ai-content-maker/.venv/Lib/site-packages/sympy/functions/elementary/_trigonometric_special.py

r"""A module for special angle forumlas for trigonometric functions

TODO
====

This module should be developed in the future to contain direct squrae root
representation of

.. math
    F(\frac{n}{m} \pi)

for every

- $m \in \{ 3, 5, 17, 257, 65537 \}$
- $n \in \mathbb{N}$, $0 \le n < m$
- $F \in \{\sin, \cos, \tan, \csc, \sec, \cot\}$

Without multi-step rewrites
(e.g. $\tan \to \cos/\sin \to \cos/\sqrt \to \ sqrt$)
or using chebyshev identities
(e.g. $\cos \to \cos + \cos^2 + \cdots \to \sqrt{} + \sqrt{}^2 + \cdots $),
which are trivial to implement in sympy,
and had used to give overly complicated expressions.

The reference can be found below, if anyone may need help implementing them.

References
==========

.. [*] Gottlieb, Christian. (1999). The Simple and straightforward construction
   of the regular 257-gon. The Mathematical Intelligencer. 21. 31-37.
   10.1007/BF03024829.
.. [*] https://resources.wolframcloud.com/FunctionRepository/resources/Cos2PiOverFermatPrime
"""
from __future__ import annotations
from typing import Callable
from functools import reduce
from sympy.core.expr import Expr
from sympy.core.singleton import S
from sympy.core.numbers import igcdex, Integer
from sympy.functions.elementary.miscellaneous import sqrt
from sympy.core.cache import cacheit


def migcdex(*x: int) -> tuple[tuple[int, ...], int]:
    r"""Compute extended gcd for multiple integers.

    Explanation
    ===========

    Given the integers $x_1, \cdots, x_n$ and
    an extended gcd for multiple arguments are defined as a solution
    $(y_1, \cdots, y_n), g$ for the diophantine equation
    $x_1 y_1 + \cdots + x_n y_n = g$ such that
    $g = \gcd(x_1, \cdots, x_n)$.

    Examples
    ========

    >>> from sympy.functions.elementary._trigonometric_special import migcdex
    >>> migcdex()
    ((), 0)
    >>> migcdex(4)
    ((1,), 4)
    >>> migcdex(4, 6)
    ((-1, 1), 2)
    >>> migcdex(6, 10, 15)
    ((1, 1, -1), 1)
    """
    if not x:
        return (), 0

    if len(x) == 1:
        return (1,), x[0]

    if len(x) == 2:
        u, v, h = igcdex(x[0], x[1])
        return (u, v), h

    y, g = migcdex(*x[1:])
    u, v, h = igcdex(x[0], g)
    return (u, *(v * i for i in y)), h


def ipartfrac(*denoms: int) -> tuple[int, ...]:
    r"""Compute the the partial fraction decomposition.

    Explanation
    ===========

    Given a rational number $\frac{1}{q_1 \cdots q_n}$ where all
    $q_1, \cdots, q_n$ are pairwise coprime,

    A partial fraction decomposition is defined as

    .. math::
        \frac{1}{q_1 \cdots q_n} = \frac{p_1}{q_1} + \cdots + \frac{p_n}{q_n}

    And it can be derived from solving the following diophantine equation for
    the $p_1, \cdots, p_n$

    .. math::
        1 = p_1 \prod_{i \ne 1}q_i + \cdots + p_n \prod_{i \ne n}q_i

    Where $q_1, \cdots, q_n$ being pairwise coprime implies
    $\gcd(\prod_{i \ne 1}q_i, \cdots, \prod_{i \ne n}q_i) = 1$,
    which guarantees the existance of the solution.

    It is sufficient to compute partial fraction decomposition only
    for numerator $1$ because partial fraction decomposition for any
    $\frac{n}{q_1 \cdots q_n}$ can be easily computed by multiplying
    the result by $n$ afterwards.

    Parameters
    ==========

    denoms : int
        The pairwise coprime integer denominators $q_i$ which defines the
        rational number $\frac{1}{q_1 \cdots q_n}$

    Returns
    =======

    tuple[int, ...]
        The list of numerators which semantically corresponds to $p_i$ of the
        partial fraction decomposition
        $\frac{1}{q_1 \cdots q_n} = \frac{p_1}{q_1} + \cdots + \frac{p_n}{q_n}$

    Examples
    ========

    >>> from sympy import Rational, Mul
    >>> from sympy.functions.elementary._trigonometric_special import ipartfrac

    >>> denoms = 2, 3, 5
    >>> numers = ipartfrac(2, 3, 5)
    >>> numers
    (1, 7, -14)

    >>> Rational(1, Mul(*denoms))
    1/30
    >>> out = 0
    >>> for n, d in zip(numers, denoms):
    ...    out += Rational(n, d)
    >>> out
    1/30
    """
    if not denoms:
        return ()

    def mul(x: int, y: int) -> int:
        return x * y

    denom = reduce(mul, denoms)
    a = [denom // x for x in denoms]
    h, _ = migcdex(*a)
    return h


def fermat_coords(n: int) -> list[int] | None:
    """If n can be factored in terms of Fermat primes with
    multiplicity of each being 1, return those primes, else
    None
    """
    primes = []
    for p in [3, 5, 17, 257, 65537]:
        quotient, remainder = divmod(n, p)
        if remainder == 0:
            n = quotient
            primes.append(p)
            if n == 1:
                return primes
    return None


@cacheit
def cos_3() -> Expr:
    r"""Computes $\cos \frac{\pi}{3}$ in square roots"""
    return S.Half


@cacheit
def cos_5() -> Expr:
    r"""Computes $\cos \frac{\pi}{5}$ in square roots"""
    return (sqrt(5) + 1) / 4


@cacheit
def cos_17() -> Expr:
    r"""Computes $\cos \frac{\pi}{17}$ in square roots"""
    return sqrt(
        (15 + sqrt(17)) / 32 + sqrt(2) * (sqrt(17 - sqrt(17)) +
        sqrt(sqrt(2) * (-8 * sqrt(17 + sqrt(17)) - (1 - sqrt(17))
        * sqrt(17 - sqrt(17))) + 6 * sqrt(17) + 34)) / 32)


@cacheit
def cos_257() -> Expr:
    r"""Computes $\cos \frac{\pi}{257}$ in square roots

    References
    ==========

    .. [*] https://math.stackexchange.com/questions/516142/how-does-cos2-pi-257-look-like-in-real-radicals
    .. [*] https://r-knott.surrey.ac.uk/Fibonacci/simpleTrig.html
    """
    def f1(a: Expr, b: Expr) -> tuple[Expr, Expr]:
        return (a + sqrt(a**2 + b)) / 2, (a - sqrt(a**2 + b)) / 2

    def f2(a: Expr, b: Expr) -> Expr:
        return (a - sqrt(a**2 + b))/2

    t1, t2 = f1(S.NegativeOne, Integer(256))
    z1, z3 = f1(t1, Integer(64))
    z2, z4 = f1(t2, Integer(64))
    y1, y5 = f1(z1, 4*(5 + t1 + 2*z1))
    y6, y2 = f1(z2, 4*(5 + t2 + 2*z2))
    y3, y7 = f1(z3, 4*(5 + t1 + 2*z3))
    y8, y4 = f1(z4, 4*(5 + t2 + 2*z4))
    x1, x9 = f1(y1, -4*(t1 + y1 + y3 + 2*y6))
    x2, x10 = f1(y2, -4*(t2 + y2 + y4 + 2*y7))
    x3, x11 = f1(y3, -4*(t1 + y3 + y5 + 2*y8))
    x4, x12 = f1(y4, -4*(t2 + y4 + y6 + 2*y1))
    x5, x13 = f1(y5, -4*(t1 + y5 + y7 + 2*y2))
    x6, x14 = f1(y6, -4*(t2 + y6 + y8 + 2*y3))
    x15, x7 = f1(y7, -4*(t1 + y7 + y1 + 2*y4))
    x8, x16 = f1(y8, -4*(t2 + y8 + y2 + 2*y5))
    v1 = f2(x1, -4*(x1 + x2 + x3 + x6))
    v2 = f2(x2, -4*(x2 + x3 + x4 + x7))
    v3 = f2(x8, -4*(x8 + x9 + x10 + x13))
    v4 = f2(x9, -4*(x9 + x10 + x11 + x14))
    v5 = f2(x10, -4*(x10 + x11 + x12 + x15))
    v6 = f2(x16, -4*(x16 + x1 + x2 + x5))
    u1 = -f2(-v1, -4*(v2 + v3))
    u2 = -f2(-v4, -4*(v5 + v6))
    w1 = -2*f2(-u1, -4*u2)
    return sqrt(sqrt(2)*sqrt(w1 + 4)/8 + S.Half)


def cos_table() -> dict[int, Callable[[], Expr]]:
    r"""Lazily evaluated table for $\cos \frac{\pi}{n}$ in square roots for
    $n \in \{3, 5, 17, 257, 65537\}$.

    Notes
    =====

    65537 is the only other known Fermat prime and it is nearly impossible to
    build in the current SymPy due to performance issues.

    References
    ==========

    https://r-knott.surrey.ac.uk/Fibonacci/simpleTrig.html
    """
    return {
        3: cos_3,
        5: cos_5,
        17: cos_17,
        257: cos_257
    }
first commit 2024-05-03 04:18:51 +03:00			`r"""A module for special angle forumlas for trigonometric functions`

			`TODO`
			`====`

			`This module should be developed in the future to contain direct squrae root`
			`representation of`

			`.. math`
			`F(\frac{n}{m} \pi)`

			`for every`

			`- $m \in \{ 3, 5, 17, 257, 65537 \}$`
			`- $n \in \mathbb{N}$, $0 \le n < m$`
			`- $F \in \{\sin, \cos, \tan, \csc, \sec, \cot\}$`

			`Without multi-step rewrites`
			`(e.g. $\tan \to \cos/\sin \to \cos/\sqrt \to \ sqrt$)`
			`or using chebyshev identities`
			`(e.g. $\cos \to \cos + \cos^2 + \cdots \to \sqrt{} + \sqrt{}^2 + \cdots $),`
			`which are trivial to implement in sympy,`
			`and had used to give overly complicated expressions.`

			`The reference can be found below, if anyone may need help implementing them.`

			`References`
			`==========`

			`.. [*] Gottlieb, Christian. (1999). The Simple and straightforward construction`
			`of the regular 257-gon. The Mathematical Intelligencer. 21. 31-37.`
			`10.1007/BF03024829.`
			`.. [*] https://resources.wolframcloud.com/FunctionRepository/resources/Cos2PiOverFermatPrime`
			`"""`
			`from __future__ import annotations`
			`from typing import Callable`
			`from functools import reduce`
			`from sympy.core.expr import Expr`
			`from sympy.core.singleton import S`
			`from sympy.core.numbers import igcdex, Integer`
			`from sympy.functions.elementary.miscellaneous import sqrt`
			`from sympy.core.cache import cacheit`


			`def migcdex(*x: int) -> tuple[tuple[int, ...], int]:`
			`r"""Compute extended gcd for multiple integers.`

			`Explanation`
			`===========`

			`Given the integers $x_1, \cdots, x_n$ and`
			`an extended gcd for multiple arguments are defined as a solution`
			`$(y_1, \cdots, y_n), g$ for the diophantine equation`
			`$x_1 y_1 + \cdots + x_n y_n = g$ such that`
			`$g = \gcd(x_1, \cdots, x_n)$.`

			`Examples`
			`========`

			`>>> from sympy.functions.elementary._trigonometric_special import migcdex`
			`>>> migcdex()`
			`((), 0)`
			`>>> migcdex(4)`
			`((1,), 4)`
			`>>> migcdex(4, 6)`
			`((-1, 1), 2)`
			`>>> migcdex(6, 10, 15)`
			`((1, 1, -1), 1)`
			`"""`
			`if not x:`
			`return (), 0`

			`if len(x) == 1:`
			`return (1,), x[0]`

			`if len(x) == 2:`
			`u, v, h = igcdex(x[0], x[1])`
			`return (u, v), h`

			`y, g = migcdex(*x[1:])`
			`u, v, h = igcdex(x[0], g)`
			`return (u, (v i for i in y)), h`


			`def ipartfrac(*denoms: int) -> tuple[int, ...]:`
			`r"""Compute the the partial fraction decomposition.`

			`Explanation`
			`===========`

			`Given a rational number $\frac{1}{q_1 \cdots q_n}$ where all`
			`$q_1, \cdots, q_n$ are pairwise coprime,`

			`A partial fraction decomposition is defined as`

			`.. math::`
			`\frac{1}{q_1 \cdots q_n} = \frac{p_1}{q_1} + \cdots + \frac{p_n}{q_n}`

			`And it can be derived from solving the following diophantine equation for`
			`the $p_1, \cdots, p_n$`

			`.. math::`
			`1 = p_1 \prod_{i \ne 1}q_i + \cdots + p_n \prod_{i \ne n}q_i`

			`Where $q_1, \cdots, q_n$ being pairwise coprime implies`
			`$\gcd(\prod_{i \ne 1}q_i, \cdots, \prod_{i \ne n}q_i) = 1$,`
			`which guarantees the existance of the solution.`

			`It is sufficient to compute partial fraction decomposition only`
			`for numerator $1$ because partial fraction decomposition for any`
			`$\frac{n}{q_1 \cdots q_n}$ can be easily computed by multiplying`
			`the result by $n$ afterwards.`

			`Parameters`
			`==========`

			`denoms : int`
			`The pairwise coprime integer denominators $q_i$ which defines the`
			`rational number $\frac{1}{q_1 \cdots q_n}$`

			`Returns`
			`=======`

			`tuple[int, ...]`
			`The list of numerators which semantically corresponds to $p_i$ of the`
			`partial fraction decomposition`
			$\frac{1}{q_1 \cdots q_n} = \frac{p_1}{q_1} + \cdots + \frac{p_n}{q_n}$

			`Examples`
			`========`

			`>>> from sympy import Rational, Mul`
			`>>> from sympy.functions.elementary._trigonometric_special import ipartfrac`

			`>>> denoms = 2, 3, 5`
			`>>> numers = ipartfrac(2, 3, 5)`
			`>>> numers`
			`(1, 7, -14)`

			`>>> Rational(1, Mul(*denoms))`
			`1/30`
			`>>> out = 0`
			`>>> for n, d in zip(numers, denoms):`
			`... out += Rational(n, d)`
			`>>> out`
			`1/30`
			`"""`
			`if not denoms:`
			`return ()`

			`def mul(x: int, y: int) -> int:`
			`return x * y`

			`denom = reduce(mul, denoms)`
			`a = [denom // x for x in denoms]`
			`h, _ = migcdex(*a)`
			`return h`


			`def fermat_coords(n: int) -> list[int] \| None:`
			`"""If n can be factored in terms of Fermat primes with`
			`multiplicity of each being 1, return those primes, else`
			`None`
			`"""`
			`primes = []`
			`for p in [3, 5, 17, 257, 65537]:`
			`quotient, remainder = divmod(n, p)`
			`if remainder == 0:`
			`n = quotient`
			`primes.append(p)`
			`if n == 1:`
			`return primes`
			`return None`


			`@cacheit`
			`def cos_3() -> Expr:`
			`r"""Computes $\cos \frac{\pi}{3}$ in square roots"""`
			`return S.Half`


			`@cacheit`
			`def cos_5() -> Expr:`
			`r"""Computes $\cos \frac{\pi}{5}$ in square roots"""`
			`return (sqrt(5) + 1) / 4`


			`@cacheit`
			`def cos_17() -> Expr:`
			`r"""Computes $\cos \frac{\pi}{17}$ in square roots"""`
			`return sqrt(`
			`(15 + sqrt(17)) / 32 + sqrt(2) * (sqrt(17 - sqrt(17)) +`
			`sqrt(sqrt(2) * (-8 * sqrt(17 + sqrt(17)) - (1 - sqrt(17))`
			`* sqrt(17 - sqrt(17))) + 6 * sqrt(17) + 34)) / 32)`


			`@cacheit`
			`def cos_257() -> Expr:`
			`r"""Computes $\cos \frac{\pi}{257}$ in square roots`

			`References`
			`==========`

			`.. [*] https://math.stackexchange.com/questions/516142/how-does-cos2-pi-257-look-like-in-real-radicals`
			`.. [*] https://r-knott.surrey.ac.uk/Fibonacci/simpleTrig.html`
			`"""`
			`def f1(a: Expr, b: Expr) -> tuple[Expr, Expr]:`
			`return (a + sqrt(a2 + b)) / 2, (a - sqrt(a2 + b)) / 2`

			`def f2(a: Expr, b: Expr) -> Expr:`
			`return (a - sqrt(a**2 + b))/2`

			`t1, t2 = f1(S.NegativeOne, Integer(256))`
			`z1, z3 = f1(t1, Integer(64))`
			`z2, z4 = f1(t2, Integer(64))`
			`y1, y5 = f1(z1, 4(5 + t1 + 2z1))`
			`y6, y2 = f1(z2, 4(5 + t2 + 2z2))`
			`y3, y7 = f1(z3, 4(5 + t1 + 2z3))`
			`y8, y4 = f1(z4, 4(5 + t2 + 2z4))`
			`x1, x9 = f1(y1, -4(t1 + y1 + y3 + 2y6))`
			`x2, x10 = f1(y2, -4(t2 + y2 + y4 + 2y7))`
			`x3, x11 = f1(y3, -4(t1 + y3 + y5 + 2y8))`
			`x4, x12 = f1(y4, -4(t2 + y4 + y6 + 2y1))`
			`x5, x13 = f1(y5, -4(t1 + y5 + y7 + 2y2))`
			`x6, x14 = f1(y6, -4(t2 + y6 + y8 + 2y3))`
			`x15, x7 = f1(y7, -4(t1 + y7 + y1 + 2y4))`
			`x8, x16 = f1(y8, -4(t2 + y8 + y2 + 2y5))`
			`v1 = f2(x1, -4*(x1 + x2 + x3 + x6))`
			`v2 = f2(x2, -4*(x2 + x3 + x4 + x7))`
			`v3 = f2(x8, -4*(x8 + x9 + x10 + x13))`
			`v4 = f2(x9, -4*(x9 + x10 + x11 + x14))`
			`v5 = f2(x10, -4*(x10 + x11 + x12 + x15))`
			`v6 = f2(x16, -4*(x16 + x1 + x2 + x5))`
			`u1 = -f2(-v1, -4*(v2 + v3))`
			`u2 = -f2(-v4, -4*(v5 + v6))`
			`w1 = -2f2(-u1, -4u2)`
			`return sqrt(sqrt(2)*sqrt(w1 + 4)/8 + S.Half)`


			`def cos_table() -> dict[int, Callable[[], Expr]]:`
			`r"""Lazily evaluated table for $\cos \frac{\pi}{n}$ in square roots for`
			`$n \in \{3, 5, 17, 257, 65537\}$.`

			`Notes`
			`=====`

			`65537 is the only other known Fermat prime and it is nearly impossible to`
			`build in the current SymPy due to performance issues.`

			`References`
			`==========`

			`https://r-knott.surrey.ac.uk/Fibonacci/simpleTrig.html`
			`"""`
			`return {`
			`3: cos_3,`
			`5: cos_5,`
			`17: cos_17,`
			`257: cos_257`
			`}`