Approche géométrique des nombres complexes/Exercices/Sur les racines n-ièmes

a)  ${\displaystyle a^{2}-b^{2}=8,\;a^{2}+b^{2}={\sqrt {8^{2}+6^{2}}}=10,\;ab<0\Longleftrightarrow a^{2}=9,\;b^{2}=1,\;ab<0}$  donc les racines sont ${\displaystyle \pm \left(3-\mathrm {i} \right)}$ .

b)  ${\displaystyle z^{2}=1+\mathrm {i} {\sqrt {3}}=2\operatorname {e} ^{\mathrm {i} \pi /3}\Leftrightarrow z=\pm {\sqrt {2}}\operatorname {e} ^{\mathrm {i} \pi /6}=\pm {\frac {{\sqrt {3}}+\mathrm {i} }{\sqrt {2}}}}$ .

c)  ${\displaystyle a^{2}-b^{2}=20,\;a^{2}+b^{2}={\sqrt {20^{2}+21^{2}}}=29,\;ab<0\Longleftrightarrow a^{2}=49/2,\;b^{2}=9/2,\;ab<0}$  donc les racines sont ${\displaystyle \pm {\frac {7-3\mathrm {i} }{\sqrt {2}}}}$ .

d)  ${\displaystyle {\frac {2\mathrm {i} -1}{\mathrm {i} +2}}=\mathrm {i} }$ , dont les racines sont ${\displaystyle \pm \operatorname {e} ^{\mathrm {i} \pi /4}=\pm {\frac {1+\mathrm {i} }{\sqrt {2}}}}$ .

${\displaystyle {\frac {\mathrm {i} +{\sqrt {3}}}{\mathrm {i} -{\sqrt {3}}}}={\frac {2\operatorname {e} ^{\mathrm {i} \pi /6}}{2\operatorname {e} ^{\mathrm {i} 5\pi /6}}}=\operatorname {e} ^{-\mathrm {i} 2\pi /3}}$ , dont les racines cubiques sont ${\displaystyle \operatorname {e} ^{-\mathrm {i} 2\pi /9}}$ , ${\displaystyle \operatorname {e} ^{\mathrm {i} 4\pi /9}}$  et ${\displaystyle \operatorname {e} ^{\mathrm {i} 10\pi /9}}$ .

a)  ${\displaystyle a^{2}-b^{2}=-7,\;a^{2}+b^{2}={\sqrt {7^{2}+24^{2}}}=25,\;ab<0\Longleftrightarrow a^{2}=9,\;b^{2}=16,\;ab<0}$  donc ${\displaystyle -7-24\mathrm {i} =\left(3-4\mathrm {i} \right)^{2}}$ .

Puis, ${\displaystyle a^{2}-b^{2}=3,\;a^{2}+b^{2}={\sqrt {3^{2}+4^{2}}}=5,\;ab<0\Longleftrightarrow a^{2}=4,\;b^{2}=1,\;ab<0}$  donc ${\displaystyle 3-4\mathrm {i} =\left(2-\mathrm {i} \right)^{2}}$ .

Les racines quatrièmes de ${\displaystyle -7-24\mathrm {i} }$  sont donc ${\displaystyle \pm \left(2-\mathrm {i} \right)}$  et ${\displaystyle \pm \mathrm {i} \left(2-\mathrm {i} \right)=\pm \left(1+2\mathrm {i} \right)}$ .

b)   Les racines quatrièmes de ${\displaystyle -7+24\mathrm {i} }$  sont donc ${\displaystyle \pm \left(2+\mathrm {i} \right)}$  et ${\displaystyle \pm \left(1-2\mathrm {i} \right)}$ .

c)  ${\displaystyle 8\left(1-\mathrm {i} {\sqrt {3}}\right)=16\operatorname {e} ^{-\mathrm {i} \pi /3}}$ , dont les racines quatrièmes sont ${\displaystyle \pm 2\operatorname {e} ^{-\mathrm {i} \pi /12}}$  et ${\displaystyle \pm 2\operatorname {e} ^{\mathrm {i} 5\pi /12}}$ .

${\displaystyle {\frac {9{\sqrt {3}}}{2}}\left(1-\mathrm {i} {\sqrt {3}}\right)=9{\sqrt {3}}\operatorname {e} ^{-\mathrm {i} \pi /3}}$ , dont les racines cinquièmes sont ${\displaystyle {\sqrt {3}}\operatorname {e} ^{\mathrm {i} \pi (6k-1)/15},\quad k\in \{0,\pm 1,\pm 2\}}$ .

${\displaystyle {\frac {1+\mathrm {i} }{{\sqrt {3}}-\mathrm {i} }}={\frac {{\sqrt {2}}\operatorname {e} ^{\mathrm {i} \pi /4}}{2\operatorname {e} ^{-\mathrm {i} \pi /6}}}={\frac {\operatorname {e} ^{\mathrm {i} 5\pi /12}}{\sqrt {2}}}}$ , dont les racines huitièmes sont ${\displaystyle \pm 2^{-1/16}\operatorname {e} ^{\mathrm {i} \pi (5+24k)/96},\quad k\in \{0,\pm 1,2\}}$ .

${\displaystyle z^{3}=\mathrm {i} =\operatorname {e} ^{\mathrm {i} \pi /2}\Leftrightarrow z\in \{\mathrm {e} ^{\mathrm {i} \pi /6},\mathrm {e} ^{\mathrm {i} 5\pi /6},\mathrm {e} ^{\mathrm {i} 3\pi /2}\}}$ .

${\displaystyle z^{n}={\frac {1+\mathrm {i} }{\sqrt {2}}}=\operatorname {e} ^{\mathrm {i} \pi /4}\Leftrightarrow z=\operatorname {e} ^{\mathrm {i} \pi (1+8k)/(4n)},\;k\in \{0,1,\dots ,n-1\}}$ .

${\displaystyle (1+8k)/4n\notin \{1/6,5/6,9/6\}}$  car ${\displaystyle 3(1+8k)\notin \{2n,10n,18n\}}$ , par imparité.

${\displaystyle \left({\frac {1}{2}}+\mathrm {i} {\sqrt {3}}\right)^{2}=-{\frac {11}{4}}+\mathrm {i} {\sqrt {3}}}$  donc ${\displaystyle \left({\frac {1}{2}}+\mathrm {i} {\sqrt {3}}\right)^{4}={\frac {73}{16}}-{\frac {11{\sqrt {3}}}{2}}\mathrm {i} }$ .

Les racines quatrièmes de ${\displaystyle {\frac {73}{16}}-{\frac {11{\sqrt {3}}}{2}}\mathrm {i} }$  sont donc ${\displaystyle \pm \left({\frac {1}{2}}+\mathrm {i} {\sqrt {3}}\right)}$  et ${\displaystyle \pm \mathrm {i} \left({\frac {1}{2}}+\mathrm {i} {\sqrt {3}}\right)=\pm \left({\frac {\mathrm {i} }{2}}-{\sqrt {3}}\right)}$ .

${\displaystyle Z}$  a, comme tout complexe non nul, trois racines cubiques dans ${\displaystyle \mathbb {C} }$ .

${\displaystyle Z=r\operatorname {e} ^{\mathrm {i} \theta }}$  avec ${\displaystyle r=2{\sqrt {2}}}$  et ${\displaystyle \theta =-3\pi /4}$  donc ses trois racines cubiques sont ${\displaystyle z_{0}={\sqrt[{3}]{r}}\operatorname {e} ^{\mathrm {i} \theta /3}={\sqrt {2}}\operatorname {e} ^{-\mathrm {i} \pi /4}=1-\mathrm {i} }$ , ${\displaystyle z_{1}={\sqrt[{3}]{r}}\operatorname {e} ^{\mathrm {i} (\theta +2\pi )/3}={\sqrt {2}}\operatorname {e} ^{5\mathrm {i} \pi /12}}$ , ${\displaystyle z_{2}={\sqrt[{3}]{r}}\operatorname {e} ^{\mathrm {i} (\theta +4\pi )/3}={\sqrt {2}}\operatorname {e} ^{13\mathrm {i} \pi /12}}$ .

On a ${\displaystyle z_{0}^{4}=-4\in \mathbb {R} }$  mais ${\displaystyle \arg(z_{1}^{4})=5\pi /6}$  et ${\displaystyle \arg(z_{2}^{4})=13\pi /6}$  ne sont pas des multiples entiers de ${\displaystyle \pi }$ , donc ${\displaystyle z_{1}^{4},z_{2}^{4}\notin \mathbb {R} }$ .