Lib/test/test_random.py - platform/external/python/cpython3 - Gitiles

 #!/usr/bin/env python

 import unittest
 import random
 import time
 import pickle
 import warnings
 from math import log, exp, sqrt, pi, sum as msum
 from test import support

 class TestBasicOps(unittest.TestCase):
     # Superclass with tests common to all generators.
     # Subclasses must arrange for self.gen to retrieve the Random instance
     # to be tested.

     def randomlist(self, n):
         """Helper function to make a list of random numbers"""
         return [self.gen.random() for i in range(n)]

     def test_autoseed(self):
         self.gen.seed()
         state1 = self.gen.getstate()
         time.sleep(0.1)
         self.gen.seed()      # diffent seeds at different times
         state2 = self.gen.getstate()
         self.assertNotEqual(state1, state2)

     def test_saverestore(self):
         N = 1000
         self.gen.seed()
         state = self.gen.getstate()
         randseq = self.randomlist(N)
         self.gen.setstate(state)    # should regenerate the same sequence
         self.assertEqual(randseq, self.randomlist(N))

     def test_seedargs(self):
         for arg in [None, 0, 0, 1, 1, -1, -1, 10**20, -(10**20),
                     3.14, 1+2j, 'a', tuple('abc')]:
             self.gen.seed(arg)
         for arg in [list(range(3)), dict(one=1)]:
             self.assertRaises(TypeError, self.gen.seed, arg)
         self.assertRaises(TypeError, self.gen.seed, 1, 2)
         self.assertRaises(TypeError, type(self.gen), [])

     def test_sample(self):
         # For the entire allowable range of 0 <= k <= N, validate that
         # the sample is of the correct length and contains only unique items
         N = 100
         population = range(N)
         for k in range(N+1):
             s = self.gen.sample(population, k)
             self.assertEqual(len(s), k)
             uniq = set(s)
             self.assertEqual(len(uniq), k)
             self.failUnless(uniq <= set(population))
         self.assertEqual(self.gen.sample([], 0), [])  # test edge case N==k==0

     def test_sample_distribution(self):
         # For the entire allowable range of 0 <= k <= N, validate that
         # sample generates all possible permutations
         n = 5
         pop = range(n)
         trials = 10000  # large num prevents false negatives without slowing normal case
         def factorial(n):
             if n == 0:
                 return 1
             return n * factorial(n - 1)
         for k in range(n):
             expected = factorial(n) // factorial(n-k)
             perms = {}
             for i in range(trials):
                 perms[tuple(self.gen.sample(pop, k))] = None
                 if len(perms) == expected:
                     break
             else:
                 self.fail()

     def test_sample_inputs(self):
         # SF bug #801342 -- population can be any iterable defining __len__()
         self.gen.sample(set(range(20)), 2)
         self.gen.sample(range(20), 2)
         self.gen.sample(range(20), 2)
         self.gen.sample(str('abcdefghijklmnopqrst'), 2)
         self.gen.sample(tuple('abcdefghijklmnopqrst'), 2)

     def test_sample_on_dicts(self):
         self.assertRaises(TypeError, self.gen.sample, dict.fromkeys('abcdef'), 2)

     def test_gauss(self):
         # Ensure that the seed() method initializes all the hidden state.  In
         # particular, through 2.2.1 it failed to reset a piece of state used
         # by (and only by) the .gauss() method.

         for seed in 1, 12, 123, 1234, 12345, 123456, 654321:
             self.gen.seed(seed)
             x1 = self.gen.random()
             y1 = self.gen.gauss(0, 1)

             self.gen.seed(seed)
             x2 = self.gen.random()
             y2 = self.gen.gauss(0, 1)

             self.assertEqual(x1, x2)
             self.assertEqual(y1, y2)

     def test_pickling(self):
         state = pickle.dumps(self.gen)
         origseq = [self.gen.random() for i in range(10)]
         newgen = pickle.loads(state)
         restoredseq = [newgen.random() for i in range(10)]
         self.assertEqual(origseq, restoredseq)

     def test_bug_1727780(self):
         # verify that version-2-pickles can be loaded
         # fine, whether they are created on 32-bit or 64-bit
         # platforms, and that version-3-pickles load fine.
         files = [("randv2_32.pck", 780),
                  ("randv2_64.pck", 866),
                  ("randv3.pck", 343)]
         for file, value in files:
             f = open(support.findfile(file),"rb")
             r = pickle.load(f)
             f.close()
             self.assertEqual(r.randrange(1000), value)

 class SystemRandom_TestBasicOps(TestBasicOps):
     gen = random.SystemRandom()

     def test_autoseed(self):
         # Doesn't need to do anything except not fail
         self.gen.seed()

     def test_saverestore(self):
         self.assertRaises(NotImplementedError, self.gen.getstate)
         self.assertRaises(NotImplementedError, self.gen.setstate, None)

     def test_seedargs(self):
         # Doesn't need to do anything except not fail
         self.gen.seed(100)

     def test_gauss(self):
         self.gen.gauss_next = None
         self.gen.seed(100)
         self.assertEqual(self.gen.gauss_next, None)

     def test_pickling(self):
         self.assertRaises(NotImplementedError, pickle.dumps, self.gen)

     def test_53_bits_per_float(self):
         # This should pass whenever a C double has 53 bit precision.
         span = 2 ** 53
         cum = 0
         for i in range(100):
             cum |= int(self.gen.random() * span)
         self.assertEqual(cum, span-1)

     def test_bigrand(self):
         # The randrange routine should build-up the required number of bits
         # in stages so that all bit positions are active.
         span = 2 ** 500
         cum = 0
         for i in range(100):
             r = self.gen.randrange(span)
             self.assert_(0 <= r < span)
             cum |= r
         self.assertEqual(cum, span-1)

     def test_bigrand_ranges(self):
         for i in [40,80, 160, 200, 211, 250, 375, 512, 550]:
             start = self.gen.randrange(2 ** i)
             stop = self.gen.randrange(2 ** (i-2))
             if stop <= start:
                 return
             self.assert_(start <= self.gen.randrange(start, stop) < stop)

     def test_rangelimits(self):
         for start, stop in [(-2,0), (-(2**60)-2,-(2**60)), (2**60,2**60+2)]:
             self.assertEqual(set(range(start,stop)),
                 set([self.gen.randrange(start,stop) for i in range(100)]))

     def test_genrandbits(self):
         # Verify ranges
         for k in range(1, 1000):
             self.assert_(0 <= self.gen.getrandbits(k) < 2**k)

         # Verify all bits active
         getbits = self.gen.getrandbits
         for span in [1, 2, 3, 4, 31, 32, 32, 52, 53, 54, 119, 127, 128, 129]:
             cum = 0
             for i in range(100):
                 cum |= getbits(span)
             self.assertEqual(cum, 2**span-1)

         # Verify argument checking
         self.assertRaises(TypeError, self.gen.getrandbits)
         self.assertRaises(TypeError, self.gen.getrandbits, 1, 2)
         self.assertRaises(ValueError, self.gen.getrandbits, 0)
         self.assertRaises(ValueError, self.gen.getrandbits, -1)
         self.assertRaises(TypeError, self.gen.getrandbits, 10.1)

     def test_randbelow_logic(self, _log=log, int=int):
         # check bitcount transition points:  2**i and 2**(i+1)-1
         # show that: k = int(1.001 + _log(n, 2))
         # is equal to or one greater than the number of bits in n
         for i in range(1, 1000):
             n = 1 << i # check an exact power of two
             numbits = i+1
             k = int(1.00001 + _log(n, 2))
             self.assertEqual(k, numbits)
             self.assertEqual(n, 2**(k-1))

             n += n - 1      # check 1 below the next power of two
             k = int(1.00001 + _log(n, 2))
             self.assert_(k in [numbits, numbits+1])
             self.assert_(2**k > n > 2**(k-2))

             n -= n >> 15     # check a little farther below the next power of two
             k = int(1.00001 + _log(n, 2))
             self.assertEqual(k, numbits)        # note the stronger assertion
             self.assert_(2**k > n > 2**(k-1))   # note the stronger assertion


 class MersenneTwister_TestBasicOps(TestBasicOps):
     gen = random.Random()

     def test_setstate_first_arg(self):
         self.assertRaises(ValueError, self.gen.setstate, (1, None, None))

     def test_setstate_middle_arg(self):
         # Wrong type, s/b tuple
         self.assertRaises(TypeError, self.gen.setstate, (2, None, None))
         # Wrong length, s/b 625
         self.assertRaises(ValueError, self.gen.setstate, (2, (1,2,3), None))
         # Wrong type, s/b tuple of 625 ints
         self.assertRaises(TypeError, self.gen.setstate, (2, ('a',)*625, None))
         # Last element s/b an int also
         self.assertRaises(TypeError, self.gen.setstate, (2, (0,)*624+('a',), None))

     def test_referenceImplementation(self):
         # Compare the python implementation with results from the original
         # code.  Create 2000 53-bit precision random floats.  Compare only
         # the last ten entries to show that the independent implementations
         # are tracking.  Here is the main() function needed to create the
         # list of expected random numbers:
         #    void main(void){
         #         int i;
         #         unsigned long init[4]={61731, 24903, 614, 42143}, length=4;
         #         init_by_array(init, length);
         #         for (i=0; i<2000; i++) {
         #           printf("%.15f ", genrand_res53());
         #           if (i%5==4) printf("\n");
         #         }
         #     }
         expected = [0.45839803073713259,
                     0.86057815201978782,
                     0.92848331726782152,
                     0.35932681119782461,
                     0.081823493762449573,
                     0.14332226470169329,
                     0.084297823823520024,
                     0.53814864671831453,
                     0.089215024911993401,
                     0.78486196105372907]

         self.gen.seed(61731 + (24903<<32) + (614<<64) + (42143<<96))
         actual = self.randomlist(2000)[-10:]
         for a, e in zip(actual, expected):
             self.assertAlmostEqual(a,e,places=14)

     def test_strong_reference_implementation(self):
         # Like test_referenceImplementation, but checks for exact bit-level
         # equality.  This should pass on any box where C double contains
         # at least 53 bits of precision (the underlying algorithm suffers
         # no rounding errors -- all results are exact).
         from math import ldexp

         expected = [0x0eab3258d2231f,
                     0x1b89db315277a5,
                     0x1db622a5518016,
                     0x0b7f9af0d575bf,
                     0x029e4c4db82240,
                     0x04961892f5d673,
                     0x02b291598e4589,
                     0x11388382c15694,
                     0x02dad977c9e1fe,
                     0x191d96d4d334c6]
         self.gen.seed(61731 + (24903<<32) + (614<<64) + (42143<<96))
         actual = self.randomlist(2000)[-10:]
         for a, e in zip(actual, expected):
             self.assertEqual(int(ldexp(a, 53)), e)

     def test_long_seed(self):
         # This is most interesting to run in debug mode, just to make sure
         # nothing blows up.  Under the covers, a dynamically resized array
         # is allocated, consuming space proportional to the number of bits
         # in the seed.  Unfortunately, that's a quadratic-time algorithm,
         # so don't make this horribly big.
         seed = (1 << (10000 * 8)) - 1  # about 10K bytes
         self.gen.seed(seed)

     def test_53_bits_per_float(self):
         # This should pass whenever a C double has 53 bit precision.
         span = 2 ** 53
         cum = 0
         for i in range(100):
             cum |= int(self.gen.random() * span)
         self.assertEqual(cum, span-1)

     def test_bigrand(self):
         # The randrange routine should build-up the required number of bits
         # in stages so that all bit positions are active.
         span = 2 ** 500
         cum = 0
         for i in range(100):
             r = self.gen.randrange(span)
             self.assert_(0 <= r < span)
             cum |= r
         self.assertEqual(cum, span-1)

     def test_bigrand_ranges(self):
         for i in [40,80, 160, 200, 211, 250, 375, 512, 550]:
             start = self.gen.randrange(2 ** i)
             stop = self.gen.randrange(2 ** (i-2))
             if stop <= start:
                 return
             self.assert_(start <= self.gen.randrange(start, stop) < stop)

     def test_rangelimits(self):
         for start, stop in [(-2,0), (-(2**60)-2,-(2**60)), (2**60,2**60+2)]:
             self.assertEqual(set(range(start,stop)),
                 set([self.gen.randrange(start,stop) for i in range(100)]))

     def test_genrandbits(self):
         # Verify cross-platform repeatability
         self.gen.seed(1234567)
         self.assertEqual(self.gen.getrandbits(100),
                          97904845777343510404718956115)
         # Verify ranges
         for k in range(1, 1000):
             self.assert_(0 <= self.gen.getrandbits(k) < 2**k)

         # Verify all bits active
         getbits = self.gen.getrandbits
         for span in [1, 2, 3, 4, 31, 32, 32, 52, 53, 54, 119, 127, 128, 129]:
             cum = 0
             for i in range(100):
                 cum |= getbits(span)
             self.assertEqual(cum, 2**span-1)

         # Verify argument checking
         self.assertRaises(TypeError, self.gen.getrandbits)
         self.assertRaises(TypeError, self.gen.getrandbits, 'a')
         self.assertRaises(TypeError, self.gen.getrandbits, 1, 2)
         self.assertRaises(ValueError, self.gen.getrandbits, 0)
         self.assertRaises(ValueError, self.gen.getrandbits, -1)

     def test_randbelow_logic(self, _log=log, int=int):
         # check bitcount transition points:  2**i and 2**(i+1)-1
         # show that: k = int(1.001 + _log(n, 2))
         # is equal to or one greater than the number of bits in n
         for i in range(1, 1000):
             n = 1 << i # check an exact power of two
             numbits = i+1
             k = int(1.00001 + _log(n, 2))
             self.assertEqual(k, numbits)
             self.assertEqual(n, 2**(k-1))

             n += n - 1      # check 1 below the next power of two
             k = int(1.00001 + _log(n, 2))
             self.assert_(k in [numbits, numbits+1])
             self.assert_(2**k > n > 2**(k-2))

             n -= n >> 15     # check a little farther below the next power of two
             k = int(1.00001 + _log(n, 2))
             self.assertEqual(k, numbits)        # note the stronger assertion
             self.assert_(2**k > n > 2**(k-1))   # note the stronger assertion

     def test_randrange_bug_1590891(self):
         start = 1000000000000
         stop = -100000000000000000000
         step = -200
         x = self.gen.randrange(start, stop, step)
         self.assert_(stop < x <= start)
         self.assertEqual((x+stop)%step, 0)

 _gammacoeff = (0.9999999999995183, 676.5203681218835, -1259.139216722289,
               771.3234287757674,  -176.6150291498386, 12.50734324009056,
               -0.1385710331296526, 0.9934937113930748e-05, 0.1659470187408462e-06)

 def gamma(z, cof=_gammacoeff, g=7):
     z -= 1.0
     s = msum([cof[0]] + [cof[i] / (z+i) for i in range(1,len(cof))])
     z += 0.5
     return (z+g)**z / exp(z+g) * sqrt(2.0*pi) * s

 class TestDistributions(unittest.TestCase):
     def test_zeroinputs(self):
         # Verify that distributions can handle a series of zero inputs'
         g = random.Random()
         x = [g.random() for i in range(50)] + [0.0]*5
         g.random = x[:].pop; g.uniform(1,10)
         g.random = x[:].pop; g.paretovariate(1.0)
         g.random = x[:].pop; g.expovariate(1.0)
         g.random = x[:].pop; g.weibullvariate(1.0, 1.0)
         g.random = x[:].pop; g.normalvariate(0.0, 1.0)
         g.random = x[:].pop; g.gauss(0.0, 1.0)
         g.random = x[:].pop; g.lognormvariate(0.0, 1.0)
         g.random = x[:].pop; g.vonmisesvariate(0.0, 1.0)
         g.random = x[:].pop; g.gammavariate(0.01, 1.0)
         g.random = x[:].pop; g.gammavariate(1.0, 1.0)
         g.random = x[:].pop; g.gammavariate(200.0, 1.0)
         g.random = x[:].pop; g.betavariate(3.0, 3.0)
         g.random = x[:].pop; g.triangular(0.0, 1.0, 1.0/3.0)

     def test_avg_std(self):
         # Use integration to test distribution average and standard deviation.
         # Only works for distributions which do not consume variates in pairs
         g = random.Random()
         N = 5000
         x = [i/float(N) for i in range(1,N)]
         for variate, args, mu, sigmasqrd in [
                 (g.uniform, (1.0,10.0), (10.0+1.0)/2, (10.0-1.0)**2/12),
                 (g.triangular, (0.0, 1.0, 1.0/3.0), 4.0/9.0, 7.0/9.0/18.0),
                 (g.expovariate, (1.5,), 1/1.5, 1/1.5**2),
                 (g.paretovariate, (5.0,), 5.0/(5.0-1),
                                   5.0/((5.0-1)**2*(5.0-2))),
                 (g.weibullvariate, (1.0, 3.0), gamma(1+1/3.0),
                                   gamma(1+2/3.0)-gamma(1+1/3.0)**2) ]:
             g.random = x[:].pop
             y = []
             for i in range(len(x)):
                 try:
                     y.append(variate(*args))
                 except IndexError:
                     pass
             s1 = s2 = 0
             for e in y:
                 s1 += e
                 s2 += (e - mu) ** 2
             N = len(y)
             self.assertAlmostEqual(s1/N, mu, places=2)
             self.assertAlmostEqual(s2/(N-1), sigmasqrd, places=2)

 class TestModule(unittest.TestCase):
     def testMagicConstants(self):
         self.assertAlmostEqual(random.NV_MAGICCONST, 1.71552776992141)
         self.assertAlmostEqual(random.TWOPI, 6.28318530718)
         self.assertAlmostEqual(random.LOG4, 1.38629436111989)
         self.assertAlmostEqual(random.SG_MAGICCONST, 2.50407739677627)

     def test__all__(self):
         # tests validity but not completeness of the __all__ list
         self.failUnless(set(random.__all__) <= set(dir(random)))

     def test_random_subclass_with_kwargs(self):
         # SF bug #1486663 -- this used to erroneously raise a TypeError
         class Subclass(random.Random):
             def __init__(self, newarg=None):
                 random.Random.__init__(self)
         Subclass(newarg=1)


 def test_main(verbose=None):
     testclasses =    [MersenneTwister_TestBasicOps,
                       TestDistributions,
                       TestModule]

     try:
         random.SystemRandom().random()
     except NotImplementedError:
         pass
     else:
         testclasses.append(SystemRandom_TestBasicOps)

     support.run_unittest(*testclasses)

     # verify reference counting
     import sys
     if verbose and hasattr(sys, "gettotalrefcount"):
         counts = [None] * 5
         for i in range(len(counts)):
             support.run_unittest(*testclasses)
             counts[i] = sys.gettotalrefcount()
         print(counts)

 if __name__ == "__main__":
     test_main(verbose=True)
	#!/usr/bin/env python

	import unittest
	import random
	import time
	import pickle
	import warnings
	from math import log, exp, sqrt, pi, sum as msum
	from test import support

	class TestBasicOps(unittest.TestCase):
	# Superclass with tests common to all generators.
	# Subclasses must arrange for self.gen to retrieve the Random instance
	# to be tested.

	def randomlist(self, n):
	"""Helper function to make a list of random numbers"""
	return [self.gen.random() for i in range(n)]

	def test_autoseed(self):
	self.gen.seed()
	state1 = self.gen.getstate()
	time.sleep(0.1)
	self.gen.seed() # diffent seeds at different times
	state2 = self.gen.getstate()
	self.assertNotEqual(state1, state2)

	def test_saverestore(self):
	N = 1000
	self.gen.seed()
	state = self.gen.getstate()
	randseq = self.randomlist(N)
	self.gen.setstate(state) # should regenerate the same sequence
	self.assertEqual(randseq, self.randomlist(N))

	def test_seedargs(self):
	for arg in [None, 0, 0, 1, 1, -1, -1, 1020, -(1020),
	3.14, 1+2j, 'a', tuple('abc')]:
	self.gen.seed(arg)
	for arg in [list(range(3)), dict(one=1)]:
	self.assertRaises(TypeError, self.gen.seed, arg)
	self.assertRaises(TypeError, self.gen.seed, 1, 2)
	self.assertRaises(TypeError, type(self.gen), [])

	def test_sample(self):
	# For the entire allowable range of 0 <= k <= N, validate that
	# the sample is of the correct length and contains only unique items
	N = 100
	population = range(N)
	for k in range(N+1):
	s = self.gen.sample(population, k)
	self.assertEqual(len(s), k)
	uniq = set(s)
	self.assertEqual(len(uniq), k)
	self.failUnless(uniq <= set(population))
	self.assertEqual(self.gen.sample([], 0), []) # test edge case N==k==0

	def test_sample_distribution(self):
	# For the entire allowable range of 0 <= k <= N, validate that
	# sample generates all possible permutations
	n = 5
	pop = range(n)
	trials = 10000 # large num prevents false negatives without slowing normal case
	def factorial(n):
	if n == 0:
	return 1
	return n * factorial(n - 1)
	for k in range(n):
	expected = factorial(n) // factorial(n-k)
	perms = {}
	for i in range(trials):
	perms[tuple(self.gen.sample(pop, k))] = None
	if len(perms) == expected:
	break
	else:
	self.fail()

	def test_sample_inputs(self):
	# SF bug #801342 -- population can be any iterable defining __len__()
	self.gen.sample(set(range(20)), 2)
	self.gen.sample(range(20), 2)
	self.gen.sample(range(20), 2)
	self.gen.sample(str('abcdefghijklmnopqrst'), 2)
	self.gen.sample(tuple('abcdefghijklmnopqrst'), 2)

	def test_sample_on_dicts(self):
	self.assertRaises(TypeError, self.gen.sample, dict.fromkeys('abcdef'), 2)

	def test_gauss(self):
	# Ensure that the seed() method initializes all the hidden state. In
	# particular, through 2.2.1 it failed to reset a piece of state used
	# by (and only by) the .gauss() method.

	for seed in 1, 12, 123, 1234, 12345, 123456, 654321:
	self.gen.seed(seed)
	x1 = self.gen.random()
	y1 = self.gen.gauss(0, 1)

	self.gen.seed(seed)
	x2 = self.gen.random()
	y2 = self.gen.gauss(0, 1)

	self.assertEqual(x1, x2)
	self.assertEqual(y1, y2)

	def test_pickling(self):
	state = pickle.dumps(self.gen)
	origseq = [self.gen.random() for i in range(10)]
	newgen = pickle.loads(state)
	restoredseq = [newgen.random() for i in range(10)]
	self.assertEqual(origseq, restoredseq)

	def test_bug_1727780(self):
	# verify that version-2-pickles can be loaded
	# fine, whether they are created on 32-bit or 64-bit
	# platforms, and that version-3-pickles load fine.
	files = [("randv2_32.pck", 780),
	("randv2_64.pck", 866),
	("randv3.pck", 343)]
	for file, value in files:
	f = open(support.findfile(file),"rb")
	r = pickle.load(f)
	f.close()
	self.assertEqual(r.randrange(1000), value)

	class SystemRandom_TestBasicOps(TestBasicOps):
	gen = random.SystemRandom()

	def test_autoseed(self):
	# Doesn't need to do anything except not fail
	self.gen.seed()

	def test_saverestore(self):
	self.assertRaises(NotImplementedError, self.gen.getstate)
	self.assertRaises(NotImplementedError, self.gen.setstate, None)

	def test_seedargs(self):
	# Doesn't need to do anything except not fail
	self.gen.seed(100)

	def test_gauss(self):
	self.gen.gauss_next = None
	self.gen.seed(100)
	self.assertEqual(self.gen.gauss_next, None)

	def test_pickling(self):
	self.assertRaises(NotImplementedError, pickle.dumps, self.gen)

	def test_53_bits_per_float(self):
	# This should pass whenever a C double has 53 bit precision.
	span = 2 ** 53
	cum = 0
	for i in range(100):
	cum \|= int(self.gen.random() * span)
	self.assertEqual(cum, span-1)

	def test_bigrand(self):
	# The randrange routine should build-up the required number of bits
	# in stages so that all bit positions are active.
	span = 2 ** 500
	cum = 0
	for i in range(100):
	r = self.gen.randrange(span)
	self.assert_(0 <= r < span)
	cum \|= r
	self.assertEqual(cum, span-1)

	def test_bigrand_ranges(self):
	for i in [40,80, 160, 200, 211, 250, 375, 512, 550]:
	start = self.gen.randrange(2 ** i)
	stop = self.gen.randrange(2 ** (i-2))
	if stop <= start:
	return
	self.assert_(start <= self.gen.randrange(start, stop) < stop)

	def test_rangelimits(self):
	for start, stop in [(-2,0), (-(260)-2,-(260)), (260,260+2)]:
	self.assertEqual(set(range(start,stop)),
	set([self.gen.randrange(start,stop) for i in range(100)]))

	def test_genrandbits(self):
	# Verify ranges
	for k in range(1, 1000):
	self.assert_(0 <= self.gen.getrandbits(k) < 2**k)

	# Verify all bits active
	getbits = self.gen.getrandbits
	for span in [1, 2, 3, 4, 31, 32, 32, 52, 53, 54, 119, 127, 128, 129]:
	cum = 0
	for i in range(100):
	cum \|= getbits(span)
	self.assertEqual(cum, 2**span-1)

	# Verify argument checking
	self.assertRaises(TypeError, self.gen.getrandbits)
	self.assertRaises(TypeError, self.gen.getrandbits, 1, 2)
	self.assertRaises(ValueError, self.gen.getrandbits, 0)
	self.assertRaises(ValueError, self.gen.getrandbits, -1)
	self.assertRaises(TypeError, self.gen.getrandbits, 10.1)

	def test_randbelow_logic(self, _log=log, int=int):
	# check bitcount transition points: 2i and 2(i+1)-1
	# show that: k = int(1.001 + _log(n, 2))
	# is equal to or one greater than the number of bits in n
	for i in range(1, 1000):
	n = 1 << i # check an exact power of two
	numbits = i+1
	k = int(1.00001 + _log(n, 2))
	self.assertEqual(k, numbits)
	self.assertEqual(n, 2**(k-1))

	n += n - 1 # check 1 below the next power of two
	k = int(1.00001 + _log(n, 2))
	self.assert_(k in [numbits, numbits+1])
	self.assert_(2k > n > 2(k-2))

	n -= n >> 15 # check a little farther below the next power of two
	k = int(1.00001 + _log(n, 2))
	self.assertEqual(k, numbits) # note the stronger assertion
	self.assert_(2k > n > 2(k-1)) # note the stronger assertion


	class MersenneTwister_TestBasicOps(TestBasicOps):
	gen = random.Random()

	def test_setstate_first_arg(self):
	self.assertRaises(ValueError, self.gen.setstate, (1, None, None))

	def test_setstate_middle_arg(self):
	# Wrong type, s/b tuple
	self.assertRaises(TypeError, self.gen.setstate, (2, None, None))
	# Wrong length, s/b 625
	self.assertRaises(ValueError, self.gen.setstate, (2, (1,2,3), None))
	# Wrong type, s/b tuple of 625 ints
	self.assertRaises(TypeError, self.gen.setstate, (2, ('a',)*625, None))
	# Last element s/b an int also
	self.assertRaises(TypeError, self.gen.setstate, (2, (0,)*624+('a',), None))

	def test_referenceImplementation(self):
	# Compare the python implementation with results from the original
	# code. Create 2000 53-bit precision random floats. Compare only
	# the last ten entries to show that the independent implementations
	# are tracking. Here is the main() function needed to create the
	# list of expected random numbers:
	# void main(void){
	# int i;
	# unsigned long init[4]={61731, 24903, 614, 42143}, length=4;
	# init_by_array(init, length);
	# for (i=0; i<2000; i++) {
	# printf("%.15f ", genrand_res53());
	# if (i%5==4) printf("\n");
	# }
	# }
	expected = [0.45839803073713259,
	0.86057815201978782,
	0.92848331726782152,
	0.35932681119782461,
	0.081823493762449573,
	0.14332226470169329,
	0.084297823823520024,
	0.53814864671831453,
	0.089215024911993401,
	0.78486196105372907]

	self.gen.seed(61731 + (24903<<32) + (614<<64) + (42143<<96))
	actual = self.randomlist(2000)[-10:]
	for a, e in zip(actual, expected):
	self.assertAlmostEqual(a,e,places=14)

	def test_strong_reference_implementation(self):
	# Like test_referenceImplementation, but checks for exact bit-level
	# equality. This should pass on any box where C double contains
	# at least 53 bits of precision (the underlying algorithm suffers
	# no rounding errors -- all results are exact).
	from math import ldexp

	expected = [0x0eab3258d2231f,
	0x1b89db315277a5,
	0x1db622a5518016,
	0x0b7f9af0d575bf,
	0x029e4c4db82240,
	0x04961892f5d673,
	0x02b291598e4589,
	0x11388382c15694,
	0x02dad977c9e1fe,
	0x191d96d4d334c6]
	self.gen.seed(61731 + (24903<<32) + (614<<64) + (42143<<96))
	actual = self.randomlist(2000)[-10:]
	for a, e in zip(actual, expected):
	self.assertEqual(int(ldexp(a, 53)), e)

	def test_long_seed(self):
	# This is most interesting to run in debug mode, just to make sure
	# nothing blows up. Under the covers, a dynamically resized array
	# is allocated, consuming space proportional to the number of bits
	# in the seed. Unfortunately, that's a quadratic-time algorithm,
	# so don't make this horribly big.
	seed = (1 << (10000 * 8)) - 1 # about 10K bytes
	self.gen.seed(seed)

	def test_53_bits_per_float(self):
	# This should pass whenever a C double has 53 bit precision.
	span = 2 ** 53
	cum = 0
	for i in range(100):
	cum \|= int(self.gen.random() * span)
	self.assertEqual(cum, span-1)

	def test_bigrand(self):
	# The randrange routine should build-up the required number of bits
	# in stages so that all bit positions are active.
	span = 2 ** 500
	cum = 0
	for i in range(100):
	r = self.gen.randrange(span)
	self.assert_(0 <= r < span)
	cum \|= r
	self.assertEqual(cum, span-1)

	def test_bigrand_ranges(self):
	for i in [40,80, 160, 200, 211, 250, 375, 512, 550]:
	start = self.gen.randrange(2 ** i)
	stop = self.gen.randrange(2 ** (i-2))
	if stop <= start:
	return
	self.assert_(start <= self.gen.randrange(start, stop) < stop)

	def test_rangelimits(self):
	for start, stop in [(-2,0), (-(260)-2,-(260)), (260,260+2)]:
	self.assertEqual(set(range(start,stop)),
	set([self.gen.randrange(start,stop) for i in range(100)]))

	def test_genrandbits(self):
	# Verify cross-platform repeatability
	self.gen.seed(1234567)
	self.assertEqual(self.gen.getrandbits(100),
	97904845777343510404718956115)
	# Verify ranges
	for k in range(1, 1000):
	self.assert_(0 <= self.gen.getrandbits(k) < 2**k)

	# Verify all bits active
	getbits = self.gen.getrandbits
	for span in [1, 2, 3, 4, 31, 32, 32, 52, 53, 54, 119, 127, 128, 129]:
	cum = 0
	for i in range(100):
	cum \|= getbits(span)
	self.assertEqual(cum, 2**span-1)

	# Verify argument checking
	self.assertRaises(TypeError, self.gen.getrandbits)
	self.assertRaises(TypeError, self.gen.getrandbits, 'a')
	self.assertRaises(TypeError, self.gen.getrandbits, 1, 2)
	self.assertRaises(ValueError, self.gen.getrandbits, 0)
	self.assertRaises(ValueError, self.gen.getrandbits, -1)

	def test_randbelow_logic(self, _log=log, int=int):
	# check bitcount transition points: 2i and 2(i+1)-1
	# show that: k = int(1.001 + _log(n, 2))
	# is equal to or one greater than the number of bits in n
	for i in range(1, 1000):
	n = 1 << i # check an exact power of two
	numbits = i+1
	k = int(1.00001 + _log(n, 2))
	self.assertEqual(k, numbits)
	self.assertEqual(n, 2**(k-1))

	n += n - 1 # check 1 below the next power of two
	k = int(1.00001 + _log(n, 2))
	self.assert_(k in [numbits, numbits+1])
	self.assert_(2k > n > 2(k-2))

	n -= n >> 15 # check a little farther below the next power of two
	k = int(1.00001 + _log(n, 2))
	self.assertEqual(k, numbits) # note the stronger assertion
	self.assert_(2k > n > 2(k-1)) # note the stronger assertion

	def test_randrange_bug_1590891(self):
	start = 1000000000000
	stop = -100000000000000000000
	step = -200
	x = self.gen.randrange(start, stop, step)
	self.assert_(stop < x <= start)
	self.assertEqual((x+stop)%step, 0)

	_gammacoeff = (0.9999999999995183, 676.5203681218835, -1259.139216722289,
	771.3234287757674, -176.6150291498386, 12.50734324009056,
	-0.1385710331296526, 0.9934937113930748e-05, 0.1659470187408462e-06)

	def gamma(z, cof=_gammacoeff, g=7):
	z -= 1.0
	s = msum([cof[0]] + [cof[i] / (z+i) for i in range(1,len(cof))])
	z += 0.5
	return (z+g)*z / exp(z+g) sqrt(2.0pi) s

	class TestDistributions(unittest.TestCase):
	def test_zeroinputs(self):
	# Verify that distributions can handle a series of zero inputs'
	g = random.Random()
	x = [g.random() for i in range(50)] + [0.0]*5
	g.random = x[:].pop; g.uniform(1,10)
	g.random = x[:].pop; g.paretovariate(1.0)
	g.random = x[:].pop; g.expovariate(1.0)
	g.random = x[:].pop; g.weibullvariate(1.0, 1.0)
	g.random = x[:].pop; g.normalvariate(0.0, 1.0)
	g.random = x[:].pop; g.gauss(0.0, 1.0)
	g.random = x[:].pop; g.lognormvariate(0.0, 1.0)
	g.random = x[:].pop; g.vonmisesvariate(0.0, 1.0)
	g.random = x[:].pop; g.gammavariate(0.01, 1.0)
	g.random = x[:].pop; g.gammavariate(1.0, 1.0)
	g.random = x[:].pop; g.gammavariate(200.0, 1.0)
	g.random = x[:].pop; g.betavariate(3.0, 3.0)
	g.random = x[:].pop; g.triangular(0.0, 1.0, 1.0/3.0)

	def test_avg_std(self):
	# Use integration to test distribution average and standard deviation.
	# Only works for distributions which do not consume variates in pairs
	g = random.Random()
	N = 5000
	x = [i/float(N) for i in range(1,N)]
	for variate, args, mu, sigmasqrd in [
	(g.uniform, (1.0,10.0), (10.0+1.0)/2, (10.0-1.0)**2/12),
	(g.triangular, (0.0, 1.0, 1.0/3.0), 4.0/9.0, 7.0/9.0/18.0),
	(g.expovariate, (1.5,), 1/1.5, 1/1.5**2),
	(g.paretovariate, (5.0,), 5.0/(5.0-1),
	5.0/((5.0-1)*2(5.0-2))),
	(g.weibullvariate, (1.0, 3.0), gamma(1+1/3.0),
	gamma(1+2/3.0)-gamma(1+1/3.0)**2) ]:
	g.random = x[:].pop
	y = []
	for i in range(len(x)):
	try:
	y.append(variate(*args))
	except IndexError:
	pass
	s1 = s2 = 0
	for e in y:
	s1 += e
	s2 += (e - mu) ** 2
	N = len(y)
	self.assertAlmostEqual(s1/N, mu, places=2)
	self.assertAlmostEqual(s2/(N-1), sigmasqrd, places=2)

	class TestModule(unittest.TestCase):
	def testMagicConstants(self):
	self.assertAlmostEqual(random.NV_MAGICCONST, 1.71552776992141)
	self.assertAlmostEqual(random.TWOPI, 6.28318530718)
	self.assertAlmostEqual(random.LOG4, 1.38629436111989)
	self.assertAlmostEqual(random.SG_MAGICCONST, 2.50407739677627)

	def test__all__(self):
	# tests validity but not completeness of the __all__ list
	self.failUnless(set(random.__all__) <= set(dir(random)))

	def test_random_subclass_with_kwargs(self):
	# SF bug #1486663 -- this used to erroneously raise a TypeError
	class Subclass(random.Random):
	def __init__(self, newarg=None):
	random.Random.__init__(self)
	Subclass(newarg=1)


	def test_main(verbose=None):
	testclasses = [MersenneTwister_TestBasicOps,
	TestDistributions,
	TestModule]

	try:
	random.SystemRandom().random()
	except NotImplementedError:
	pass
	else:
	testclasses.append(SystemRandom_TestBasicOps)

	support.run_unittest(*testclasses)

	# verify reference counting
	import sys
	if verbose and hasattr(sys, "gettotalrefcount"):
	counts = [None] * 5
	for i in range(len(counts)):
	support.run_unittest(*testclasses)
	counts[i] = sys.gettotalrefcount()
	print(counts)

	if __name__ == "__main__":
	test_main(verbose=True)