numbers from selected paths or all paths.