527 lines
12 KiB
C
527 lines
12 KiB
C
/*[clinic input]
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preserve
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[clinic start generated code]*/
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PyDoc_STRVAR(math_gcd__doc__,
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"gcd($module, x, y, /)\n"
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"--\n"
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"\n"
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"greatest common divisor of x and y");
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#define MATH_GCD_METHODDEF \
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{"gcd", (PyCFunction)math_gcd, METH_FASTCALL, math_gcd__doc__},
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static PyObject *
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math_gcd_impl(PyObject *module, PyObject *a, PyObject *b);
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static PyObject *
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math_gcd(PyObject *module, PyObject *const *args, Py_ssize_t nargs)
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{
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PyObject *return_value = NULL;
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PyObject *a;
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PyObject *b;
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if (!_PyArg_UnpackStack(args, nargs, "gcd",
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2, 2,
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&a, &b)) {
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goto exit;
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}
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return_value = math_gcd_impl(module, a, b);
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exit:
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return return_value;
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}
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PyDoc_STRVAR(math_ceil__doc__,
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"ceil($module, x, /)\n"
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"--\n"
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"\n"
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"Return the ceiling of x as an Integral.\n"
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"\n"
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"This is the smallest integer >= x.");
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#define MATH_CEIL_METHODDEF \
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{"ceil", (PyCFunction)math_ceil, METH_O, math_ceil__doc__},
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PyDoc_STRVAR(math_floor__doc__,
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"floor($module, x, /)\n"
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"--\n"
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"\n"
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"Return the floor of x as an Integral.\n"
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"\n"
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"This is the largest integer <= x.");
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#define MATH_FLOOR_METHODDEF \
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{"floor", (PyCFunction)math_floor, METH_O, math_floor__doc__},
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PyDoc_STRVAR(math_fsum__doc__,
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"fsum($module, seq, /)\n"
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"--\n"
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"\n"
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"Return an accurate floating point sum of values in the iterable seq.\n"
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"\n"
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"Assumes IEEE-754 floating point arithmetic.");
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#define MATH_FSUM_METHODDEF \
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{"fsum", (PyCFunction)math_fsum, METH_O, math_fsum__doc__},
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PyDoc_STRVAR(math_factorial__doc__,
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"factorial($module, x, /)\n"
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"--\n"
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"\n"
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"Find x!.\n"
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"\n"
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"Raise a ValueError if x is negative or non-integral.");
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#define MATH_FACTORIAL_METHODDEF \
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{"factorial", (PyCFunction)math_factorial, METH_O, math_factorial__doc__},
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PyDoc_STRVAR(math_trunc__doc__,
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"trunc($module, x, /)\n"
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"--\n"
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"\n"
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"Truncates the Real x to the nearest Integral toward 0.\n"
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"\n"
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"Uses the __trunc__ magic method.");
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#define MATH_TRUNC_METHODDEF \
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{"trunc", (PyCFunction)math_trunc, METH_O, math_trunc__doc__},
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PyDoc_STRVAR(math_frexp__doc__,
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"frexp($module, x, /)\n"
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"--\n"
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"\n"
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"Return the mantissa and exponent of x, as pair (m, e).\n"
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"\n"
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"m is a float and e is an int, such that x = m * 2.**e.\n"
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"If x is 0, m and e are both 0. Else 0.5 <= abs(m) < 1.0.");
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#define MATH_FREXP_METHODDEF \
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{"frexp", (PyCFunction)math_frexp, METH_O, math_frexp__doc__},
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static PyObject *
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math_frexp_impl(PyObject *module, double x);
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static PyObject *
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math_frexp(PyObject *module, PyObject *arg)
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{
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PyObject *return_value = NULL;
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double x;
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if (!PyArg_Parse(arg, "d:frexp", &x)) {
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goto exit;
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}
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return_value = math_frexp_impl(module, x);
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exit:
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return return_value;
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}
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PyDoc_STRVAR(math_ldexp__doc__,
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"ldexp($module, x, i, /)\n"
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"--\n"
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"\n"
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"Return x * (2**i).\n"
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"\n"
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"This is essentially the inverse of frexp().");
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#define MATH_LDEXP_METHODDEF \
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{"ldexp", (PyCFunction)math_ldexp, METH_FASTCALL, math_ldexp__doc__},
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static PyObject *
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math_ldexp_impl(PyObject *module, double x, PyObject *i);
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static PyObject *
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math_ldexp(PyObject *module, PyObject *const *args, Py_ssize_t nargs)
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{
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PyObject *return_value = NULL;
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double x;
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PyObject *i;
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if (!_PyArg_ParseStack(args, nargs, "dO:ldexp",
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&x, &i)) {
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goto exit;
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}
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return_value = math_ldexp_impl(module, x, i);
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exit:
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return return_value;
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}
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PyDoc_STRVAR(math_modf__doc__,
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"modf($module, x, /)\n"
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"--\n"
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"\n"
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"Return the fractional and integer parts of x.\n"
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"\n"
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"Both results carry the sign of x and are floats.");
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#define MATH_MODF_METHODDEF \
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{"modf", (PyCFunction)math_modf, METH_O, math_modf__doc__},
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static PyObject *
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math_modf_impl(PyObject *module, double x);
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static PyObject *
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math_modf(PyObject *module, PyObject *arg)
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{
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PyObject *return_value = NULL;
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double x;
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if (!PyArg_Parse(arg, "d:modf", &x)) {
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goto exit;
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}
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return_value = math_modf_impl(module, x);
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exit:
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return return_value;
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}
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PyDoc_STRVAR(math_log__doc__,
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"log(x, [base=math.e])\n"
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"Return the logarithm of x to the given base.\n"
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"\n"
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"If the base not specified, returns the natural logarithm (base e) of x.");
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#define MATH_LOG_METHODDEF \
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{"log", (PyCFunction)math_log, METH_VARARGS, math_log__doc__},
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static PyObject *
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math_log_impl(PyObject *module, PyObject *x, int group_right_1,
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PyObject *base);
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static PyObject *
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math_log(PyObject *module, PyObject *args)
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{
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PyObject *return_value = NULL;
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PyObject *x;
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int group_right_1 = 0;
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PyObject *base = NULL;
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switch (PyTuple_GET_SIZE(args)) {
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case 1:
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if (!PyArg_ParseTuple(args, "O:log", &x)) {
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goto exit;
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}
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break;
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case 2:
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if (!PyArg_ParseTuple(args, "OO:log", &x, &base)) {
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goto exit;
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}
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group_right_1 = 1;
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break;
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default:
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PyErr_SetString(PyExc_TypeError, "math.log requires 1 to 2 arguments");
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goto exit;
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}
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return_value = math_log_impl(module, x, group_right_1, base);
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exit:
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return return_value;
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}
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PyDoc_STRVAR(math_log2__doc__,
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"log2($module, x, /)\n"
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"--\n"
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"\n"
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"Return the base 2 logarithm of x.");
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#define MATH_LOG2_METHODDEF \
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{"log2", (PyCFunction)math_log2, METH_O, math_log2__doc__},
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PyDoc_STRVAR(math_log10__doc__,
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"log10($module, x, /)\n"
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"--\n"
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"\n"
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"Return the base 10 logarithm of x.");
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#define MATH_LOG10_METHODDEF \
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{"log10", (PyCFunction)math_log10, METH_O, math_log10__doc__},
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PyDoc_STRVAR(math_fmod__doc__,
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"fmod($module, x, y, /)\n"
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"--\n"
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"\n"
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"Return fmod(x, y), according to platform C.\n"
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"\n"
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"x % y may differ.");
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#define MATH_FMOD_METHODDEF \
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{"fmod", (PyCFunction)math_fmod, METH_FASTCALL, math_fmod__doc__},
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static PyObject *
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math_fmod_impl(PyObject *module, double x, double y);
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static PyObject *
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math_fmod(PyObject *module, PyObject *const *args, Py_ssize_t nargs)
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{
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PyObject *return_value = NULL;
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double x;
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double y;
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if (!_PyArg_ParseStack(args, nargs, "dd:fmod",
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&x, &y)) {
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goto exit;
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}
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return_value = math_fmod_impl(module, x, y);
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exit:
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return return_value;
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}
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PyDoc_STRVAR(math_dist__doc__,
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"dist($module, p, q, /)\n"
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"--\n"
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"\n"
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"Return the Euclidean distance between two points p and q.\n"
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"\n"
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"The points should be specified as tuples of coordinates.\n"
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"Both tuples must be the same size.\n"
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"\n"
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"Roughly equivalent to:\n"
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" sqrt(sum((px - qx) ** 2.0 for px, qx in zip(p, q)))");
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#define MATH_DIST_METHODDEF \
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{"dist", (PyCFunction)math_dist, METH_FASTCALL, math_dist__doc__},
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static PyObject *
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math_dist_impl(PyObject *module, PyObject *p, PyObject *q);
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static PyObject *
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math_dist(PyObject *module, PyObject *const *args, Py_ssize_t nargs)
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{
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PyObject *return_value = NULL;
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PyObject *p;
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PyObject *q;
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if (!_PyArg_UnpackStack(args, nargs, "dist",
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2, 2,
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&p, &q)) {
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goto exit;
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}
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return_value = math_dist_impl(module, p, q);
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exit:
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return return_value;
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}
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PyDoc_STRVAR(math_pow__doc__,
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"pow($module, x, y, /)\n"
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"--\n"
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"\n"
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"Return x**y (x to the power of y).");
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#define MATH_POW_METHODDEF \
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{"pow", (PyCFunction)math_pow, METH_FASTCALL, math_pow__doc__},
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static PyObject *
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math_pow_impl(PyObject *module, double x, double y);
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static PyObject *
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math_pow(PyObject *module, PyObject *const *args, Py_ssize_t nargs)
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{
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PyObject *return_value = NULL;
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double x;
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double y;
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if (!_PyArg_ParseStack(args, nargs, "dd:pow",
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&x, &y)) {
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goto exit;
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}
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return_value = math_pow_impl(module, x, y);
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exit:
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return return_value;
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}
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PyDoc_STRVAR(math_degrees__doc__,
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"degrees($module, x, /)\n"
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"--\n"
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"\n"
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"Convert angle x from radians to degrees.");
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#define MATH_DEGREES_METHODDEF \
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{"degrees", (PyCFunction)math_degrees, METH_O, math_degrees__doc__},
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static PyObject *
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math_degrees_impl(PyObject *module, double x);
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static PyObject *
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math_degrees(PyObject *module, PyObject *arg)
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{
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PyObject *return_value = NULL;
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double x;
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if (!PyArg_Parse(arg, "d:degrees", &x)) {
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goto exit;
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}
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return_value = math_degrees_impl(module, x);
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exit:
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return return_value;
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}
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PyDoc_STRVAR(math_radians__doc__,
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"radians($module, x, /)\n"
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"--\n"
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"\n"
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"Convert angle x from degrees to radians.");
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#define MATH_RADIANS_METHODDEF \
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{"radians", (PyCFunction)math_radians, METH_O, math_radians__doc__},
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static PyObject *
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math_radians_impl(PyObject *module, double x);
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static PyObject *
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math_radians(PyObject *module, PyObject *arg)
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{
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PyObject *return_value = NULL;
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double x;
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if (!PyArg_Parse(arg, "d:radians", &x)) {
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goto exit;
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}
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return_value = math_radians_impl(module, x);
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exit:
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return return_value;
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}
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PyDoc_STRVAR(math_isfinite__doc__,
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"isfinite($module, x, /)\n"
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"--\n"
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"\n"
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"Return True if x is neither an infinity nor a NaN, and False otherwise.");
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#define MATH_ISFINITE_METHODDEF \
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{"isfinite", (PyCFunction)math_isfinite, METH_O, math_isfinite__doc__},
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static PyObject *
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math_isfinite_impl(PyObject *module, double x);
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static PyObject *
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math_isfinite(PyObject *module, PyObject *arg)
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{
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PyObject *return_value = NULL;
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double x;
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if (!PyArg_Parse(arg, "d:isfinite", &x)) {
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goto exit;
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}
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return_value = math_isfinite_impl(module, x);
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exit:
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return return_value;
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}
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PyDoc_STRVAR(math_isnan__doc__,
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"isnan($module, x, /)\n"
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"--\n"
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"\n"
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"Return True if x is a NaN (not a number), and False otherwise.");
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#define MATH_ISNAN_METHODDEF \
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{"isnan", (PyCFunction)math_isnan, METH_O, math_isnan__doc__},
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static PyObject *
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math_isnan_impl(PyObject *module, double x);
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static PyObject *
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math_isnan(PyObject *module, PyObject *arg)
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{
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PyObject *return_value = NULL;
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double x;
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if (!PyArg_Parse(arg, "d:isnan", &x)) {
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goto exit;
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}
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return_value = math_isnan_impl(module, x);
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exit:
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return return_value;
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}
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PyDoc_STRVAR(math_isinf__doc__,
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"isinf($module, x, /)\n"
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"--\n"
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"\n"
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"Return True if x is a positive or negative infinity, and False otherwise.");
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#define MATH_ISINF_METHODDEF \
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{"isinf", (PyCFunction)math_isinf, METH_O, math_isinf__doc__},
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static PyObject *
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math_isinf_impl(PyObject *module, double x);
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static PyObject *
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math_isinf(PyObject *module, PyObject *arg)
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{
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PyObject *return_value = NULL;
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double x;
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if (!PyArg_Parse(arg, "d:isinf", &x)) {
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goto exit;
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}
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return_value = math_isinf_impl(module, x);
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exit:
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return return_value;
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}
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PyDoc_STRVAR(math_isclose__doc__,
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"isclose($module, /, a, b, *, rel_tol=1e-09, abs_tol=0.0)\n"
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"--\n"
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"\n"
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"Determine whether two floating point numbers are close in value.\n"
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"\n"
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" rel_tol\n"
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" maximum difference for being considered \"close\", relative to the\n"
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" magnitude of the input values\n"
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" abs_tol\n"
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" maximum difference for being considered \"close\", regardless of the\n"
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" magnitude of the input values\n"
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"\n"
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"Return True if a is close in value to b, and False otherwise.\n"
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"\n"
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"For the values to be considered close, the difference between them\n"
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"must be smaller than at least one of the tolerances.\n"
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"\n"
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"-inf, inf and NaN behave similarly to the IEEE 754 Standard. That\n"
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"is, NaN is not close to anything, even itself. inf and -inf are\n"
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"only close to themselves.");
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#define MATH_ISCLOSE_METHODDEF \
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{"isclose", (PyCFunction)math_isclose, METH_FASTCALL|METH_KEYWORDS, math_isclose__doc__},
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static int
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math_isclose_impl(PyObject *module, double a, double b, double rel_tol,
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double abs_tol);
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static PyObject *
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math_isclose(PyObject *module, PyObject *const *args, Py_ssize_t nargs, PyObject *kwnames)
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{
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PyObject *return_value = NULL;
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static const char * const _keywords[] = {"a", "b", "rel_tol", "abs_tol", NULL};
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static _PyArg_Parser _parser = {"dd|$dd:isclose", _keywords, 0};
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double a;
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double b;
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double rel_tol = 1e-09;
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double abs_tol = 0.0;
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int _return_value;
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if (!_PyArg_ParseStackAndKeywords(args, nargs, kwnames, &_parser,
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&a, &b, &rel_tol, &abs_tol)) {
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goto exit;
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}
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_return_value = math_isclose_impl(module, a, b, rel_tol, abs_tol);
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if ((_return_value == -1) && PyErr_Occurred()) {
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goto exit;
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}
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return_value = PyBool_FromLong((long)_return_value);
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exit:
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return return_value;
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}
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/*[clinic end generated code: output=239c51a5acefbafb input=a9049054013a1b77]*/
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