院系:李煌數學研究院/高次代數方程x^n=1的根式解的解析表達式

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李煌公式编辑

方程xⁿ=1滿足n =3k+2, n>3,n,k是整數,之李煌根式解爲：
$x_{1}={\frac {{-{\frac {1}{2}}}-{\frac {i{\sqrt {3}}}{2}}}{(-{\frac {1}{2}}+{{\frac {i{\sqrt {3}}}{2}})}^{\frac {1}{n}}}}$

$x_{2}={{\Bigg (}{\frac {{-{\frac {1}{2}}}-{\frac {i{\sqrt {3}}}{2}}}{(-{\frac {1}{2}}+{{\frac {i{\sqrt {3}}}{2}})}^{\frac {1}{n}}}}{\Bigg )}}^{2}$

$x_{3}={{\Bigg (}{\frac {{-{\frac {1}{2}}}-{\frac {i{\sqrt {3}}}{2}}}{(-{\frac {1}{2}}+{{\frac {i{\sqrt {3}}}{2}})}^{\frac {1}{n}}}}{\Bigg )}}^{3}$

$...$

$x_{n}={{\Bigg (}{\frac {{-{\frac {1}{2}}}-{\frac {i{\sqrt {3}}}{2}}}{(-{\frac {1}{2}}+{{\frac {i{\sqrt {3}}}{2}})}^{\frac {1}{n}}}}{\Bigg )}}^{n}=1$

方程xⁿ=1滿足n =3k+1, n>3,n,k是整數,之李煌根式解爲：
$x_{1}={\frac {{-{\frac {1}{2}}}-{\frac {i{\sqrt {3}}}{2}}}{(-{\frac {1}{2}}-{{\frac {i{\sqrt {3}}}{2}})}^{\frac {1}{n}}}}$

$x_{2}={{\Bigg (}{\frac {{-{\frac {1}{2}}}-{\frac {i{\sqrt {3}}}{2}}}{(-{\frac {1}{2}}-{{\frac {i{\sqrt {3}}}{2}})}^{\frac {1}{n}}}}{\Bigg )}}^{2}$

$x_{3}={{\Bigg (}{\frac {{-{\frac {1}{2}}}-{\frac {i{\sqrt {3}}}{2}}}{(-{\frac {1}{2}}-{{\frac {i{\sqrt {3}}}{2}})}^{\frac {1}{n}}}}{\Bigg )}}^{3}$

$...$

$x_{n}={{\Bigg (}{\frac {{-{\frac {1}{2}}}-{\frac {i{\sqrt {3}}}{2}}}{(-{\frac {1}{2}}-{{\frac {i{\sqrt {3}}}{2}})}^{\frac {1}{n}}}}{\Bigg )}}^{n}=1$

來源编辑

《南昌理工學院學報》.李煌

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