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test_constructible.py
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test_constructible.py
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#
# Copyright 2016 Leonhard Vogt
#
# Licensed under the Apache License, Version 2.0 (the "License");
# you may not use this file except in compliance with the License.
# You may obtain a copy of the License at
#
# http://www.apache.org/licenses/LICENSE-2.0
#
# Unless required by applicable law or agreed to in writing, software
# distributed under the License is distributed on an "AS IS" BASIS,
# WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
# See the License for the specific language governing permissions and
# limitations under the License.
#
from __future__ import division
'''
Unit tests for constructible
'''
import unittest
class TestCase(unittest.TestCase):
''' TestCase subclass with dummy subTest method
for Python version before 3.4
'''
if not hasattr(unittest.TestCase, 'subTest'):
def subTest(self, **dummy):
class subTest(object):
def __enter__(self): pass
def __exit__(self, *dummy): pass
return subTest()
if not hasattr(unittest.TestCase, 'assertIsInstance'):
def assertIsInstance(self, obj, cls, msg=None):
self.assertTrue(isinstance(obj, cls), msg=msg)
class TestHelperFunctions(TestCase):
def test_isqrt(self):
''' test the isqrt function '''
from constructible import isqrt
from functools import partial
self.assertEqual(isqrt(0), (0, 1))
self.assertEqual(isqrt(1), (1, 1))
self.assertEqual(isqrt(2), (1, 2))
self.assertEqual(isqrt(4), (2, 1))
self.assertEqual(isqrt(120), (2, 30))
self.assertRaises(ValueError, partial(isqrt, -1))
self.assertRaises(ValueError, partial(isqrt, -12))
self.assertEqual(isqrt(16), (4, 1))
self.assertEqual(isqrt(3 ** 4 * 5 ** 6), (9 * 125, 1))
def test_fsqrt(self):
''' test the fsqrt function '''
from constructible import fsqrt
from functools import partial
from fractions import Fraction
self.assertEqual(fsqrt(0), (0, 1))
self.assertEqual(fsqrt(1), (1, 1))
self.assertEqual(fsqrt(2), (1, 2))
self.assertEqual(fsqrt(4), (2, 1))
self.assertEqual(fsqrt(120), (2, 30))
self.assertRaises(ValueError, partial(fsqrt, -1))
self.assertRaises(ValueError, partial(fsqrt, -12))
self.assertEqual(fsqrt(16), (4, 1))
self.assertEqual(fsqrt(3 ** 4 * 5 ** 6), (9 * 125, 1))
self.assertEqual(fsqrt(Fraction(3, 4)), (Fraction(1, 2), 3))
self.assertEqual(fsqrt(Fraction(9, 25)), (Fraction(3, 5), 1))
self.assertEqual(fsqrt(Fraction(9, 50)), (Fraction(3, 10), 2))
self.assertEqual(fsqrt(Fraction(9, 75)), (Fraction(1, 5), 3))
class TestArithmeticOperators(TestCase):
def test_rational_binop(self):
''' test binary operators on constructible
instances representing rationals '''
from constructible import Constructible
from fractions import Fraction as F
from operator import add, mul, sub, truediv
for op in (add, mul, sub, truediv):
with self.subTest(op=op):
for a, b in [(F(1, 2), F(5, 7)),
(F(-1, 2), F(12, 25)),
(F(4, 3), 7),
(17, F(7, 16))]:
result = op(Constructible(a), Constructible(b))
self.assertEqual(result.a, op(a, b))
self.assertFalse(result.b)
self.assertFalse(result.field)
def test_rational_unop(self):
''' test unary operators on constructible instances
representing rationals '''
from constructible import Constructible
from fractions import Fraction as F
from operator import pos, neg
for op in (pos, neg):
with self.subTest(op=op):
for a in [F(1, 2), F(-1, 2), F(12, 25), F(4, 3), 7, 0, -10, F(0)]:
result = op(Constructible(a))
self.assertEqual(result.a, op(a))
self.assertFalse(result.b)
self.assertFalse(result.field)
def test_mix_rational_binop(self):
''' test binary operators between constructible instances
representing rationals and Fraction instances'''
from constructible import Constructible
from fractions import Fraction as F
from operator import add, mul, sub, truediv
for op in (add, mul, sub, truediv):
with self.subTest(op=op):
for a, b in [(F(1, 2), F(5, 7)),
(F(-1, 2), F(12, 25)),
(F(4, 3), 7),
(17, F(7, 16))]:
result = op(Constructible(a), b)
self.assertEqual(result.a, op(a, b))
self.assertFalse(result.b)
self.assertFalse(result.field)
def test_mix_rational_rbinop(self):
''' test binary operators between Fraction instances and
constructible instances representing rationals'''
from constructible import Constructible
from fractions import Fraction as F
from operator import add, mul, sub, truediv
for op in (add, mul, sub, truediv):
with self.subTest(op=op):
for a, b in [(F(1, 2), F(5, 7)),
(F(-1, 2), F(12, 25)),
(F(4, 3), 7),
(17, F(7, 16))]:
result = op(a, Constructible(b))
self.assertEqual(result.a, op(a, b))
self.assertFalse(result.b)
self.assertFalse(result.field)
def test_expressions_type(self):
from constructible import sqrt, Constructible
s = sqrt(2)
self.assertIsInstance(s, Constructible)
self.assertIsInstance(2 * s, Constructible)
self.assertIsInstance(2 - s, Constructible)
t = 3 - 2 * s
self.assertIsInstance(t, Constructible)
u = s - s
self.assertIsInstance(u, Constructible)
v = -t
self.assertIsInstance(v, Constructible)
class TestStrRepr(TestCase):
def test_repr(self):
from constructible import Constructible
self.assertEqual(repr(Constructible(2)), 'Constructible(Fraction(2, 1), 0, ())')
self.assertEqual(repr(Constructible(Constructible(2), Constructible(3), (Constructible(5), ()))),
'Constructible('
'Constructible(Fraction(2, 1), 0, ()), '
'Constructible(Fraction(3, 1), 0, ()), '
'(Constructible(Fraction(5, 1), 0, ()), ())'
')')
def test_str(self):
from constructible import Constructible
self.assertEqual(str(Constructible(2)), '2')
self.assertEqual(str(Constructible(Constructible(2), Constructible(3), (Constructible(5), ()))),
'(2 + 3 * sqrt(5))')
class TestComparison(TestCase):
def test_rational_comparison(self):
''' test comparison operators on constructible
instances representing rationals '''
from constructible import Constructible
from operator import eq, ne, gt, lt, ge, le
for op in (eq, ne, gt, lt, ge, le):
with self.subTest(op=op):
for a in [0, 1, -1]:
for b in [0, 1, -1]:
result = op(Constructible(a), Constructible(b))
self.assertEqual(result, op(a, b))
self.assertIsInstance(result, bool)
def test_comparison_Qsqrt2(self):
''' test comparison operators on instances of Q[sqrt(2)] '''
from constructible import sqrt
from operator import eq, ne, gt, lt, ge, le
s = sqrt(2)
t = 3 - 2 * s
u = s - s
v = -t
self.assertTrue(s.field == t.field == u.field == v.field, "Precondition")
# numbers is sorted ascending, so the comarison of numbers and therir indices must be same
numbers = [v, u, t, s]
self.assertTrue(s.field == t.field == u.field == v.field, "Precondition")
for op in (eq, ne, gt, lt, ge, le):
with self.subTest(op=op):
for i, a in enumerate(numbers):
for j, b in enumerate(numbers):
result = op(a, b)
self.assertEqual(result, op(i, j))
self.assertIsInstance(result, bool)
class TestSqrt(TestCase):
def test_sqrt_2(self):
from constructible import sqrt
r = sqrt(2)
self.assertEqual(r.a, 0)
self.assertEqual(r.b, 1)
self.assertEqual(len(r.field), 2)
self.assertEqual(r.field[0], 2)
self.assertEqual(str(r), 'sqrt(2)')
self.assertTrue(r > 0)
def test_double_sqrt(self):
from constructible import sqrt
r = sqrt(2)
s = sqrt(r)
self.assertEqual(str(s), 'sqrt(sqrt(2))')
def test_sqrt23(self):
from constructible import sqrt
r = sqrt(2) + sqrt(3)
self.assertTrue(r > 0)
self.assertEqual(r*r*r*r - 10*r*r + 1, 0)
def test_sqrt236(self):
from constructible import sqrt
r = sqrt(2) * sqrt(3)
self.assertTrue(r > 0)
self.assertEqual(r, sqrt(6))
def test_sqrt623(self):
from constructible import sqrt
r = sqrt(6) / sqrt(3)
self.assertTrue(r > 0)
self.assertEqual(r, sqrt(2))
def test_sqrt235(self):
from constructible import sqrt
r = sqrt(2) + sqrt(3) + sqrt(5)
r2 = r*r
r4 = r2*r2
r6 = r2*r4
r8 = r2*r6
self.assertTrue(r > 0)
self.assertEqual(r8 - 40*r6 + 352*r4 - 960*r2 + 576, 0)
def test_sqrt_square(self):
from constructible import sqrt
r = sqrt(2) + sqrt(3) + sqrt(5)
self.assertEqual(sqrt(r*r), r)
class TestTrySqrt(TestCase):
def test_sqrt2(self):
from constructible import sqrt
r = sqrt(2)
two = r*r
self.assertEqual(two, 2)
s = two._try_sqrt()
self.assertEqual(r, s)
class TestHeptadekagon(TestCase):
def test_roots(self):
from constructible import sqrt
r = sqrt(17)
u = sqrt(2 * (17 - r))
v = sqrt(2 * (17 + r))
cos = (-1 + r + u + 2*sqrt(17 + 3*r - u - 2*v)) / 16
sin = sqrt(1 - cos*cos)
s_i = 0
c_i = 1
for i in range(17):
s = sin * c_i + cos * s_i
c = cos * c_i - sin * s_i
self.assertEqual(s*s + c*c, 1, "radius not equal to 1 at i=%d" % i)
s_i = s
c_i = c
self.assertEqual(s_i, 0)
self.assertEqual(c_i, 1)
class TestHash(TestCase):
'''
Main requirement of the hash is that objects comparing equal
must have the same hash.
'''
def test_rational(self):
'''
hash of rationals represented as Constructible must be equal to the
hash of the original value.
'''
from constructible import Constructible
from fractions import Fraction as F
for x in [0,1,-1,F(0,1),F(1,2),F(-1,1)]:
with self.subTest(x=x):
y = Constructible(x)
# compare y == x instead of x == y because in Python 2.6 Fraction.__eq__ is broken
self.assertEqual(y, x, 'precondition for this test: %s==%s' % (y, x))
self.assertEqual(hash(x), hash(y), 'hash(%s)' % (x,))
def test_equal(self):
'''
hash of multiple representations of the same value must be equal
'''
from constructible import sqrt
from fractions import Fraction as F
for a,b in [(sqrt(2), 2/sqrt(2)),
(sqrt(2), 1/sqrt(F(1,2))),
(sqrt(2) + sqrt(3), sqrt(3) + sqrt(2))]:
with self.subTest(a=a, b=b):
self.assertEqual(a,b, 'precondition for this test')
self.assertEqual(hash(a), hash(b), '%s == %s, but hash is different' % (a,b))
if __name__ == "__main__":
# import sys;sys.argv = ['', 'Test.testName']
unittest.main()