Z3
Loading...
Searching...
No Matches
Public Member Functions
RatNumRef Class Reference
Inheritance diagram for RatNumRef:

Public Member Functions

 numerator (self)
 denominator (self)
 numerator_as_long (self)
 denominator_as_long (self)
 is_int (self)
 is_real (self)
 is_int_value (self)
 as_long (self)
 as_decimal (self, prec)
 as_string (self)
 as_fraction (self)
 py_value (self)
Public Member Functions inherited from ArithRef
 sort (self)
 __add__ (self, other)
 __radd__ (self, other)
 __mul__ (self, other)
 __rmul__ (self, other)
 __sub__ (self, other)
 __rsub__ (self, other)
 __pow__ (self, other)
 __rpow__ (self, other)
 __div__ (self, other)
 __truediv__ (self, other)
 __rdiv__ (self, other)
 __rtruediv__ (self, other)
 __mod__ (self, other)
 __rmod__ (self, other)
 __neg__ (self)
 __pos__ (self)
 __le__ (self, other)
 __lt__ (self, other)
 __gt__ (self, other)
 __ge__ (self, other)
Public Member Functions inherited from ExprRef
 as_ast (self)
 get_id (self)
 sort_kind (self)
 __eq__ (self, other)
 __hash__ (self)
 __ne__ (self, other)
 params (self)
 decl (self)
 kind (self)
 num_args (self)
 arg (self, idx)
 children (self)
 from_string (self, s)
 serialize (self)
Public Member Functions inherited from AstRef
 __init__ (self, ast, ctx=None)
 __del__ (self)
 __deepcopy__ (self, memo={})
 __str__ (self)
 __repr__ (self)
 __eq__ (self, other)
 __hash__ (self)
 __nonzero__ (self)
 __bool__ (self)
 sexpr (self)
 ctx_ref (self)
 eq (self, other)
 translate (self, target)
 __copy__ (self)
 hash (self)
Public Member Functions inherited from Z3PPObject
 use_pp (self)

Additional Inherited Members

Data Fields inherited from AstRef
 ast = ast
 ctx = _get_ctx(ctx)
Protected Member Functions inherited from Z3PPObject
 _repr_html_ (self)

Detailed Description

Rational values.

Definition at line 3097 of file z3py.py.

Member Function Documentation

◆ as_decimal()

as_decimal ( self,
prec ) 
 Return a Z3 rational value as a string in decimal notation using at most `prec` decimal places.

>>> v = RealVal("1/5")
>>> v.as_decimal(3)
'0.2'
>>> v = RealVal("1/3")
>>> v.as_decimal(3)
'0.333?'

Definition at line 3163 of file z3py.py.

3163 def as_decimal(self, prec):
3164 """ Return a Z3 rational value as a string in decimal notation using at most `prec` decimal places.
3165
3166 >>> v = RealVal("1/5")
3167 >>> v.as_decimal(3)
3168 '0.2'
3169 >>> v = RealVal("1/3")
3170 >>> v.as_decimal(3)
3171 '0.333?'
3172 """
3173 return Z3_get_numeral_decimal_string(self.ctx_ref(), self.as_ast(), prec)
3174
Z3_get_numeral_decimal_string
Z3_string Z3_API Z3_get_numeral_decimal_string(Z3_context c, Z3_ast a, unsigned precision)
Return numeral as a string in decimal notation. The result has at most precision decimal places.

◆ as_fraction()

as_fraction ( self) 
Return a Z3 rational as a Python Fraction object.

>>> v = RealVal("1/5")
>>> v.as_fraction()
Fraction(1, 5)

Definition at line 3184 of file z3py.py.

3184 def as_fraction(self):
3185 """Return a Z3 rational as a Python Fraction object.
3186
3187 >>> v = RealVal("1/5")
3188 >>> v.as_fraction()
3189 Fraction(1, 5)
3190 """
3191 return Fraction(self.numerator_as_long(), self.denominator_as_long())
3192

◆ as_long()

as_long ( self)

Definition at line 3159 of file z3py.py.

3159 def as_long(self):
3160 _z3_assert(self.is_int_value(), "Expected integer fraction")
3161 return self.numerator_as_long()
3162

Referenced by BitVecNumRef.as_signed_long(), denominator_as_long(), numerator_as_long(), and BitVecNumRef.py_value().

◆ as_string()

as_string ( self) 
Return a Z3 rational numeral as a Python string.

>>> v = Q(3,6)
>>> v.as_string()
'1/2'

Definition at line 3175 of file z3py.py.

3175 def as_string(self):
3176 """Return a Z3 rational numeral as a Python string.
3177
3178 >>> v = Q(3,6)
3179 >>> v.as_string()
3180 '1/2'
3181 """
3182 return Z3_get_numeral_string(self.ctx_ref(), self.as_ast())
3183
Z3_get_numeral_string
Z3_string Z3_API Z3_get_numeral_string(Z3_context c, Z3_ast a)
Return numeral value, as a decimal string of a numeric constant term.

Referenced by BitVecNumRef.as_long().

◆ denominator()

denominator ( self) 
 Return the denominator of a Z3 rational numeral.

>>> is_rational_value(Q(3,5))
True
>>> n = Q(3,5)
>>> n.denominator()
5

Definition at line 3115 of file z3py.py.

3115 def denominator(self):
3116 """ Return the denominator of a Z3 rational numeral.
3117
3118 >>> is_rational_value(Q(3,5))
3119 True
3120 >>> n = Q(3,5)
3121 >>> n.denominator()
3122 5
3123 """
3124 return IntNumRef(Z3_get_denominator(self.ctx_ref(), self.as_ast()), self.ctx)
3125
Z3_get_denominator
Z3_ast Z3_API Z3_get_denominator(Z3_context c, Z3_ast a)
Return the denominator (as a numeral AST) of a numeral AST of sort Real.

Referenced by denominator_as_long(), and is_int_value().

◆ denominator_as_long()

denominator_as_long ( self) 
 Return the denominator as a Python long.

>>> v = RealVal("1/3")
>>> v
1/3
>>> v.denominator_as_long()
3

Definition at line 3139 of file z3py.py.

3139 def denominator_as_long(self):
3140 """ Return the denominator as a Python long.
3141
3142 >>> v = RealVal("1/3")
3143 >>> v
3144 1/3
3145 >>> v.denominator_as_long()
3146 3
3147 """
3148 return self.denominator().as_long()
3149

Referenced by as_fraction(), and is_int_value().

◆ is_int()

is_int ( self) 
Return `True` if `self` is an integer expression.

>>> x = Int('x')
>>> x.is_int()
True
>>> (x + 1).is_int()
True
>>> y = Real('y')
>>> (x + y).is_int()
False

Reimplemented from ArithRef.

Definition at line 3150 of file z3py.py.

3150 def is_int(self):
3151 return False
3152

Referenced by is_int_value().

◆ is_int_value()

is_int_value ( self)

Definition at line 3156 of file z3py.py.

3156 def is_int_value(self):
3157 return self.denominator().is_int() and self.denominator_as_long() == 1
3158

Referenced by as_long().

◆ is_real()

is_real ( self) 
Return `True` if `self` is an real expression.

>>> x = Real('x')
>>> x.is_real()
True
>>> (x + 1).is_real()
True

Reimplemented from ArithRef.

Definition at line 3153 of file z3py.py.

3153 def is_real(self):
3154 return True
3155

◆ numerator()

numerator ( self) 
 Return the numerator of a Z3 rational numeral.

>>> is_rational_value(RealVal("3/5"))
True
>>> n = RealVal("3/5")
>>> n.numerator()
3
>>> is_rational_value(Q(3,5))
True
>>> Q(3,5).numerator()
3

Definition at line 3100 of file z3py.py.

3100 def numerator(self):
3101 """ Return the numerator of a Z3 rational numeral.
3102
3103 >>> is_rational_value(RealVal("3/5"))
3104 True
3105 >>> n = RealVal("3/5")
3106 >>> n.numerator()
3107 3
3108 >>> is_rational_value(Q(3,5))
3109 True
3110 >>> Q(3,5).numerator()
3111 3
3112 """
3113 return IntNumRef(Z3_get_numerator(self.ctx_ref(), self.as_ast()), self.ctx)
3114
Z3_get_numerator
Z3_ast Z3_API Z3_get_numerator(Z3_context c, Z3_ast a)
Return the numerator (as a numeral AST) of a numeral AST of sort Real.

Referenced by numerator_as_long().

◆ numerator_as_long()

numerator_as_long ( self) 
 Return the numerator as a Python long.

>>> v = RealVal(10000000000)
>>> v
10000000000
>>> v + 1
10000000000 + 1
>>> v.numerator_as_long() + 1 == 10000000001
True

Definition at line 3126 of file z3py.py.

3126 def numerator_as_long(self):
3127 """ Return the numerator as a Python long.
3128
3129 >>> v = RealVal(10000000000)
3130 >>> v
3131 10000000000
3132 >>> v + 1
3133 10000000000 + 1
3134 >>> v.numerator_as_long() + 1 == 10000000001
3135 True
3136 """
3137 return self.numerator().as_long()
3138

Referenced by as_fraction(), and as_long().

◆ py_value()

py_value ( self) 
Return a Python value that is equivalent to `self`.

Reimplemented from AstRef.

Definition at line 3193 of file z3py.py.

3193 def py_value(self):
3194 return Z3_get_numeral_double(self.ctx_ref(), self.as_ast())
3195
3196
Z3_get_numeral_double
double Z3_API Z3_get_numeral_double(Z3_context c, Z3_ast a)
Return numeral as a double.
Generated on for Z3 by doxygen 1.15.0