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switching to high quality piper tts and added label translations

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Matthias Hinrichs
2026-01-29 23:48:19 +01:00
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venv_piper/lib/python3.12/site-packages/sympy/functions/elementary/tests/__init__.py
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venv_piper/lib/python3.12/site-packages/sympy/functions/elementary/tests/test_exponential.py
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from sympy.assumptions.refine import refine
from sympy.calculus.accumulationbounds import AccumBounds
from sympy.concrete.products import Product
from sympy.concrete.summations import Sum
from sympy.core.function import expand_log
from sympy.core.numbers import (E, Float, I, Rational, nan, oo, pi, zoo)
from sympy.core.power import Pow
from sympy.core.singleton import S
from sympy.core.symbol import (Symbol, symbols)
from sympy.functions.elementary.complexes import (adjoint, conjugate, re, sign, transpose)
from sympy.functions.elementary.exponential import (LambertW, exp, exp_polar, log)
from sympy.functions.elementary.hyperbolic import (cosh, sinh, tanh)
from sympy.functions.elementary.miscellaneous import sqrt
from sympy.functions.elementary.trigonometric import (cos, sin, tan)
from sympy.matrices.expressions.matexpr import MatrixSymbol
from sympy.polys.polytools import gcd
from sympy.series.order import O
from sympy.simplify.simplify import simplify
from sympy.core.parameters import global_parameters
from sympy.functions.elementary.exponential import match_real_imag
from sympy.abc import x, y, z
from sympy.core.expr import unchanged
from sympy.core.function import ArgumentIndexError
from sympy.testing.pytest import raises, XFAIL, _both_exp_pow
@_both_exp_pow
def test_exp_values():
if global_parameters.exp_is_pow:
assert type(exp(x)) is Pow
else:
assert type(exp(x)) is exp
k = Symbol('k', integer=True)
assert exp(nan) is nan
assert exp(oo) is oo
assert exp(-oo) == 0
assert exp(0) == 1
assert exp(1) == E
assert exp(-1 + x).as_base_exp() == (S.Exp1, x - 1)
assert exp(1 + x).as_base_exp() == (S.Exp1, x + 1)
assert exp(pi*I/2) == I
assert exp(pi*I) == -1
assert exp(pi*I*Rational(3, 2)) == -I
assert exp(2*pi*I) == 1
assert refine(exp(pi*I*2*k)) == 1
assert refine(exp(pi*I*2*(k + S.Half))) == -1
assert refine(exp(pi*I*2*(k + Rational(1, 4)))) == I
assert refine(exp(pi*I*2*(k + Rational(3, 4)))) == -I
assert exp(log(x)) == x
assert exp(2*log(x)) == x**2
assert exp(pi*log(x)) == x**pi
assert exp(17*log(x) + E*log(y)) == x**17 * y**E
assert exp(x*log(x)) != x**x
assert exp(sin(x)*log(x)) != x
assert exp(3*log(x) + oo*x) == exp(oo*x) * x**3
assert exp(4*log(x)*log(y) + 3*log(x)) == x**3 * exp(4*log(x)*log(y))
assert exp(-oo, evaluate=False).is_finite is True
assert exp(oo, evaluate=False).is_finite is False
@_both_exp_pow
def test_exp_period():
assert exp(I*pi*Rational(9, 4)) == exp(I*pi/4)
assert exp(I*pi*Rational(46, 18)) == exp(I*pi*Rational(5, 9))
assert exp(I*pi*Rational(25, 7)) == exp(I*pi*Rational(-3, 7))
assert exp(I*pi*Rational(-19, 3)) == exp(-I*pi/3)
assert exp(I*pi*Rational(37, 8)) - exp(I*pi*Rational(-11, 8)) == 0
assert exp(I*pi*Rational(-5, 3)) / exp(I*pi*Rational(11, 5)) * exp(I*pi*Rational(148, 15)) == 1
assert exp(2 - I*pi*Rational(17, 5)) == exp(2 + I*pi*Rational(3, 5))
assert exp(log(3) + I*pi*Rational(29, 9)) == 3 * exp(I*pi*Rational(-7, 9))
n = Symbol('n', integer=True)
e = Symbol('e', even=True)
assert exp(e*I*pi) == 1
assert exp((e + 1)*I*pi) == -1
assert exp((1 + 4*n)*I*pi/2) == I
assert exp((-1 + 4*n)*I*pi/2) == -I
@_both_exp_pow
def test_exp_log():
x = Symbol("x", real=True)
assert log(exp(x)) == x
assert exp(log(x)) == x
if not global_parameters.exp_is_pow:
assert log(x).inverse() == exp
assert exp(x).inverse() == log
y = Symbol("y", polar=True)
assert log(exp_polar(z)) == z
assert exp(log(y)) == y
@_both_exp_pow
def test_exp_expand():
e = exp(log(Rational(2))*(1 + x) - log(Rational(2))*x)
assert e.expand() == 2
assert exp(x + y) != exp(x)*exp(y)
assert exp(x + y).expand() == exp(x)*exp(y)
@_both_exp_pow
def test_exp__as_base_exp():
assert exp(x).as_base_exp() == (E, x)
assert exp(2*x).as_base_exp() == (E, 2*x)
assert exp(x*y).as_base_exp() == (E, x*y)
assert exp(-x).as_base_exp() == (E, -x)
# Pow( *expr.as_base_exp() ) == expr invariant should hold
assert E**x == exp(x)
assert E**(2*x) == exp(2*x)
assert E**(x*y) == exp(x*y)
assert exp(x).base is S.Exp1
assert exp(x).exp == x
@_both_exp_pow
def test_exp_infinity():
assert exp(I*y) != nan
assert refine(exp(I*oo)) is nan
assert refine(exp(-I*oo)) is nan
assert exp(y*I*oo) != nan
assert exp(zoo) is nan
x = Symbol('x', extended_real=True, finite=False)
assert exp(x).is_complex is None
@_both_exp_pow
def test_exp_subs():
x = Symbol('x')
e = (exp(3*log(x), evaluate=False)) # evaluates to x**3
assert e.subs(x**3, y**3) == e
assert e.subs(x**2, 5) == e
assert (x**3).subs(x**2, y) != y**Rational(3, 2)
assert exp(exp(x) + exp(x**2)).subs(exp(exp(x)), y) == y * exp(exp(x**2))
assert exp(x).subs(E, y) == y**x
x = symbols('x', real=True)
assert exp(5*x).subs(exp(7*x), y) == y**Rational(5, 7)
assert exp(2*x + 7).subs(exp(3*x), y) == y**Rational(2, 3) * exp(7)
x = symbols('x', positive=True)
assert exp(3*log(x)).subs(x**2, y) == y**Rational(3, 2)
# differentiate between E and exp
assert exp(exp(x + E)).subs(exp, 3) == 3**(3**(x + E))
assert exp(exp(x + E)).subs(exp, sin) == sin(sin(x + E))
assert exp(exp(x + E)).subs(E, 3) == 3**(3**(x + 3))
assert exp(3).subs(E, sin) == sin(3)
def test_exp_adjoint():
x = Symbol('x', commutative=False)
assert adjoint(exp(x)) == exp(adjoint(x))
def test_exp_conjugate():
assert conjugate(exp(x)) == exp(conjugate(x))
@_both_exp_pow
def test_exp_transpose():
assert transpose(exp(x)) == exp(transpose(x))
@_both_exp_pow
def test_exp_rewrite():
assert exp(x).rewrite(sin) == sinh(x) + cosh(x)
assert exp(x*I).rewrite(cos) == cos(x) + I*sin(x)
assert exp(1).rewrite(cos) == sinh(1) + cosh(1)
assert exp(1).rewrite(sin) == sinh(1) + cosh(1)
assert exp(1).rewrite(sin) == sinh(1) + cosh(1)
assert exp(x).rewrite(tanh) == (1 + tanh(x/2))/(1 - tanh(x/2))
assert exp(pi*I/4).rewrite(sqrt) == sqrt(2)/2 + sqrt(2)*I/2
assert exp(pi*I/3).rewrite(sqrt) == S.Half + sqrt(3)*I/2
if not global_parameters.exp_is_pow:
assert exp(x*log(y)).rewrite(Pow) == y**x
assert exp(log(x)*log(y)).rewrite(Pow) in [x**log(y), y**log(x)]
assert exp(log(log(x))*y).rewrite(Pow) == log(x)**y
n = Symbol('n', integer=True)
assert Sum((exp(pi*I/2)/2)**n, (n, 0, oo)).rewrite(sqrt).doit() == Rational(4, 5) + I*2/5
assert Sum((exp(pi*I/4)/2)**n, (n, 0, oo)).rewrite(sqrt).doit() == 1/(1 - sqrt(2)*(1 + I)/4)
assert (Sum((exp(pi*I/3)/2)**n, (n, 0, oo)).rewrite(sqrt).doit().cancel()
== 4*I/(sqrt(3) + 3*I))
@_both_exp_pow
def test_exp_leading_term():
assert exp(x).as_leading_term(x) == 1
assert exp(2 + x).as_leading_term(x) == exp(2)
assert exp((2*x + 3) / (x+1)).as_leading_term(x) == exp(3)
# The following tests are commented, since now SymPy returns the
# original function when the leading term in the series expansion does
# not exist.
# raises(NotImplementedError, lambda: exp(1/x).as_leading_term(x))
# raises(NotImplementedError, lambda: exp((x + 1) / x**2).as_leading_term(x))
# raises(NotImplementedError, lambda: exp(x + 1/x).as_leading_term(x))
@_both_exp_pow
def test_exp_taylor_term():
x = symbols('x')
assert exp(x).taylor_term(1, x) == x
assert exp(x).taylor_term(3, x) == x**3/6
assert exp(x).taylor_term(4, x) == x**4/24
assert exp(x).taylor_term(-1, x) is S.Zero
def test_exp_MatrixSymbol():
A = MatrixSymbol("A", 2, 2)
assert exp(A).has(exp)
def test_exp_fdiff():
x = Symbol('x')
raises(ArgumentIndexError, lambda: exp(x).fdiff(2))
def test_log_values():
assert log(nan) is nan
assert log(oo) is oo
assert log(-oo) is oo
assert log(zoo) is zoo
assert log(-zoo) is zoo
assert log(0) is zoo
assert log(1) == 0
assert log(-1) == I*pi
assert log(E) == 1
assert log(-E).expand() == 1 + I*pi
assert unchanged(log, pi)
assert log(-pi).expand() == log(pi) + I*pi
assert unchanged(log, 17)
assert log(-17) == log(17) + I*pi
assert log(I) == I*pi/2
assert log(-I) == -I*pi/2
assert log(17*I) == I*pi/2 + log(17)
assert log(-17*I).expand() == -I*pi/2 + log(17)
assert log(oo*I) is oo
assert log(-oo*I) is oo
assert log(0, 2) is zoo
assert log(0, 5) is zoo
assert exp(-log(3))**(-1) == 3
assert log(S.Half) == -log(2)
assert log(2*3).func is log
assert log(2*3**2).func is log
def test_match_real_imag():
x, y = symbols('x,y', real=True)
i = Symbol('i', imaginary=True)
assert match_real_imag(S.One) == (1, 0)
assert match_real_imag(I) == (0, 1)
assert match_real_imag(3 - 5*I) == (3, -5)
assert match_real_imag(-sqrt(3) + S.Half*I) == (-sqrt(3), S.Half)
assert match_real_imag(x + y*I) == (x, y)
assert match_real_imag(x*I + y*I) == (0, x + y)
assert match_real_imag((x + y)*I) == (0, x + y)
assert match_real_imag(Rational(-2, 3)*i*I) == (None, None)
assert match_real_imag(1 - 2*i) == (None, None)
assert match_real_imag(sqrt(2)*(3 - 5*I)) == (None, None)
def test_log_exact():
# check for pi/2, pi/3, pi/4, pi/6, pi/8, pi/12; pi/5, pi/10:
for n in range(-23, 24):
if gcd(n, 24) != 1:
assert log(exp(n*I*pi/24).rewrite(sqrt)) == n*I*pi/24
for n in range(-9, 10):
assert log(exp(n*I*pi/10).rewrite(sqrt)) == n*I*pi/10
assert log(S.Half - I*sqrt(3)/2) == -I*pi/3
assert log(Rational(-1, 2) + I*sqrt(3)/2) == I*pi*Rational(2, 3)
assert log(-sqrt(2)/2 - I*sqrt(2)/2) == -I*pi*Rational(3, 4)
assert log(-sqrt(3)/2 - I*S.Half) == -I*pi*Rational(5, 6)
assert log(Rational(-1, 4) + sqrt(5)/4 - I*sqrt(sqrt(5)/8 + Rational(5, 8))) == -I*pi*Rational(2, 5)
assert log(sqrt(Rational(5, 8) - sqrt(5)/8) + I*(Rational(1, 4) + sqrt(5)/4)) == I*pi*Rational(3, 10)
assert log(-sqrt(sqrt(2)/4 + S.Half) + I*sqrt(S.Half - sqrt(2)/4)) == I*pi*Rational(7, 8)
assert log(-sqrt(6)/4 - sqrt(2)/4 + I*(-sqrt(6)/4 + sqrt(2)/4)) == -I*pi*Rational(11, 12)
assert log(-1 + I*sqrt(3)) == log(2) + I*pi*Rational(2, 3)
assert log(5 + 5*I) == log(5*sqrt(2)) + I*pi/4
assert log(sqrt(-12)) == log(2*sqrt(3)) + I*pi/2
assert log(-sqrt(6) + sqrt(2) - I*sqrt(6) - I*sqrt(2)) == log(4) - I*pi*Rational(7, 12)
assert log(-sqrt(6-3*sqrt(2)) - I*sqrt(6+3*sqrt(2))) == log(2*sqrt(3)) - I*pi*Rational(5, 8)
assert log(1 + I*sqrt(2-sqrt(2))/sqrt(2+sqrt(2))) == log(2/sqrt(sqrt(2) + 2)) + I*pi/8
assert log(cos(pi*Rational(7, 12)) + I*sin(pi*Rational(7, 12))) == I*pi*Rational(7, 12)
assert log(cos(pi*Rational(6, 5)) + I*sin(pi*Rational(6, 5))) == I*pi*Rational(-4, 5)
assert log(5*(1 + I)/sqrt(2)) == log(5) + I*pi/4
assert log(sqrt(2)*(-sqrt(3) + 1 - sqrt(3)*I - I)) == log(4) - I*pi*Rational(7, 12)
assert log(-sqrt(2)*(1 - I*sqrt(3))) == log(2*sqrt(2)) + I*pi*Rational(2, 3)
assert log(sqrt(3)*I*(-sqrt(6 - 3*sqrt(2)) - I*sqrt(3*sqrt(2) + 6))) == log(6) - I*pi/8
zero = (1 + sqrt(2))**2 - 3 - 2*sqrt(2)
assert log(zero - I*sqrt(3)) == log(sqrt(3)) - I*pi/2
assert unchanged(log, zero + I*zero) or log(zero + zero*I) is zoo
# bail quickly if no obvious simplification is possible:
assert unchanged(log, (sqrt(2)-1/sqrt(sqrt(3)+I))**1000)
# beware of non-real coefficients
assert unchanged(log, sqrt(2-sqrt(5))*(1 + I))
def test_log_base():
assert log(1, 2) == 0
assert log(2, 2) == 1
assert log(3, 2) == log(3)/log(2)
assert log(6, 2) == 1 + log(3)/log(2)
assert log(6, 3) == 1 + log(2)/log(3)
assert log(2**3, 2) == 3
assert log(3**3, 3) == 3
assert log(5, 1) is zoo
assert log(1, 1) is nan
assert log(Rational(2, 3), 10) == log(Rational(2, 3))/log(10)
assert log(Rational(2, 3), Rational(1, 3)) == -log(2)/log(3) + 1
assert log(Rational(2, 3), Rational(2, 5)) == \
log(Rational(2, 3))/log(Rational(2, 5))
# issue 17148
assert log(Rational(8, 3), 2) == -log(3)/log(2) + 3
def test_log_symbolic():
assert log(x, exp(1)) == log(x)
assert log(exp(x)) != x
assert log(x, exp(1)) == log(x)
assert log(x*y) != log(x) + log(y)
assert log(x/y).expand() != log(x) - log(y)
assert log(x/y).expand(force=True) == log(x) - log(y)
assert log(x**y).expand() != y*log(x)
assert log(x**y).expand(force=True) == y*log(x)
assert log(x, 2) == log(x)/log(2)
assert log(E, 2) == 1/log(2)
p, q = symbols('p,q', positive=True)
r = Symbol('r', real=True)
assert log(p**2) != 2*log(p)
assert log(p**2).expand() == 2*log(p)
assert log(x**2).expand() != 2*log(x)
assert log(p**q) != q*log(p)
assert log(exp(p)) == p
assert log(p*q) != log(p) + log(q)
assert log(p*q).expand() == log(p) + log(q)
assert log(-sqrt(3)) == log(sqrt(3)) + I*pi
assert log(-exp(p)) != p + I*pi
assert log(-exp(x)).expand() != x + I*pi
assert log(-exp(r)).expand() == r + I*pi
assert log(x**y) != y*log(x)
assert (log(x**-5)**-1).expand() != -1/log(x)/5
assert (log(p**-5)**-1).expand() == -1/log(p)/5
assert log(-x).func is log and log(-x).args[0] == -x
assert log(-p).func is log and log(-p).args[0] == -p
def test_log_exp():
assert log(exp(4*I*pi)) == 0 # exp evaluates
assert log(exp(-5*I*pi)) == I*pi # exp evaluates
assert log(exp(I*pi*Rational(19, 4))) == I*pi*Rational(3, 4)
assert log(exp(I*pi*Rational(25, 7))) == I*pi*Rational(-3, 7)
assert log(exp(-5*I)) == -5*I + 2*I*pi
@_both_exp_pow
def test_exp_assumptions():
r = Symbol('r', real=True)
i = Symbol('i', imaginary=True)
for e in exp, exp_polar:
assert e(x).is_real is None
assert e(x).is_imaginary is None
assert e(i).is_real is None
assert e(i).is_imaginary is None
assert e(r).is_real is True
assert e(r).is_imaginary is False
assert e(re(x)).is_extended_real is True
assert e(re(x)).is_imaginary is False
assert Pow(E, I*pi, evaluate=False).is_imaginary == False
assert Pow(E, 2*I*pi, evaluate=False).is_imaginary == False
assert Pow(E, I*pi/2, evaluate=False).is_imaginary == True
assert Pow(E, I*pi/3, evaluate=False).is_imaginary is None
assert exp(0, evaluate=False).is_algebraic
a = Symbol('a', algebraic=True)
an = Symbol('an', algebraic=True, nonzero=True)
r = Symbol('r', rational=True)
rn = Symbol('rn', rational=True, nonzero=True)
assert exp(a).is_algebraic is None
assert exp(an).is_algebraic is False
assert exp(pi*r).is_algebraic is None
assert exp(pi*rn).is_algebraic is False
assert exp(0, evaluate=False).is_algebraic is True
assert exp(I*pi/3, evaluate=False).is_algebraic is True
assert exp(I*pi*r, evaluate=False).is_algebraic is True
@_both_exp_pow
def test_exp_AccumBounds():
assert exp(AccumBounds(1, 2)) == AccumBounds(E, E**2)
def test_log_assumptions():
p = symbols('p', positive=True)
n = symbols('n', negative=True)
z = symbols('z', zero=True)
x = symbols('x', infinite=True, extended_positive=True)
assert log(z).is_positive is False
assert log(x).is_extended_positive is True
assert log(2) > 0
assert log(1, evaluate=False).is_zero
assert log(1 + z).is_zero
assert log(p).is_zero is None
assert log(n).is_zero is False
assert log(0.5).is_negative is True
assert log(exp(p) + 1).is_positive
assert log(1, evaluate=False).is_algebraic
assert log(42, evaluate=False).is_algebraic is False
assert log(1 + z).is_rational
def test_log_hashing():
assert x != log(log(x))
assert hash(x) != hash(log(log(x)))
assert log(x) != log(log(log(x)))
e = 1/log(log(x) + log(log(x)))
assert e.base.func is log
e = 1/log(log(x) + log(log(log(x))))
assert e.base.func is log
e = log(log(x))
assert e.func is log
assert x.func is not log
assert hash(log(log(x))) != hash(x)
assert e != x
def test_log_sign():
assert sign(log(2)) == 1
def test_log_expand_complex():
assert log(1 + I).expand(complex=True) == log(2)/2 + I*pi/4
assert log(1 - sqrt(2)).expand(complex=True) == log(sqrt(2) - 1) + I*pi
def test_log_apply_evalf():
value = (log(3)/log(2) - 1).evalf()
assert value.epsilon_eq(Float("0.58496250072115618145373"))
def test_log_leading_term():
p = Symbol('p')
# Test for STEP 3
assert log(1 + x + x**2).as_leading_term(x, cdir=1) == x
# Test for STEP 4
assert log(2*x).as_leading_term(x, cdir=1) == log(x) + log(2)
assert log(2*x).as_leading_term(x, cdir=-1) == log(x) + log(2)
assert log(-2*x).as_leading_term(x, cdir=1, logx=p) == p + log(2) + I*pi
assert log(-2*x).as_leading_term(x, cdir=-1, logx=p) == p + log(2) - I*pi
# Test for STEP 5
assert log(-2*x + (3 - I)*x**2).as_leading_term(x, cdir=1) == log(x) + log(2) - I*pi
assert log(-2*x + (3 - I)*x**2).as_leading_term(x, cdir=-1) == log(x) + log(2) - I*pi
assert log(2*x + (3 - I)*x**2).as_leading_term(x, cdir=1) == log(x) + log(2)
assert log(2*x + (3 - I)*x**2).as_leading_term(x, cdir=-1) == log(x) + log(2) - 2*I*pi
assert log(-1 + x - I*x**2 + I*x**3).as_leading_term(x, cdir=1) == -I*pi
assert log(-1 + x - I*x**2 + I*x**3).as_leading_term(x, cdir=-1) == -I*pi
assert log(-1/(1 - x)).as_leading_term(x, cdir=1) == I*pi
assert log(-1/(1 - x)).as_leading_term(x, cdir=-1) == I*pi
def test_log_nseries():
p = Symbol('p')
assert log(1/x)._eval_nseries(x, 4, logx=-p, cdir=1) == p
assert log(1/x)._eval_nseries(x, 4, logx=-p, cdir=-1) == p + 2*I*pi
assert log(x - 1)._eval_nseries(x, 4, None, I) == I*pi - x - x**2/2 - x**3/3 + O(x**4)
assert log(x - 1)._eval_nseries(x, 4, None, -I) == -I*pi - x - x**2/2 - x**3/3 + O(x**4)
assert log(I*x + I*x**3 - 1)._eval_nseries(x, 3, None, 1) == I*pi - I*x + x**2/2 + O(x**3)
assert log(I*x + I*x**3 - 1)._eval_nseries(x, 3, None, -1) == -I*pi - I*x + x**2/2 + O(x**3)
assert log(I*x**2 + I*x**3 - 1)._eval_nseries(x, 3, None, 1) == I*pi - I*x**2 + O(x**3)
assert log(I*x**2 + I*x**3 - 1)._eval_nseries(x, 3, None, -1) == I*pi - I*x**2 + O(x**3)
assert log(2*x + (3 - I)*x**2)._eval_nseries(x, 3, None, 1) == log(2) + log(x) + \
x*(S(3)/2 - I/2) + x**2*(-1 + 3*I/4) + O(x**3)
assert log(2*x + (3 - I)*x**2)._eval_nseries(x, 3, None, -1) == -2*I*pi + log(2) + \
log(x) - x*(-S(3)/2 + I/2) + x**2*(-1 + 3*I/4) + O(x**3)
assert log(-2*x + (3 - I)*x**2)._eval_nseries(x, 3, None, 1) == -I*pi + log(2) + log(x) + \
x*(-S(3)/2 + I/2) + x**2*(-1 + 3*I/4) + O(x**3)
assert log(-2*x + (3 - I)*x**2)._eval_nseries(x, 3, None, -1) == -I*pi + log(2) + log(x) - \
x*(S(3)/2 - I/2) + x**2*(-1 + 3*I/4) + O(x**3)
assert log(sqrt(-I*x**2 - 3)*sqrt(-I*x**2 - 1) - 2)._eval_nseries(x, 3, None, 1) == -I*pi + \
log(sqrt(3) + 2) + 2*sqrt(3)*I*x**2/(3*sqrt(3) + 6) + O(x**3)
assert log(-1/(1 - x))._eval_nseries(x, 3, None, 1) == I*pi + x + x**2/2 + O(x**3)
assert log(-1/(1 - x))._eval_nseries(x, 3, None, -1) == I*pi + x + x**2/2 + O(x**3)
def test_log_series():
# Note Series at infinities other than oo/-oo were introduced as a part of
# pull request 23798. Refer https://github.com/sympy/sympy/pull/23798 for
# more information.
expr1 = log(1 + x)
expr2 = log(x + sqrt(x**2 + 1))
assert expr1.series(x, x0=I*oo, n=4) == 1/(3*x**3) - 1/(2*x**2) + 1/x + \
I*pi/2 - log(I/x) + O(x**(-4), (x, oo*I))
assert expr1.series(x, x0=-I*oo, n=4) == 1/(3*x**3) - 1/(2*x**2) + 1/x - \
I*pi/2 - log(-I/x) + O(x**(-4), (x, -oo*I))
assert expr2.series(x, x0=I*oo, n=4) == 1/(4*x**2) + I*pi/2 + log(2) - \
log(I/x) + O(x**(-4), (x, oo*I))
assert expr2.series(x, x0=-I*oo, n=4) == -1/(4*x**2) - I*pi/2 - log(2) + \
log(-I/x) + O(x**(-4), (x, -oo*I))
def test_log_expand():
w = Symbol("w", positive=True)
e = log(w**(log(5)/log(3)))
assert e.expand() == log(5)/log(3) * log(w)
x, y, z = symbols('x,y,z', positive=True)
assert log(x*(y + z)).expand(mul=False) == log(x) + log(y + z)
assert log(log(x**2)*log(y*z)).expand() in [log(2*log(x)*log(y) +
2*log(x)*log(z)), log(log(x)*log(z) + log(y)*log(x)) + log(2),
log((log(y) + log(z))*log(x)) + log(2)]
assert log(x**log(x**2)).expand(deep=False) == log(x)*log(x**2)
assert log(x**log(x**2)).expand() == 2*log(x)**2
x, y = symbols('x,y')
assert log(x*y).expand(force=True) == log(x) + log(y)
assert log(x**y).expand(force=True) == y*log(x)
assert log(exp(x)).expand(force=True) == x
# there's generally no need to expand out logs since this requires
# factoring and if simplification is sought, it's cheaper to put
# logs together than it is to take them apart.
assert log(2*3**2).expand() != 2*log(3) + log(2)
@XFAIL
def test_log_expand_fail():
x, y, z = symbols('x,y,z', positive=True)
assert (log(x*(y + z))*(x + y)).expand(mul=True, log=True) == y*log(
x) + y*log(y + z) + z*log(x) + z*log(y + z)
def test_log_simplify():
x = Symbol("x", positive=True)
assert log(x**2).expand() == 2*log(x)
assert expand_log(log(x**(2 + log(2)))) == (2 + log(2))*log(x)
z = Symbol('z')
assert log(sqrt(z)).expand() == log(z)/2
assert expand_log(log(z**(log(2) - 1))) == (log(2) - 1)*log(z)
assert log(z**(-1)).expand() != -log(z)
assert log(z**(x/(x+1))).expand() == x*log(z)/(x + 1)
def test_log_AccumBounds():
assert log(AccumBounds(1, E)) == AccumBounds(0, 1)
assert log(AccumBounds(0, E)) == AccumBounds(-oo, 1)
assert log(AccumBounds(-1, E)) == S.NaN
assert log(AccumBounds(0, oo)) == AccumBounds(-oo, oo)
assert log(AccumBounds(-oo, 0)) == S.NaN
assert log(AccumBounds(-oo, oo)) == S.NaN
@_both_exp_pow
def test_lambertw():
k = Symbol('k')
assert LambertW(x, 0) == LambertW(x)
assert LambertW(x, 0, evaluate=False) != LambertW(x)
assert LambertW(0) == 0
assert LambertW(E) == 1
assert LambertW(-1/E) == -1
assert LambertW(-log(2)/2) == -log(2)
assert LambertW(oo) is oo
assert LambertW(0, 1) is -oo
assert LambertW(0, 42) is -oo
assert LambertW(-pi/2, -1) == -I*pi/2
assert LambertW(-1/E, -1) == -1
assert LambertW(-2*exp(-2), -1) == -2
assert LambertW(2*log(2)) == log(2)
assert LambertW(-pi/2) == I*pi/2
assert LambertW(exp(1 + E)) == E
assert LambertW(x**2).diff(x) == 2*LambertW(x**2)/x/(1 + LambertW(x**2))
assert LambertW(x, k).diff(x) == LambertW(x, k)/x/(1 + LambertW(x, k))
assert LambertW(sqrt(2)).evalf(30).epsilon_eq(
Float("0.701338383413663009202120278965", 30), 1e-29)
assert re(LambertW(2, -1)).evalf().epsilon_eq(Float("-0.834310366631110"))
assert LambertW(-1).is_real is False # issue 5215
assert LambertW(2, evaluate=False).is_real
p = Symbol('p', positive=True)
assert LambertW(p, evaluate=False).is_real
assert LambertW(p - 1, evaluate=False).is_real is None
assert LambertW(-p - 2/S.Exp1, evaluate=False).is_real is False
assert LambertW(S.Half, -1, evaluate=False).is_real is False
assert LambertW(Rational(-1, 10), -1, evaluate=False).is_real
assert LambertW(-10, -1, evaluate=False).is_real is False
assert LambertW(-2, 2, evaluate=False).is_real is False
assert LambertW(0, evaluate=False).is_algebraic
na = Symbol('na', nonzero=True, algebraic=True)
assert LambertW(na).is_algebraic is False
assert LambertW(p).is_zero is False
n = Symbol('n', negative=True)
assert LambertW(n).is_zero is False
def test_issue_5673():
e = LambertW(-1)
assert e.is_comparable is False
assert e.is_positive is not True
e2 = 1 - 1/(1 - exp(-1000))
assert e2.is_positive is not True
e3 = -2 + exp(exp(LambertW(log(2)))*LambertW(log(2)))
assert e3.is_nonzero is not True
def test_log_fdiff():
x = Symbol('x')
raises(ArgumentIndexError, lambda: log(x).fdiff(2))
def test_log_taylor_term():
x = symbols('x')
assert log(x).taylor_term(0, x) == x
assert log(x).taylor_term(1, x) == -x**2/2
assert log(x).taylor_term(4, x) == x**5/5
assert log(x).taylor_term(-1, x) is S.Zero
def test_exp_expand_NC():
A, B, C = symbols('A,B,C', commutative=False)
assert exp(A + B).expand() == exp(A + B)
assert exp(A + B + C).expand() == exp(A + B + C)
assert exp(x + y).expand() == exp(x)*exp(y)
assert exp(x + y + z).expand() == exp(x)*exp(y)*exp(z)
@_both_exp_pow
def test_as_numer_denom():
n = symbols('n', negative=True)
assert exp(x).as_numer_denom() == (exp(x), 1)
assert exp(-x).as_numer_denom() == (1, exp(x))
assert exp(-2*x).as_numer_denom() == (1, exp(2*x))
assert exp(-2).as_numer_denom() == (1, exp(2))
assert exp(n).as_numer_denom() == (1, exp(-n))
assert exp(-n).as_numer_denom() == (exp(-n), 1)
assert exp(-I*x).as_numer_denom() == (1, exp(I*x))
assert exp(-I*n).as_numer_denom() == (1, exp(I*n))
assert exp(-n).as_numer_denom() == (exp(-n), 1)
# Check noncommutativity
a = symbols('a', commutative=False)
assert exp(-a).as_numer_denom() == (exp(-a), 1)
@_both_exp_pow
def test_polar():
x, y = symbols('x y', polar=True)
assert abs(exp_polar(I*4)) == 1
assert abs(exp_polar(0)) == 1
assert abs(exp_polar(2 + 3*I)) == exp(2)
assert exp_polar(I*10).n() == exp_polar(I*10)
assert log(exp_polar(z)) == z
assert log(x*y).expand() == log(x) + log(y)
assert log(x**z).expand() == z*log(x)
assert exp_polar(3).exp == 3
# Compare exp(1.0*pi*I).
assert (exp_polar(1.0*pi*I).n(n=5)).as_real_imag()[1] >= 0
assert exp_polar(0).is_rational is True # issue 8008
def test_exp_summation():
w = symbols("w")
m, n, i, j = symbols("m n i j")
expr = exp(Sum(w*i, (i, 0, n), (j, 0, m)))
assert expr.expand() == Product(exp(w*i), (i, 0, n), (j, 0, m))
def test_log_product():
from sympy.abc import n, m
i, j = symbols('i,j', positive=True, integer=True)
x, y = symbols('x,y', positive=True)
z = symbols('z', real=True)
w = symbols('w')
expr = log(Product(x**i, (i, 1, n)))
assert simplify(expr) == expr
assert expr.expand() == Sum(i*log(x), (i, 1, n))
expr = log(Product(x**i*y**j, (i, 1, n), (j, 1, m)))
assert simplify(expr) == expr
assert expr.expand() == Sum(i*log(x) + j*log(y), (i, 1, n), (j, 1, m))
expr = log(Product(-2, (n, 0, 4)))
assert simplify(expr) == expr
assert expr.expand() == expr
assert expr.expand(force=True) == Sum(log(-2), (n, 0, 4))
expr = log(Product(exp(z*i), (i, 0, n)))
assert expr.expand() == Sum(z*i, (i, 0, n))
expr = log(Product(exp(w*i), (i, 0, n)))
assert expr.expand() == expr
assert expr.expand(force=True) == Sum(w*i, (i, 0, n))
expr = log(Product(i**2*abs(j), (i, 1, n), (j, 1, m)))
assert expr.expand() == Sum(2*log(i) + log(j), (i, 1, n), (j, 1, m))
@XFAIL
def test_log_product_simplify_to_sum():
from sympy.abc import n, m
i, j = symbols('i,j', positive=True, integer=True)
x, y = symbols('x,y', positive=True)
assert simplify(log(Product(x**i, (i, 1, n)))) == Sum(i*log(x), (i, 1, n))
assert simplify(log(Product(x**i*y**j, (i, 1, n), (j, 1, m)))) == \
Sum(i*log(x) + j*log(y), (i, 1, n), (j, 1, m))
def test_issue_8866():
assert simplify(log(x, 10, evaluate=False)) == simplify(log(x, 10))
assert expand_log(log(x, 10, evaluate=False)) == expand_log(log(x, 10))
y = Symbol('y', positive=True)
l1 = log(exp(y), exp(10))
b1 = log(exp(y), exp(5))
l2 = log(exp(y), exp(10), evaluate=False)
b2 = log(exp(y), exp(5), evaluate=False)
assert simplify(log(l1, b1)) == simplify(log(l2, b2))
assert expand_log(log(l1, b1)) == expand_log(log(l2, b2))
def test_log_expand_factor():
assert (log(18)/log(3) - 2).expand(factor=True) == log(2)/log(3)
assert (log(12)/log(2)).expand(factor=True) == log(3)/log(2) + 2
assert (log(15)/log(3)).expand(factor=True) == 1 + log(5)/log(3)
assert (log(2)/(-log(12) + log(24))).expand(factor=True) == 1
assert expand_log(log(12), factor=True) == log(3) + 2*log(2)
assert expand_log(log(21)/log(7), factor=False) == log(3)/log(7) + 1
assert expand_log(log(45)/log(5) + log(20), factor=False) == \
1 + 2*log(3)/log(5) + log(20)
assert expand_log(log(45)/log(5) + log(26), factor=True) == \
log(2) + log(13) + (log(5) + 2*log(3))/log(5)
def test_issue_9116():
n = Symbol('n', positive=True, integer=True)
assert log(n).is_nonnegative is True
def test_issue_18473():
assert exp(x*log(cos(1/x))).as_leading_term(x) == S.NaN
assert exp(x*log(tan(1/x))).as_leading_term(x) == S.NaN
assert log(cos(1/x)).as_leading_term(x) == S.NaN
assert log(tan(1/x)).as_leading_term(x) == S.NaN
assert log(cos(1/x) + 2).as_leading_term(x) == AccumBounds(0, log(3))
assert exp(x*log(cos(1/x) + 2)).as_leading_term(x) == 1
assert log(cos(1/x) - 2).as_leading_term(x) == S.NaN
assert exp(x*log(cos(1/x) - 2)).as_leading_term(x) == S.NaN
assert log(cos(1/x) + 1).as_leading_term(x) == AccumBounds(-oo, log(2))
assert exp(x*log(cos(1/x) + 1)).as_leading_term(x) == AccumBounds(0, 1)
assert log(sin(1/x)**2).as_leading_term(x) == AccumBounds(-oo, 0)
assert exp(x*log(sin(1/x)**2)).as_leading_term(x) == AccumBounds(0, 1)
assert log(tan(1/x)**2).as_leading_term(x) == AccumBounds(-oo, oo)
assert exp(2*x*(log(tan(1/x)**2))).as_leading_term(x) == AccumBounds(0, oo)
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from sympy.calculus.accumulationbounds import AccumBounds
from sympy.core.numbers import (E, Float, I, Rational, Integer, nan, oo, pi, zoo)
from sympy.core.relational import (Eq, Ge, Gt, Le, Lt, Ne)
from sympy.core.singleton import S
from sympy.core.symbol import (Symbol, symbols)
from sympy.functions.combinatorial.factorials import factorial
from sympy.functions.elementary.exponential import (exp, log)
from sympy.functions.elementary.integers import (ceiling, floor, frac)
from sympy.functions.elementary.miscellaneous import sqrt
from sympy.functions.elementary.trigonometric import sin, cos, tan, asin
from sympy.polys.rootoftools import RootOf, CRootOf
from sympy import Integers
from sympy.sets.sets import Interval
from sympy.sets.fancysets import ImageSet
from sympy.core.function import Lambda
from sympy.core.expr import unchanged
from sympy.testing.pytest import XFAIL, raises
x = Symbol('x')
i = Symbol('i', imaginary=True)
y = Symbol('y', real=True)
k, n = symbols('k,n', integer=True)
b = Symbol('b', real=True, noninteger=True)
m = Symbol('m', positive=True)
def test_floor():
assert floor(nan) is nan
assert floor(oo) is oo
assert floor(-oo) is -oo
assert floor(zoo) is zoo
assert floor(0) == 0
assert floor(1) == 1
assert floor(-1) == -1
assert floor(I*log(asin(5)/abs(asin(5)))) == 0
assert floor(-I*log(asin(7)/abs(asin(7)))) == -2
assert floor(E) == 2
assert floor(-E) == -3
assert floor(2*E) == 5
assert floor(-2*E) == -6
assert floor(pi) == 3
assert floor(-pi) == -4
assert floor(S.Half) == 0
assert floor(Rational(-1, 2)) == -1
assert floor(Rational(7, 3)) == 2
assert floor(Rational(-7, 3)) == -3
assert floor(-Rational(7, 3)) == -3
assert floor(Float(17.0)) == 17
assert floor(-Float(17.0)) == -17
assert floor(Float(7.69)) == 7
assert floor(-Float(7.69)) == -8
assert floor(1/(m+1)) == S.Zero
assert floor((m+2)/(m+1)) == S.One
assert floor(-1/(m+1)) == S.NegativeOne
assert floor((m+2)/(-m-1)) == Integer(-2)
assert floor(I) == I
assert floor(-I) == -I
e = floor(i)
assert e.func is floor and e.args[0] == i
assert floor(oo*I) == oo*I
assert floor(-oo*I) == -oo*I
assert floor(exp(I*pi/4)*oo) == exp(I*pi/4)*oo
assert floor(2*I) == 2*I
assert floor(-2*I) == -2*I
assert floor(I/2) == 0
assert floor(-I/2) == -I
assert floor(E + 17) == 19
assert floor(pi + 2) == 5
assert floor(E + pi) == 5
assert floor(I + pi) == 3 + I
assert floor(floor(pi)) == 3
assert floor(floor(y)) == floor(y)
assert floor(floor(x)) == floor(x)
assert unchanged(floor, x)
assert unchanged(floor, 2*x)
assert unchanged(floor, k*x)
assert floor(k) == k
assert floor(2*k) == 2*k
assert floor(k*n) == k*n
assert unchanged(floor, k/2)
assert unchanged(floor, x + y)
assert floor(x + 3) == floor(x) + 3
assert floor(x + k) == floor(x) + k
assert floor(y + 3) == floor(y) + 3
assert floor(y + k) == floor(y) + k
assert floor(3 + I*y + pi) == 6 + floor(y)*I
assert floor(k + n) == k + n
assert unchanged(floor, x*I)
assert floor(k*I) == k*I
assert floor(Rational(23, 10) - E*I) == 2 - 3*I
assert floor(sin(1)) == 0
assert floor(sin(-1)) == -1
assert floor(exp(2)) == 7
assert floor(log(8)/log(2)) != 2
assert int(floor(log(8)/log(2)).evalf(chop=True)) == 3
assert floor(factorial(50)/exp(1)) == \
11188719610782480504630258070757734324011354208865721592720336800
assert (floor(y) < y).is_Relational
assert (floor(y) <= y) == True
assert (floor(y) > y) == False
assert (floor(y) >= y).is_Relational
assert (floor(x) <= x).is_Relational # x could be non-real
assert (floor(x) > x).is_Relational
assert (floor(x) <= y).is_Relational # arg is not same as rhs
assert (floor(x) > y).is_Relational
assert (floor(y) <= oo) == True
assert (floor(y) < oo) == True
assert (floor(y) >= -oo) == True
assert (floor(y) > -oo) == True
assert (floor(b) < b) == True
assert (floor(b) <= b) == True
assert (floor(b) > b) == False
assert (floor(b) >= b) == False
assert floor(y).rewrite(frac) == y - frac(y)
assert floor(y).rewrite(ceiling) == -ceiling(-y)
assert floor(y).rewrite(frac).subs(y, -pi) == floor(-pi)
assert floor(y).rewrite(frac).subs(y, E) == floor(E)
assert floor(y).rewrite(ceiling).subs(y, E) == -ceiling(-E)
assert floor(y).rewrite(ceiling).subs(y, -pi) == -ceiling(pi)
assert Eq(floor(y), y - frac(y))
assert Eq(floor(y), -ceiling(-y))
neg = Symbol('neg', negative=True)
nn = Symbol('nn', nonnegative=True)
pos = Symbol('pos', positive=True)
np = Symbol('np', nonpositive=True)
assert (floor(neg) < 0) == True
assert (floor(neg) <= 0) == True
assert (floor(neg) > 0) == False
assert (floor(neg) >= 0) == False
assert (floor(neg) <= -1) == True
assert (floor(neg) >= -3) == (neg >= -3)
assert (floor(neg) < 5) == (neg < 5)
assert (floor(nn) < 0) == False
assert (floor(nn) >= 0) == True
assert (floor(pos) < 0) == False
assert (floor(pos) <= 0) == (pos < 1)
assert (floor(pos) > 0) == (pos >= 1)
assert (floor(pos) >= 0) == True
assert (floor(pos) >= 3) == (pos >= 3)
assert (floor(np) <= 0) == True
assert (floor(np) > 0) == False
assert floor(neg).is_negative == True
assert floor(neg).is_nonnegative == False
assert floor(nn).is_negative == False
assert floor(nn).is_nonnegative == True
assert floor(pos).is_negative == False
assert floor(pos).is_nonnegative == True
assert floor(np).is_negative is None
assert floor(np).is_nonnegative is None
assert (floor(7, evaluate=False) >= 7) == True
assert (floor(7, evaluate=False) > 7) == False
assert (floor(7, evaluate=False) <= 7) == True
assert (floor(7, evaluate=False) < 7) == False
assert (floor(7, evaluate=False) >= 6) == True
assert (floor(7, evaluate=False) > 6) == True
assert (floor(7, evaluate=False) <= 6) == False
assert (floor(7, evaluate=False) < 6) == False
assert (floor(7, evaluate=False) >= 8) == False
assert (floor(7, evaluate=False) > 8) == False
assert (floor(7, evaluate=False) <= 8) == True
assert (floor(7, evaluate=False) < 8) == True
assert (floor(x) <= 5.5) == Le(floor(x), 5.5, evaluate=False)
assert (floor(x) >= -3.2) == Ge(floor(x), -3.2, evaluate=False)
assert (floor(x) < 2.9) == Lt(floor(x), 2.9, evaluate=False)
assert (floor(x) > -1.7) == Gt(floor(x), -1.7, evaluate=False)
assert (floor(y) <= 5.5) == (y < 6)
assert (floor(y) >= -3.2) == (y >= -3)
assert (floor(y) < 2.9) == (y < 3)
assert (floor(y) > -1.7) == (y >= -1)
assert (floor(y) <= n) == (y < n + 1)
assert (floor(y) >= n) == (y >= n)
assert (floor(y) < n) == (y < n)
assert (floor(y) > n) == (y >= n + 1)
assert floor(RootOf(x**3 - 27*x, 2)) == 5
def test_ceiling():
assert ceiling(nan) is nan
assert ceiling(oo) is oo
assert ceiling(-oo) is -oo
assert ceiling(zoo) is zoo
assert ceiling(0) == 0
assert ceiling(1) == 1
assert ceiling(-1) == -1
assert ceiling(I*log(asin(5)/abs(asin(5)))) == 1
assert ceiling(-I*log(asin(7)/abs(asin(7)))) == -1
assert ceiling(E) == 3
assert ceiling(-E) == -2
assert ceiling(2*E) == 6
assert ceiling(-2*E) == -5
assert ceiling(pi) == 4
assert ceiling(-pi) == -3
assert ceiling(S.Half) == 1
assert ceiling(Rational(-1, 2)) == 0
assert ceiling(Rational(7, 3)) == 3
assert ceiling(-Rational(7, 3)) == -2
assert ceiling(Float(17.0)) == 17
assert ceiling(-Float(17.0)) == -17
assert ceiling(Float(7.69)) == 8
assert ceiling(-Float(7.69)) == -7
assert ceiling(1/(m+1)) == S.One
assert ceiling((m+2)/(m+1)) == Integer(2)
assert ceiling(-1/(m+1)) == S.Zero
assert ceiling((m+2)/(-m-1)) == S.NegativeOne
assert ceiling(I) == I
assert ceiling(-I) == -I
e = ceiling(i)
assert e.func is ceiling and e.args[0] == i
assert ceiling(oo*I) == oo*I
assert ceiling(-oo*I) == -oo*I
assert ceiling(exp(I*pi/4)*oo) == exp(I*pi/4)*oo
assert ceiling(2*I) == 2*I
assert ceiling(-2*I) == -2*I
assert ceiling(I/2) == I
assert ceiling(-I/2) == 0
assert ceiling(E + 17) == 20
assert ceiling(pi + 2) == 6
assert ceiling(E + pi) == 6
assert ceiling(I + pi) == I + 4
assert ceiling(ceiling(pi)) == 4
assert ceiling(ceiling(y)) == ceiling(y)
assert ceiling(ceiling(x)) == ceiling(x)
assert unchanged(ceiling, x)
assert unchanged(ceiling, 2*x)
assert unchanged(ceiling, k*x)
assert ceiling(k) == k
assert ceiling(2*k) == 2*k
assert ceiling(k*n) == k*n
assert unchanged(ceiling, k/2)
assert unchanged(ceiling, x + y)
assert ceiling(x + 3) == ceiling(x) + 3
assert ceiling(x + 3.0) == ceiling(x) + 3
assert ceiling(x + 3.0*I) == ceiling(x) + 3*I
assert ceiling(x + k) == ceiling(x) + k
assert ceiling(y + 3) == ceiling(y) + 3
assert ceiling(y + k) == ceiling(y) + k
assert ceiling(3 + pi + y*I) == 7 + ceiling(y)*I
assert ceiling(k + n) == k + n
assert unchanged(ceiling, x*I)
assert ceiling(k*I) == k*I
assert ceiling(Rational(23, 10) - E*I) == 3 - 2*I
assert ceiling(sin(1)) == 1
assert ceiling(sin(-1)) == 0
assert ceiling(exp(2)) == 8
assert ceiling(-log(8)/log(2)) != -2
assert int(ceiling(-log(8)/log(2)).evalf(chop=True)) == -3
assert ceiling(factorial(50)/exp(1)) == \
11188719610782480504630258070757734324011354208865721592720336801
assert (ceiling(y) >= y) == True
assert (ceiling(y) > y).is_Relational
assert (ceiling(y) < y) == False
assert (ceiling(y) <= y).is_Relational
assert (ceiling(x) >= x).is_Relational # x could be non-real
assert (ceiling(x) < x).is_Relational
assert (ceiling(x) >= y).is_Relational # arg is not same as rhs
assert (ceiling(x) < y).is_Relational
assert (ceiling(y) >= -oo) == True
assert (ceiling(y) > -oo) == True
assert (ceiling(y) <= oo) == True
assert (ceiling(y) < oo) == True
assert (ceiling(b) < b) == False
assert (ceiling(b) <= b) == False
assert (ceiling(b) > b) == True
assert (ceiling(b) >= b) == True
assert ceiling(y).rewrite(floor) == -floor(-y)
assert ceiling(y).rewrite(frac) == y + frac(-y)
assert ceiling(y).rewrite(floor).subs(y, -pi) == -floor(pi)
assert ceiling(y).rewrite(floor).subs(y, E) == -floor(-E)
assert ceiling(y).rewrite(frac).subs(y, pi) == ceiling(pi)
assert ceiling(y).rewrite(frac).subs(y, -E) == ceiling(-E)
assert Eq(ceiling(y), y + frac(-y))
assert Eq(ceiling(y), -floor(-y))
neg = Symbol('neg', negative=True)
nn = Symbol('nn', nonnegative=True)
pos = Symbol('pos', positive=True)
np = Symbol('np', nonpositive=True)
assert (ceiling(neg) <= 0) == True
assert (ceiling(neg) < 0) == (neg <= -1)
assert (ceiling(neg) > 0) == False
assert (ceiling(neg) >= 0) == (neg > -1)
assert (ceiling(neg) > -3) == (neg > -3)
assert (ceiling(neg) <= 10) == (neg <= 10)
assert (ceiling(nn) < 0) == False
assert (ceiling(nn) >= 0) == True
assert (ceiling(pos) < 0) == False
assert (ceiling(pos) <= 0) == False
assert (ceiling(pos) > 0) == True
assert (ceiling(pos) >= 0) == True
assert (ceiling(pos) >= 1) == True
assert (ceiling(pos) > 5) == (pos > 5)
assert (ceiling(np) <= 0) == True
assert (ceiling(np) > 0) == False
assert ceiling(neg).is_positive == False
assert ceiling(neg).is_nonpositive == True
assert ceiling(nn).is_positive is None
assert ceiling(nn).is_nonpositive is None
assert ceiling(pos).is_positive == True
assert ceiling(pos).is_nonpositive == False
assert ceiling(np).is_positive == False
assert ceiling(np).is_nonpositive == True
assert (ceiling(7, evaluate=False) >= 7) == True
assert (ceiling(7, evaluate=False) > 7) == False
assert (ceiling(7, evaluate=False) <= 7) == True
assert (ceiling(7, evaluate=False) < 7) == False
assert (ceiling(7, evaluate=False) >= 6) == True
assert (ceiling(7, evaluate=False) > 6) == True
assert (ceiling(7, evaluate=False) <= 6) == False
assert (ceiling(7, evaluate=False) < 6) == False
assert (ceiling(7, evaluate=False) >= 8) == False
assert (ceiling(7, evaluate=False) > 8) == False
assert (ceiling(7, evaluate=False) <= 8) == True
assert (ceiling(7, evaluate=False) < 8) == True
assert (ceiling(x) <= 5.5) == Le(ceiling(x), 5.5, evaluate=False)
assert (ceiling(x) >= -3.2) == Ge(ceiling(x), -3.2, evaluate=False)
assert (ceiling(x) < 2.9) == Lt(ceiling(x), 2.9, evaluate=False)
assert (ceiling(x) > -1.7) == Gt(ceiling(x), -1.7, evaluate=False)
assert (ceiling(y) <= 5.5) == (y <= 5)
assert (ceiling(y) >= -3.2) == (y > -4)
assert (ceiling(y) < 2.9) == (y <= 2)
assert (ceiling(y) > -1.7) == (y > -2)
assert (ceiling(y) <= n) == (y <= n)
assert (ceiling(y) >= n) == (y > n - 1)
assert (ceiling(y) < n) == (y <= n - 1)
assert (ceiling(y) > n) == (y > n)
assert ceiling(RootOf(x**3 - 27*x, 2)) == 6
s = ImageSet(Lambda(n, n + (CRootOf(x**5 - x**2 + 1, 0))), Integers)
f = CRootOf(x**5 - x**2 + 1, 0)
s = ImageSet(Lambda(n, n + f), Integers)
assert s.intersect(Interval(-10, 10)) == {i + f for i in range(-9, 11)}
def test_frac():
assert isinstance(frac(x), frac)
assert frac(oo) == AccumBounds(0, 1)
assert frac(-oo) == AccumBounds(0, 1)
assert frac(zoo) is nan
assert frac(n) == 0
assert frac(nan) is nan
assert frac(Rational(4, 3)) == Rational(1, 3)
assert frac(-Rational(4, 3)) == Rational(2, 3)
assert frac(Rational(-4, 3)) == Rational(2, 3)
r = Symbol('r', real=True)
assert frac(I*r) == I*frac(r)
assert frac(1 + I*r) == I*frac(r)
assert frac(0.5 + I*r) == 0.5 + I*frac(r)
assert frac(n + I*r) == I*frac(r)
assert frac(n + I*k) == 0
assert unchanged(frac, x + I*x)
assert frac(x + I*n) == frac(x)
assert frac(x).rewrite(floor) == x - floor(x)
assert frac(x).rewrite(ceiling) == x + ceiling(-x)
assert frac(y).rewrite(floor).subs(y, pi) == frac(pi)
assert frac(y).rewrite(floor).subs(y, -E) == frac(-E)
assert frac(y).rewrite(ceiling).subs(y, -pi) == frac(-pi)
assert frac(y).rewrite(ceiling).subs(y, E) == frac(E)
assert Eq(frac(y), y - floor(y))
assert Eq(frac(y), y + ceiling(-y))
r = Symbol('r', real=True)
p_i = Symbol('p_i', integer=True, positive=True)
n_i = Symbol('p_i', integer=True, negative=True)
np_i = Symbol('np_i', integer=True, nonpositive=True)
nn_i = Symbol('nn_i', integer=True, nonnegative=True)
p_r = Symbol('p_r', positive=True)
n_r = Symbol('n_r', negative=True)
np_r = Symbol('np_r', real=True, nonpositive=True)
nn_r = Symbol('nn_r', real=True, nonnegative=True)
# Real frac argument, integer rhs
assert frac(r) <= p_i
assert not frac(r) <= n_i
assert (frac(r) <= np_i).has(Le)
assert (frac(r) <= nn_i).has(Le)
assert frac(r) < p_i
assert not frac(r) < n_i
assert not frac(r) < np_i
assert (frac(r) < nn_i).has(Lt)
assert not frac(r) >= p_i
assert frac(r) >= n_i
assert frac(r) >= np_i
assert (frac(r) >= nn_i).has(Ge)
assert not frac(r) > p_i
assert frac(r) > n_i
assert (frac(r) > np_i).has(Gt)
assert (frac(r) > nn_i).has(Gt)
assert not Eq(frac(r), p_i)
assert not Eq(frac(r), n_i)
assert Eq(frac(r), np_i).has(Eq)
assert Eq(frac(r), nn_i).has(Eq)
assert Ne(frac(r), p_i)
assert Ne(frac(r), n_i)
assert Ne(frac(r), np_i).has(Ne)
assert Ne(frac(r), nn_i).has(Ne)
# Real frac argument, real rhs
assert (frac(r) <= p_r).has(Le)
assert not frac(r) <= n_r
assert (frac(r) <= np_r).has(Le)
assert (frac(r) <= nn_r).has(Le)
assert (frac(r) < p_r).has(Lt)
assert not frac(r) < n_r
assert not frac(r) < np_r
assert (frac(r) < nn_r).has(Lt)
assert (frac(r) >= p_r).has(Ge)
assert frac(r) >= n_r
assert frac(r) >= np_r
assert (frac(r) >= nn_r).has(Ge)
assert (frac(r) > p_r).has(Gt)
assert frac(r) > n_r
assert (frac(r) > np_r).has(Gt)
assert (frac(r) > nn_r).has(Gt)
assert not Eq(frac(r), n_r)
assert Eq(frac(r), p_r).has(Eq)
assert Eq(frac(r), np_r).has(Eq)
assert Eq(frac(r), nn_r).has(Eq)
assert Ne(frac(r), p_r).has(Ne)
assert Ne(frac(r), n_r)
assert Ne(frac(r), np_r).has(Ne)
assert Ne(frac(r), nn_r).has(Ne)
# Real frac argument, +/- oo rhs
assert frac(r) < oo
assert frac(r) <= oo
assert not frac(r) > oo
assert not frac(r) >= oo
assert not frac(r) < -oo
assert not frac(r) <= -oo
assert frac(r) > -oo
assert frac(r) >= -oo
assert frac(r) < 1
assert frac(r) <= 1
assert not frac(r) > 1
assert not frac(r) >= 1
assert not frac(r) < 0
assert (frac(r) <= 0).has(Le)
assert (frac(r) > 0).has(Gt)
assert frac(r) >= 0
# Some test for numbers
assert frac(r) <= sqrt(2)
assert (frac(r) <= sqrt(3) - sqrt(2)).has(Le)
assert not frac(r) <= sqrt(2) - sqrt(3)
assert not frac(r) >= sqrt(2)
assert (frac(r) >= sqrt(3) - sqrt(2)).has(Ge)
assert frac(r) >= sqrt(2) - sqrt(3)
assert not Eq(frac(r), sqrt(2))
assert Eq(frac(r), sqrt(3) - sqrt(2)).has(Eq)
assert not Eq(frac(r), sqrt(2) - sqrt(3))
assert Ne(frac(r), sqrt(2))
assert Ne(frac(r), sqrt(3) - sqrt(2)).has(Ne)
assert Ne(frac(r), sqrt(2) - sqrt(3))
assert frac(p_i, evaluate=False).is_zero
assert frac(p_i, evaluate=False).is_finite
assert frac(p_i, evaluate=False).is_integer
assert frac(p_i, evaluate=False).is_real
assert frac(r).is_finite
assert frac(r).is_real
assert frac(r).is_zero is None
assert frac(r).is_integer is None
assert frac(oo).is_finite
assert frac(oo).is_real
def test_series():
x, y = symbols('x,y')
assert floor(x).nseries(x, y, 100) == floor(y)
assert ceiling(x).nseries(x, y, 100) == ceiling(y)
assert floor(x).nseries(x, pi, 100) == 3
assert ceiling(x).nseries(x, pi, 100) == 4
assert floor(x).nseries(x, 0, 100) == 0
assert ceiling(x).nseries(x, 0, 100) == 1
assert floor(-x).nseries(x, 0, 100) == -1
assert ceiling(-x).nseries(x, 0, 100) == 0
def test_issue_14355():
# This test checks the leading term and series for the floor and ceil
# function when arg0 evaluates to S.NaN.
assert floor((x**3 + x)/(x**2 - x)).as_leading_term(x, cdir = 1) == -2
assert floor((x**3 + x)/(x**2 - x)).as_leading_term(x, cdir = -1) == -1
assert floor((cos(x) - 1)/x).as_leading_term(x, cdir = 1) == -1
assert floor((cos(x) - 1)/x).as_leading_term(x, cdir = -1) == 0
assert floor(sin(x)/x).as_leading_term(x, cdir = 1) == 0
assert floor(sin(x)/x).as_leading_term(x, cdir = -1) == 0
assert floor(-tan(x)/x).as_leading_term(x, cdir = 1) == -2
assert floor(-tan(x)/x).as_leading_term(x, cdir = -1) == -2
assert floor(sin(x)/x/3).as_leading_term(x, cdir = 1) == 0
assert floor(sin(x)/x/3).as_leading_term(x, cdir = -1) == 0
assert ceiling((x**3 + x)/(x**2 - x)).as_leading_term(x, cdir = 1) == -1
assert ceiling((x**3 + x)/(x**2 - x)).as_leading_term(x, cdir = -1) == 0
assert ceiling((cos(x) - 1)/x).as_leading_term(x, cdir = 1) == 0
assert ceiling((cos(x) - 1)/x).as_leading_term(x, cdir = -1) == 1
assert ceiling(sin(x)/x).as_leading_term(x, cdir = 1) == 1
assert ceiling(sin(x)/x).as_leading_term(x, cdir = -1) == 1
assert ceiling(-tan(x)/x).as_leading_term(x, cdir = 1) == -1
assert ceiling(-tan(x)/x).as_leading_term(x, cdir = 1) == -1
assert ceiling(sin(x)/x/3).as_leading_term(x, cdir = 1) == 1
assert ceiling(sin(x)/x/3).as_leading_term(x, cdir = -1) == 1
# test for series
assert floor(sin(x)/x).series(x, 0, 100, cdir = 1) == 0
assert floor(sin(x)/x).series(x, 0, 100, cdir = 1) == 0
assert floor((x**3 + x)/(x**2 - x)).series(x, 0, 100, cdir = 1) == -2
assert floor((x**3 + x)/(x**2 - x)).series(x, 0, 100, cdir = -1) == -1
assert ceiling(sin(x)/x).series(x, 0, 100, cdir = 1) == 1
assert ceiling(sin(x)/x).series(x, 0, 100, cdir = -1) == 1
assert ceiling((x**3 + x)/(x**2 - x)).series(x, 0, 100, cdir = 1) == -1
assert ceiling((x**3 + x)/(x**2 - x)).series(x, 0, 100, cdir = -1) == 0
def test_frac_leading_term():
assert frac(x).as_leading_term(x) == x
assert frac(x).as_leading_term(x, cdir = 1) == x
assert frac(x).as_leading_term(x, cdir = -1) == 1
assert frac(x + S.Half).as_leading_term(x, cdir = 1) == S.Half
assert frac(x + S.Half).as_leading_term(x, cdir = -1) == S.Half
assert frac(-2*x + 1).as_leading_term(x, cdir = 1) == S.One
assert frac(-2*x + 1).as_leading_term(x, cdir = -1) == -2*x
assert frac(sin(x) + 5).as_leading_term(x, cdir = 1) == x
assert frac(sin(x) + 5).as_leading_term(x, cdir = -1) == S.One
assert frac(sin(x**2) + 5).as_leading_term(x, cdir = 1) == x**2
assert frac(sin(x**2) + 5).as_leading_term(x, cdir = -1) == x**2
@XFAIL
def test_issue_4149():
assert floor(3 + pi*I + y*I) == 3 + floor(pi + y)*I
assert floor(3*I + pi*I + y*I) == floor(3 + pi + y)*I
assert floor(3 + E + pi*I + y*I) == 5 + floor(pi + y)*I
def test_issue_21651():
k = Symbol('k', positive=True, integer=True)
exp = 2*2**(-k)
assert isinstance(floor(exp), floor)
def test_issue_11207():
assert floor(floor(x)) == floor(x)
assert floor(ceiling(x)) == ceiling(x)
assert ceiling(floor(x)) == floor(x)
assert ceiling(ceiling(x)) == ceiling(x)
def test_nested_floor_ceiling():
assert floor(-floor(ceiling(x**3)/y)) == -floor(ceiling(x**3)/y)
assert ceiling(-floor(ceiling(x**3)/y)) == -floor(ceiling(x**3)/y)
assert floor(ceiling(-floor(x**Rational(7, 2)/y))) == -floor(x**Rational(7, 2)/y)
assert -ceiling(-ceiling(floor(x)/y)) == ceiling(floor(x)/y)
def test_issue_18689():
assert floor(floor(floor(x)) + 3) == floor(x) + 3
assert ceiling(ceiling(ceiling(x)) + 1) == ceiling(x) + 1
assert ceiling(ceiling(floor(x)) + 3) == floor(x) + 3
def test_issue_18421():
assert floor(float(0)) is S.Zero
assert ceiling(float(0)) is S.Zero
def test_issue_25230():
a = Symbol('a', real = True)
b = Symbol('b', positive = True)
c = Symbol('c', negative = True)
raises(NotImplementedError, lambda: floor(x/a).as_leading_term(x, cdir = 1))
raises(NotImplementedError, lambda: ceiling(x/a).as_leading_term(x, cdir = 1))
assert floor(x/b).as_leading_term(x, cdir = 1) == 0
assert floor(x/b).as_leading_term(x, cdir = -1) == -1
assert floor(x/c).as_leading_term(x, cdir = 1) == -1
assert floor(x/c).as_leading_term(x, cdir = -1) == 0
assert ceiling(x/b).as_leading_term(x, cdir = 1) == 1
assert ceiling(x/b).as_leading_term(x, cdir = -1) == 0
assert ceiling(x/c).as_leading_term(x, cdir = 1) == 0
assert ceiling(x/c).as_leading_term(x, cdir = -1) == 1
venv_piper/lib/python3.12/site-packages/sympy/functions/elementary/tests/test_interface.py
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# This test file tests the SymPy function interface, that people use to create
# their own new functions. It should be as easy as possible.
#
# We test that it works with both Function and DefinedFunction. New code should
# use DefinedFunction because it has better type inference. Old code still
# using Function should continue to work though.
from sympy.core.function import Function, DefinedFunction
from sympy.core.sympify import sympify
from sympy.functions.elementary.hyperbolic import tanh
from sympy.functions.elementary.trigonometric import (cos, sin)
from sympy.series.limits import limit
from sympy.abc import x
def test_function_series1():
"""Create our new "sin" function."""
for F in [Function, DefinedFunction]:
class my_function(F):
def fdiff(self, argindex=1):
return cos(self.args[0])
@classmethod
def eval(cls, arg):
arg = sympify(arg)
if arg == 0:
return sympify(0)
#Test that the taylor series is correct
assert my_function(x).series(x, 0, 10) == sin(x).series(x, 0, 10)
assert limit(my_function(x)/x, x, 0) == 1
def test_function_series2():
"""Create our new "cos" function."""
for F in [Function, DefinedFunction]:
class my_function2(F):
def fdiff(self, argindex=1):
return -sin(self.args[0])
@classmethod
def eval(cls, arg):
arg = sympify(arg)
if arg == 0:
return sympify(1)
#Test that the taylor series is correct
assert my_function2(x).series(x, 0, 10) == cos(x).series(x, 0, 10)
def test_function_series3():
"""
Test our easy "tanh" function.
This test tests two things:
* that the Function interface works as expected and it's easy to use
* that the general algorithm for the series expansion works even when the
derivative is defined recursively in terms of the original function,
since tanh(x).diff(x) == 1-tanh(x)**2
"""
for F in [Function, DefinedFunction]:
class mytanh(F):
def fdiff(self, argindex=1):
return 1 - mytanh(self.args[0])**2
@classmethod
def eval(cls, arg):
arg = sympify(arg)
if arg == 0:
return sympify(0)
e = tanh(x)
f = mytanh(x)
assert e.series(x, 0, 6) == f.series(x, 0, 6)
venv_piper/lib/python3.12/site-packages/sympy/functions/elementary/tests/test_miscellaneous.py
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import itertools as it
from sympy.core.expr import unchanged
from sympy.core.function import Function
from sympy.core.numbers import I, oo, Rational
from sympy.core.power import Pow
from sympy.core.singleton import S
from sympy.core.symbol import Symbol
from sympy.external import import_module
from sympy.functions.elementary.exponential import log
from sympy.functions.elementary.integers import floor, ceiling
from sympy.functions.elementary.miscellaneous import (sqrt, cbrt, root, Min,
Max, real_root, Rem)
from sympy.functions.elementary.trigonometric import cos, sin
from sympy.functions.special.delta_functions import Heaviside
from sympy.utilities.lambdify import lambdify
from sympy.testing.pytest import raises, skip, ignore_warnings
def test_Min():
from sympy.abc import x, y, z
n = Symbol('n', negative=True)
n_ = Symbol('n_', negative=True)
nn = Symbol('nn', nonnegative=True)
nn_ = Symbol('nn_', nonnegative=True)
p = Symbol('p', positive=True)
p_ = Symbol('p_', positive=True)
np = Symbol('np', nonpositive=True)
np_ = Symbol('np_', nonpositive=True)
r = Symbol('r', real=True)
assert Min(5, 4) == 4
assert Min(-oo, -oo) is -oo
assert Min(-oo, n) is -oo
assert Min(n, -oo) is -oo
assert Min(-oo, np) is -oo
assert Min(np, -oo) is -oo
assert Min(-oo, 0) is -oo
assert Min(0, -oo) is -oo
assert Min(-oo, nn) is -oo
assert Min(nn, -oo) is -oo
assert Min(-oo, p) is -oo
assert Min(p, -oo) is -oo
assert Min(-oo, oo) is -oo
assert Min(oo, -oo) is -oo
assert Min(n, n) == n
assert unchanged(Min, n, np)
assert Min(np, n) == Min(n, np)
assert Min(n, 0) == n
assert Min(0, n) == n
assert Min(n, nn) == n
assert Min(nn, n) == n
assert Min(n, p) == n
assert Min(p, n) == n
assert Min(n, oo) == n
assert Min(oo, n) == n
assert Min(np, np) == np
assert Min(np, 0) == np
assert Min(0, np) == np
assert Min(np, nn) == np
assert Min(nn, np) == np
assert Min(np, p) == np
assert Min(p, np) == np
assert Min(np, oo) == np
assert Min(oo, np) == np
assert Min(0, 0) == 0
assert Min(0, nn) == 0
assert Min(nn, 0) == 0
assert Min(0, p) == 0
assert Min(p, 0) == 0
assert Min(0, oo) == 0
assert Min(oo, 0) == 0
assert Min(nn, nn) == nn
assert unchanged(Min, nn, p)
assert Min(p, nn) == Min(nn, p)
assert Min(nn, oo) == nn
assert Min(oo, nn) == nn
assert Min(p, p) == p
assert Min(p, oo) == p
assert Min(oo, p) == p
assert Min(oo, oo) is oo
assert Min(n, n_).func is Min
assert Min(nn, nn_).func is Min
assert Min(np, np_).func is Min
assert Min(p, p_).func is Min
# lists
assert Min() is S.Infinity
assert Min(x) == x
assert Min(x, y) == Min(y, x)
assert Min(x, y, z) == Min(z, y, x)
assert Min(x, Min(y, z)) == Min(z, y, x)
assert Min(x, Max(y, -oo)) == Min(x, y)
assert Min(p, oo, n, p, p, p_) == n
assert Min(p_, n_, p) == n_
assert Min(n, oo, -7, p, p, 2) == Min(n, -7)
assert Min(2, x, p, n, oo, n_, p, 2, -2, -2) == Min(-2, x, n, n_)
assert Min(0, x, 1, y) == Min(0, x, y)
assert Min(1000, 100, -100, x, p, n) == Min(n, x, -100)
assert unchanged(Min, sin(x), cos(x))
assert Min(sin(x), cos(x)) == Min(cos(x), sin(x))
assert Min(cos(x), sin(x)).subs(x, 1) == cos(1)
assert Min(cos(x), sin(x)).subs(x, S.Half) == sin(S.Half)
raises(ValueError, lambda: Min(cos(x), sin(x)).subs(x, I))
raises(ValueError, lambda: Min(I))
raises(ValueError, lambda: Min(I, x))
raises(ValueError, lambda: Min(S.ComplexInfinity, x))
assert Min(1, x).diff(x) == Heaviside(1 - x)
assert Min(x, 1).diff(x) == Heaviside(1 - x)
assert Min(0, -x, 1 - 2*x).diff(x) == -Heaviside(x + Min(0, -2*x + 1)) \
- 2*Heaviside(2*x + Min(0, -x) - 1)
# issue 7619
f = Function('f')
assert Min(1, 2*Min(f(1), 2)) # doesn't fail
# issue 7233
e = Min(0, x)
assert e.n().args == (0, x)
# issue 8643
m = Min(n, p_, n_, r)
assert m.is_positive is False
assert m.is_nonnegative is False
assert m.is_negative is True
m = Min(p, p_)
assert m.is_positive is True
assert m.is_nonnegative is True
assert m.is_negative is False
m = Min(p, nn_, p_)
assert m.is_positive is None
assert m.is_nonnegative is True
assert m.is_negative is False
m = Min(nn, p, r)
assert m.is_positive is None
assert m.is_nonnegative is None
assert m.is_negative is None
def test_Max():
from sympy.abc import x, y, z
n = Symbol('n', negative=True)
n_ = Symbol('n_', negative=True)
nn = Symbol('nn', nonnegative=True)
p = Symbol('p', positive=True)
p_ = Symbol('p_', positive=True)
r = Symbol('r', real=True)
assert Max(5, 4) == 5
# lists
assert Max() is S.NegativeInfinity
assert Max(x) == x
assert Max(x, y) == Max(y, x)
assert Max(x, y, z) == Max(z, y, x)
assert Max(x, Max(y, z)) == Max(z, y, x)
assert Max(x, Min(y, oo)) == Max(x, y)
assert Max(n, -oo, n_, p, 2) == Max(p, 2)
assert Max(n, -oo, n_, p) == p
assert Max(2, x, p, n, -oo, S.NegativeInfinity, n_, p, 2) == Max(2, x, p)
assert Max(0, x, 1, y) == Max(1, x, y)
assert Max(r, r + 1, r - 1) == 1 + r
assert Max(1000, 100, -100, x, p, n) == Max(p, x, 1000)
assert Max(cos(x), sin(x)) == Max(sin(x), cos(x))
assert Max(cos(x), sin(x)).subs(x, 1) == sin(1)
assert Max(cos(x), sin(x)).subs(x, S.Half) == cos(S.Half)
raises(ValueError, lambda: Max(cos(x), sin(x)).subs(x, I))
raises(ValueError, lambda: Max(I))
raises(ValueError, lambda: Max(I, x))
raises(ValueError, lambda: Max(S.ComplexInfinity, 1))
assert Max(n, -oo, n_, p, 2) == Max(p, 2)
assert Max(n, -oo, n_, p, 1000) == Max(p, 1000)
assert Max(1, x).diff(x) == Heaviside(x - 1)
assert Max(x, 1).diff(x) == Heaviside(x - 1)
assert Max(x**2, 1 + x, 1).diff(x) == \
2*x*Heaviside(x**2 - Max(1, x + 1)) \
+ Heaviside(x - Max(1, x**2) + 1)
e = Max(0, x)
assert e.n().args == (0, x)
# issue 8643
m = Max(p, p_, n, r)
assert m.is_positive is True
assert m.is_nonnegative is True
assert m.is_negative is False
m = Max(n, n_)
assert m.is_positive is False
assert m.is_nonnegative is False
assert m.is_negative is True
m = Max(n, n_, r)
assert m.is_positive is None
assert m.is_nonnegative is None
assert m.is_negative is None
m = Max(n, nn, r)
assert m.is_positive is None
assert m.is_nonnegative is True
assert m.is_negative is False
def test_minmax_assumptions():
r = Symbol('r', real=True)
a = Symbol('a', real=True, algebraic=True)
t = Symbol('t', real=True, transcendental=True)
q = Symbol('q', rational=True)
p = Symbol('p', irrational=True)
n = Symbol('n', rational=True, integer=False)
i = Symbol('i', integer=True)
o = Symbol('o', odd=True)
e = Symbol('e', even=True)
k = Symbol('k', prime=True)
reals = [r, a, t, q, p, n, i, o, e, k]
for ext in (Max, Min):
for x, y in it.product(reals, repeat=2):
# Must be real
assert ext(x, y).is_real
# Algebraic?
if x.is_algebraic and y.is_algebraic:
assert ext(x, y).is_algebraic
elif x.is_transcendental and y.is_transcendental:
assert ext(x, y).is_transcendental
else:
assert ext(x, y).is_algebraic is None
# Rational?
if x.is_rational and y.is_rational:
assert ext(x, y).is_rational
elif x.is_irrational and y.is_irrational:
assert ext(x, y).is_irrational
else:
assert ext(x, y).is_rational is None
# Integer?
if x.is_integer and y.is_integer:
assert ext(x, y).is_integer
elif x.is_noninteger and y.is_noninteger:
assert ext(x, y).is_noninteger
else:
assert ext(x, y).is_integer is None
# Odd?
if x.is_odd and y.is_odd:
assert ext(x, y).is_odd
elif x.is_odd is False and y.is_odd is False:
assert ext(x, y).is_odd is False
else:
assert ext(x, y).is_odd is None
# Even?
if x.is_even and y.is_even:
assert ext(x, y).is_even
elif x.is_even is False and y.is_even is False:
assert ext(x, y).is_even is False
else:
assert ext(x, y).is_even is None
# Prime?
if x.is_prime and y.is_prime:
assert ext(x, y).is_prime
elif x.is_prime is False and y.is_prime is False:
assert ext(x, y).is_prime is False
else:
assert ext(x, y).is_prime is None
def test_issue_8413():
x = Symbol('x', real=True)
# we can't evaluate in general because non-reals are not
# comparable: Min(floor(3.2 + I), 3.2 + I) -> ValueError
assert Min(floor(x), x) == floor(x)
assert Min(ceiling(x), x) == x
assert Max(floor(x), x) == x
assert Max(ceiling(x), x) == ceiling(x)
def test_root():
from sympy.abc import x
n = Symbol('n', integer=True)
k = Symbol('k', integer=True)
assert root(2, 2) == sqrt(2)
assert root(2, 1) == 2
assert root(2, 3) == 2**Rational(1, 3)
assert root(2, 3) == cbrt(2)
assert root(2, -5) == 2**Rational(4, 5)/2
assert root(-2, 1) == -2
assert root(-2, 2) == sqrt(2)*I
assert root(-2, 1) == -2
assert root(x, 2) == sqrt(x)
assert root(x, 1) == x
assert root(x, 3) == x**Rational(1, 3)
assert root(x, 3) == cbrt(x)
assert root(x, -5) == x**Rational(-1, 5)
assert root(x, n) == x**(1/n)
assert root(x, -n) == x**(-1/n)
assert root(x, n, k) == (-1)**(2*k/n)*x**(1/n)
def test_real_root():
assert real_root(-8, 3) == -2
assert real_root(-16, 4) == root(-16, 4)
r = root(-7, 4)
assert real_root(r) == r
r1 = root(-1, 3)
r2 = r1**2
r3 = root(-1, 4)
assert real_root(r1 + r2 + r3) == -1 + r2 + r3
assert real_root(root(-2, 3)) == -root(2, 3)
assert real_root(-8., 3) == -2.0
x = Symbol('x')
n = Symbol('n')
g = real_root(x, n)
assert g.subs({"x": -8, "n": 3}) == -2
assert g.subs({"x": 8, "n": 3}) == 2
# give principle root if there is no real root -- if this is not desired
# then maybe a Root class is needed to raise an error instead
assert g.subs({"x": I, "n": 3}) == cbrt(I)
assert g.subs({"x": -8, "n": 2}) == sqrt(-8)
assert g.subs({"x": I, "n": 2}) == sqrt(I)
def test_issue_11463():
numpy = import_module('numpy')
if not numpy:
skip("numpy not installed.")
x = Symbol('x')
f = lambdify(x, real_root((log(x/(x-2))), 3), 'numpy')
# numpy.select evaluates all options before considering conditions,
# so it raises a warning about root of negative number which does
# not affect the outcome. This warning is suppressed here
with ignore_warnings(RuntimeWarning):
assert f(numpy.array(-1)) < -1
def test_rewrite_MaxMin_as_Heaviside():
from sympy.abc import x
assert Max(0, x).rewrite(Heaviside) == x*Heaviside(x)
assert Max(3, x).rewrite(Heaviside) == x*Heaviside(x - 3) + \
3*Heaviside(-x + 3)
assert Max(0, x+2, 2*x).rewrite(Heaviside) == \
2*x*Heaviside(2*x)*Heaviside(x - 2) + \
(x + 2)*Heaviside(-x + 2)*Heaviside(x + 2)
assert Min(0, x).rewrite(Heaviside) == x*Heaviside(-x)
assert Min(3, x).rewrite(Heaviside) == x*Heaviside(-x + 3) + \
3*Heaviside(x - 3)
assert Min(x, -x, -2).rewrite(Heaviside) == \
x*Heaviside(-2*x)*Heaviside(-x - 2) - \
x*Heaviside(2*x)*Heaviside(x - 2) \
- 2*Heaviside(-x + 2)*Heaviside(x + 2)
def test_rewrite_MaxMin_as_Piecewise():
from sympy.core.symbol import symbols
from sympy.functions.elementary.piecewise import Piecewise
x, y, z, a, b = symbols('x y z a b', real=True)
vx, vy, va = symbols('vx vy va')
assert Max(a, b).rewrite(Piecewise) == Piecewise((a, a >= b), (b, True))
assert Max(x, y, z).rewrite(Piecewise) == Piecewise((x, (x >= y) & (x >= z)), (y, y >= z), (z, True))
assert Max(x, y, a, b).rewrite(Piecewise) == Piecewise((a, (a >= b) & (a >= x) & (a >= y)),
(b, (b >= x) & (b >= y)), (x, x >= y), (y, True))
assert Min(a, b).rewrite(Piecewise) == Piecewise((a, a <= b), (b, True))
assert Min(x, y, z).rewrite(Piecewise) == Piecewise((x, (x <= y) & (x <= z)), (y, y <= z), (z, True))
assert Min(x, y, a, b).rewrite(Piecewise) == Piecewise((a, (a <= b) & (a <= x) & (a <= y)),
(b, (b <= x) & (b <= y)), (x, x <= y), (y, True))
# Piecewise rewriting of Min/Max does also takes place for not explicitly real arguments
assert Max(vx, vy).rewrite(Piecewise) == Piecewise((vx, vx >= vy), (vy, True))
assert Min(va, vx, vy).rewrite(Piecewise) == Piecewise((va, (va <= vx) & (va <= vy)), (vx, vx <= vy), (vy, True))
def test_issue_11099():
from sympy.abc import x, y
# some fixed value tests
fixed_test_data = {x: -2, y: 3}
assert Min(x, y).evalf(subs=fixed_test_data) == \
Min(x, y).subs(fixed_test_data).evalf()
assert Max(x, y).evalf(subs=fixed_test_data) == \
Max(x, y).subs(fixed_test_data).evalf()
# randomly generate some test data
from sympy.core.random import randint
for i in range(20):
random_test_data = {x: randint(-100, 100), y: randint(-100, 100)}
assert Min(x, y).evalf(subs=random_test_data) == \
Min(x, y).subs(random_test_data).evalf()
assert Max(x, y).evalf(subs=random_test_data) == \
Max(x, y).subs(random_test_data).evalf()
def test_issue_12638():
from sympy.abc import a, b, c
assert Min(a, b, c, Max(a, b)) == Min(a, b, c)
assert Min(a, b, Max(a, b, c)) == Min(a, b)
assert Min(a, b, Max(a, c)) == Min(a, b)
def test_issue_21399():
from sympy.abc import a, b, c
assert Max(Min(a, b), Min(a, b, c)) == Min(a, b)
def test_instantiation_evaluation():
from sympy.abc import v, w, x, y, z
assert Min(1, Max(2, x)) == 1
assert Max(3, Min(2, x)) == 3
assert Min(Max(x, y), Max(x, z)) == Max(x, Min(y, z))
assert set(Min(Max(w, x), Max(y, z)).args) == {
Max(w, x), Max(y, z)}
assert Min(Max(x, y), Max(x, z), w) == Min(
w, Max(x, Min(y, z)))
A, B = Min, Max
for i in range(2):
assert A(x, B(x, y)) == x
assert A(x, B(y, A(x, w, z))) == A(x, B(y, A(w, z)))
A, B = B, A
assert Min(w, Max(x, y), Max(v, x, z)) == Min(
w, Max(x, Min(y, Max(v, z))))
def test_rewrite_as_Abs():
from itertools import permutations
from sympy.functions.elementary.complexes import Abs
from sympy.abc import x, y, z, w
def test(e):
free = e.free_symbols
a = e.rewrite(Abs)
assert not a.has(Min, Max)
for i in permutations(range(len(free))):
reps = dict(zip(free, i))
assert a.xreplace(reps) == e.xreplace(reps)
test(Min(x, y))
test(Max(x, y))
test(Min(x, y, z))
test(Min(Max(w, x), Max(y, z)))
def test_issue_14000():
assert isinstance(sqrt(4, evaluate=False), Pow) == True
assert isinstance(cbrt(3.5, evaluate=False), Pow) == True
assert isinstance(root(16, 4, evaluate=False), Pow) == True
assert sqrt(4, evaluate=False) == Pow(4, S.Half, evaluate=False)
assert cbrt(3.5, evaluate=False) == Pow(3.5, Rational(1, 3), evaluate=False)
assert root(4, 2, evaluate=False) == Pow(4, S.Half, evaluate=False)
assert root(16, 4, 2, evaluate=False).has(Pow) == True
assert real_root(-8, 3, evaluate=False).has(Pow) == True
def test_issue_6899():
from sympy.core.function import Lambda
x = Symbol('x')
eqn = Lambda(x, x)
assert eqn.func(*eqn.args) == eqn
def test_Rem():
from sympy.abc import x, y
assert Rem(5, 3) == 2
assert Rem(-5, 3) == -2
assert Rem(5, -3) == 2
assert Rem(-5, -3) == -2
assert Rem(x**3, y) == Rem(x**3, y)
assert Rem(Rem(-5, 3) + 3, 3) == 1
def test_minmax_no_evaluate():
from sympy import evaluate
p = Symbol('p', positive=True)
assert Max(1, 3) == 3
assert Max(1, 3).args == ()
assert Max(0, p) == p
assert Max(0, p).args == ()
assert Min(0, p) == 0
assert Min(0, p).args == ()
assert Max(1, 3, evaluate=False) != 3
assert Max(1, 3, evaluate=False).args == (1, 3)
assert Max(0, p, evaluate=False) != p
assert Max(0, p, evaluate=False).args == (0, p)
assert Min(0, p, evaluate=False) != 0
assert Min(0, p, evaluate=False).args == (0, p)
with evaluate(False):
assert Max(1, 3) != 3
assert Max(1, 3).args == (1, 3)
assert Max(0, p) != p
assert Max(0, p).args == (0, p)
assert Min(0, p) != 0
assert Min(0, p).args == (0, p)
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