本文整理汇总了Python中sympy.Q.rational方法的典型用法代码示例。如果您正苦于以下问题:Python Q.rational方法的具体用法?Python Q.rational怎么用?Python Q.rational使用的例子?那么恭喜您, 这里精选的方法代码示例或许可以为您提供帮助。您也可以进一步了解该方法所在类sympy.Q
的用法示例。
在下文中一共展示了Q.rational方法的2个代码示例,这些例子默认根据受欢迎程度排序。您可以为喜欢或者感觉有用的代码点赞,您的评价将有助于系统推荐出更棒的Python代码示例。
示例1: test_integer
# 需要导入模块: from sympy import Q [as 别名]
# 或者: from sympy.Q import rational [as 别名]
def test_integer():
assert satask(Q.integer(1)) is True
assert satask(Q.integer(Rational(1, 2))) is False
assert satask(Q.integer(x + y), Q.integer(x) & Q.integer(y)) is True
assert satask(Q.integer(x + y), Q.integer(x)) is None
assert satask(Q.integer(x + y), Q.integer(x) & ~Q.integer(y)) is False
assert satask(Q.integer(x + y + z), Q.integer(x) & Q.integer(y) &
~Q.integer(z)) is False
assert satask(Q.integer(x + y + z), Q.integer(x) & ~Q.integer(y) &
~Q.integer(z)) is None
assert satask(Q.integer(x + y + z), Q.integer(x) & ~Q.integer(y)) is None
assert satask(Q.integer(x + y), Q.integer(x) & Q.irrational(y)) is False
assert satask(Q.integer(x*y), Q.integer(x) & Q.integer(y)) is True
assert satask(Q.integer(x*y), Q.integer(x)) is None
assert satask(Q.integer(x*y), Q.integer(x) & ~Q.integer(y)) is None
assert satask(Q.integer(x*y), Q.integer(x) & ~Q.rational(y)) is False
assert satask(Q.integer(x*y*z), Q.integer(x) & Q.integer(y) &
~Q.rational(z)) is False
assert satask(Q.integer(x*y*z), Q.integer(x) & ~Q.rational(y) &
~Q.rational(z)) is None
assert satask(Q.integer(x*y*z), Q.integer(x) & ~Q.rational(y)) is None
assert satask(Q.integer(x*y), Q.integer(x) & Q.irrational(y)) is False
示例2: test_rational_irrational
# 需要导入模块: from sympy import Q [as 别名]
# 或者: from sympy.Q import rational [as 别名]
def test_rational_irrational():
assert satask(Q.irrational(2)) is False
assert satask(Q.rational(2)) is True
assert satask(Q.irrational(pi)) is True
assert satask(Q.rational(pi)) is False
assert satask(Q.irrational(I)) is False
assert satask(Q.rational(I)) is False
assert satask(Q.irrational(x*y*z), Q.irrational(x) & Q.irrational(y) &
Q.rational(z)) is None
assert satask(Q.irrational(x*y*z), Q.irrational(x) & Q.rational(y) &
Q.rational(z)) is True
assert satask(Q.irrational(pi*x*y), Q.rational(x) & Q.rational(y)) is True
assert satask(Q.irrational(x + y + z), Q.irrational(x) & Q.irrational(y) &
Q.rational(z)) is None
assert satask(Q.irrational(x + y + z), Q.irrational(x) & Q.rational(y) &
Q.rational(z)) is True
assert satask(Q.irrational(pi + x + y), Q.rational(x) & Q.rational(y)) is True
assert satask(Q.irrational(x*y*z), Q.rational(x) & Q.rational(y) &
Q.rational(z)) is False
assert satask(Q.rational(x*y*z), Q.rational(x) & Q.rational(y) &
Q.rational(z)) is True
assert satask(Q.irrational(x + y + z), Q.rational(x) & Q.rational(y) &
Q.rational(z)) is False
assert satask(Q.rational(x + y + z), Q.rational(x) & Q.rational(y) &
Q.rational(z)) is True