X-Git-Url: http://gitweb.michael.orlitzky.com/?a=blobdiff_plain;f=src%2FTests%2FCube.hs;h=5485046ec46b934cc423bb9dedb0054eab9d289b;hb=01925d099b231a128f6bd51abd61bf9ff9c424b6;hp=b78888434d7cfc03a2956c2e30b8b06509dc853d;hpb=190b6c22ab150e1877b0b94a33253832eb7764d2;p=spline3.git diff --git a/src/Tests/Cube.hs b/src/Tests/Cube.hs index b788884..5485046 100644 --- a/src/Tests/Cube.hs +++ b/src/Tests/Cube.hs @@ -5,8 +5,8 @@ import Test.QuickCheck import Comparisons import Cube -import FunctionValues (FunctionValues(FunctionValues)) -import Tests.FunctionValues +import FunctionValues (FunctionValues) +import Tests.FunctionValues () import Tetrahedron (v0, volume) instance Arbitrary Cube where @@ -38,11 +38,73 @@ prop_all_volumes_positive c = -- | In fact, since all of the tetrahedra are identical, we should -- already know their volumes. There's 24 tetrahedra to a cube, so -- we'd expect the volume of each one to be (1/24)*h^3. -prop_all_volumes_exact :: Cube -> Bool -prop_all_volumes_exact c = - volume t ~= (1/24)*(delta^(3::Int)) +prop_tetrahedron0_volumes_exact :: Cube -> Bool +prop_tetrahedron0_volumes_exact c = + volume (tetrahedron0 c) ~= (1/24)*(delta^(3::Int)) + where + delta = h c + +-- | In fact, since all of the tetrahedra are identical, we should +-- already know their volumes. There's 24 tetrahedra to a cube, so +-- we'd expect the volume of each one to be (1/24)*h^3. +prop_tetrahedron1_volumes_exact :: Cube -> Bool +prop_tetrahedron1_volumes_exact c = + volume (tetrahedron1 c) ~= (1/24)*(delta^(3::Int)) + where + delta = h c + +-- | In fact, since all of the tetrahedra are identical, we should +-- already know their volumes. There's 24 tetrahedra to a cube, so +-- we'd expect the volume of each one to be (1/24)*h^3. +prop_tetrahedron2_volumes_exact :: Cube -> Bool +prop_tetrahedron2_volumes_exact c = + volume (tetrahedron2 c) ~= (1/24)*(delta^(3::Int)) + where + delta = h c + +-- | In fact, since all of the tetrahedra are identical, we should +-- already know their volumes. There's 24 tetrahedra to a cube, so +-- we'd expect the volume of each one to be (1/24)*h^3. +prop_tetrahedron3_volumes_exact :: Cube -> Bool +prop_tetrahedron3_volumes_exact c = + volume (tetrahedron3 c) ~= (1/24)*(delta^(3::Int)) + where + delta = h c + +-- | In fact, since all of the tetrahedra are identical, we should +-- already know their volumes. There's 24 tetrahedra to a cube, so +-- we'd expect the volume of each one to be (1/24)*h^3. +prop_tetrahedron4_volumes_exact :: Cube -> Bool +prop_tetrahedron4_volumes_exact c = + volume (tetrahedron4 c) ~= (1/24)*(delta^(3::Int)) + where + delta = h c + +-- | In fact, since all of the tetrahedra are identical, we should +-- already know their volumes. There's 24 tetrahedra to a cube, so +-- we'd expect the volume of each one to be (1/24)*h^3. +prop_tetrahedron5_volumes_exact :: Cube -> Bool +prop_tetrahedron5_volumes_exact c = + volume (tetrahedron5 c) ~= (1/24)*(delta^(3::Int)) + where + delta = h c + +-- | In fact, since all of the tetrahedra are identical, we should +-- already know their volumes. There's 24 tetrahedra to a cube, so +-- we'd expect the volume of each one to be (1/24)*h^3. +prop_tetrahedron6_volumes_exact :: Cube -> Bool +prop_tetrahedron6_volumes_exact c = + volume (tetrahedron6 c) ~= (1/24)*(delta^(3::Int)) + where + delta = h c + +-- | In fact, since all of the tetrahedra are identical, we should +-- already know their volumes. There's 24 tetrahedra to a cube, so +-- we'd expect the volume of each one to be (1/24)*h^3. +prop_tetrahedron7_volumes_exact :: Cube -> Bool +prop_tetrahedron7_volumes_exact c = + volume (tetrahedron7 c) ~= (1/24)*(delta^(3::Int)) where - t = head $ tetrahedrons c delta = h c -- | All tetrahedron should have their v0 located at the center of the cube. @@ -100,3 +162,99 @@ prop_tetrahedron6_volumes_positive c = prop_tetrahedron7_volumes_positive :: Cube -> Bool prop_tetrahedron7_volumes_positive c = volume (tetrahedron7 c) > 0 + +-- | This pretty much repeats the prop_all_volumes_positive property, +-- but will let me know which tetrahedrons's vertices are disoriented. +prop_tetrahedron8_volumes_positive :: Cube -> Bool +prop_tetrahedron8_volumes_positive c = + volume (tetrahedron8 c) > 0 + +-- | This pretty much repeats the prop_all_volumes_positive property, +-- but will let me know which tetrahedrons's vertices are disoriented. +prop_tetrahedron9_volumes_positive :: Cube -> Bool +prop_tetrahedron9_volumes_positive c = + volume (tetrahedron9 c) > 0 + +-- | This pretty much repeats the prop_all_volumes_positive property, +-- but will let me know which tetrahedrons's vertices are disoriented. +prop_tetrahedron10_volumes_positive :: Cube -> Bool +prop_tetrahedron10_volumes_positive c = + volume (tetrahedron10 c) > 0 + +-- | This pretty much repeats the prop_all_volumes_positive property, +-- but will let me know which tetrahedrons's vertices are disoriented. +prop_tetrahedron11_volumes_positive :: Cube -> Bool +prop_tetrahedron11_volumes_positive c = + volume (tetrahedron11 c) > 0 + +-- | This pretty much repeats the prop_all_volumes_positive property, +-- but will let me know which tetrahedrons's vertices are disoriented. +prop_tetrahedron12_volumes_positive :: Cube -> Bool +prop_tetrahedron12_volumes_positive c = + volume (tetrahedron12 c) > 0 + +-- | This pretty much repeats the prop_all_volumes_positive property, +-- but will let me know which tetrahedrons's vertices are disoriented. +prop_tetrahedron13_volumes_positive :: Cube -> Bool +prop_tetrahedron13_volumes_positive c = + volume (tetrahedron13 c) > 0 + +-- | This pretty much repeats the prop_all_volumes_positive property, +-- but will let me know which tetrahedrons's vertices are disoriented. +prop_tetrahedron14_volumes_positive :: Cube -> Bool +prop_tetrahedron14_volumes_positive c = + volume (tetrahedron14 c) > 0 + +-- | This pretty much repeats the prop_all_volumes_positive property, +-- but will let me know which tetrahedrons's vertices are disoriented. +prop_tetrahedron15_volumes_positive :: Cube -> Bool +prop_tetrahedron15_volumes_positive c = + volume (tetrahedron15 c) > 0 + +-- | This pretty much repeats the prop_all_volumes_positive property, +-- but will let me know which tetrahedrons's vertices are disoriented. +prop_tetrahedron16_volumes_positive :: Cube -> Bool +prop_tetrahedron16_volumes_positive c = + volume (tetrahedron16 c) > 0 + +-- | This pretty much repeats the prop_all_volumes_positive property, +-- but will let me know which tetrahedrons's vertices are disoriented. +prop_tetrahedron17_volumes_positive :: Cube -> Bool +prop_tetrahedron17_volumes_positive c = + volume (tetrahedron17 c) > 0 + +-- | This pretty much repeats the prop_all_volumes_positive property, +-- but will let me know which tetrahedrons's vertices are disoriented. +prop_tetrahedron18_volumes_positive :: Cube -> Bool +prop_tetrahedron18_volumes_positive c = + volume (tetrahedron18 c) > 0 + +-- | This pretty much repeats the prop_all_volumes_positive property, +-- but will let me know which tetrahedrons's vertices are disoriented. +prop_tetrahedron19_volumes_positive :: Cube -> Bool +prop_tetrahedron19_volumes_positive c = + volume (tetrahedron19 c) > 0 + +-- | This pretty much repeats the prop_all_volumes_positive property, +-- but will let me know which tetrahedrons's vertices are disoriented. +prop_tetrahedron20_volumes_positive :: Cube -> Bool +prop_tetrahedron20_volumes_positive c = + volume (tetrahedron20 c) > 0 + +-- | This pretty much repeats the prop_all_volumes_positive property, +-- but will let me know which tetrahedrons's vertices are disoriented. +prop_tetrahedron21_volumes_positive :: Cube -> Bool +prop_tetrahedron21_volumes_positive c = + volume (tetrahedron21 c) > 0 + +-- | This pretty much repeats the prop_all_volumes_positive property, +-- but will let me know which tetrahedrons's vertices are disoriented. +prop_tetrahedron22_volumes_positive :: Cube -> Bool +prop_tetrahedron22_volumes_positive c = + volume (tetrahedron22 c) > 0 + +-- | This pretty much repeats the prop_all_volumes_positive property, +-- but will let me know which tetrahedrons's vertices are disoriented. +prop_tetrahedron23_volumes_positive :: Cube -> Bool +prop_tetrahedron23_volumes_positive c = + volume (tetrahedron23 c) > 0