I-solve ang x (complex solution)
x=-\frac{91^{\frac{7}{8}}\sqrt[8]{8}\left(-y^{6}+\sqrt[4]{65}+2\right)}{91}
I-solve ang x
x=-\frac{2^{\frac{3}{8}}\times 91^{\frac{7}{8}}\left(-y^{6}+\sqrt[4]{65}+2\right)}{91}
I-solve ang y (complex solution)
y\in \frac{2^{\frac{5}{6}}e^{\frac{\pi i}{3}}\sqrt[6]{2^{\frac{5}{8}}\sqrt[8]{91}x+2\sqrt[4]{65}+4}}{2},\frac{2^{\frac{5}{6}}\sqrt[6]{2^{\frac{5}{8}}\sqrt[8]{91}x+2\sqrt[4]{65}+4}}{2},\frac{2^{\frac{5}{6}}e^{\frac{2\pi i}{3}}\sqrt[6]{2^{\frac{5}{8}}\sqrt[8]{91}x+2\sqrt[4]{65}+4}}{2},-\frac{2^{\frac{5}{6}}\sqrt[6]{2^{\frac{5}{8}}\sqrt[8]{91}x+2\sqrt[4]{65}+4}}{2},\frac{2^{\frac{5}{6}}e^{\frac{4\pi i}{3}}\sqrt[6]{2^{\frac{5}{8}}\sqrt[8]{91}x+2\sqrt[4]{65}+4}}{2},\frac{2^{\frac{5}{6}}e^{\frac{5\pi i}{3}}\sqrt[6]{2^{\frac{5}{8}}\sqrt[8]{91}x+2\sqrt[4]{65}+4}}{2}
I-solve ang y
y=\frac{2^{\frac{5}{6}}\sqrt[6]{2^{\frac{5}{8}}\sqrt[8]{91}x+2\sqrt[4]{65}+4}}{2}
y=-\frac{2^{\frac{5}{6}}\sqrt[6]{2^{\frac{5}{8}}\sqrt[8]{91}x+2\sqrt[4]{65}+4}}{2}\text{, }x\geq -\frac{2^{\frac{3}{8}}\times 91^{\frac{7}{8}}\left(4\sqrt[4]{65}+8\right)}{364}
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\left(\frac{91}{8}\right)^{\frac{1}{8}}x+65^{\frac{1}{4}}+2=y^{6}
Pagpalitin ang magkabilang panig para nasa kaliwang bahagi ang lahat ng variable na term.
\left(\frac{91}{8}\right)^{\frac{1}{8}}x+2=y^{6}-65^{\frac{1}{4}}
I-subtract ang 65^{\frac{1}{4}} mula sa magkabilang dulo.
\left(\frac{91}{8}\right)^{\frac{1}{8}}x=y^{6}-65^{\frac{1}{4}}-2
I-subtract ang 2 mula sa magkabilang dulo.
\sqrt[8]{\frac{91}{8}}x=y^{6}-\sqrt[4]{65}-2
Pagsunud-sunurin ang mga term.
\frac{\sqrt[8]{\frac{91}{8}}x}{\sqrt[8]{\frac{91}{8}}}=\frac{y^{6}-\sqrt[4]{65}-2}{\sqrt[8]{\frac{91}{8}}}
I-divide ang magkabilang dulo ng equation gamit ang \sqrt[8]{\frac{91}{8}}.
x=\frac{y^{6}-\sqrt[4]{65}-2}{\sqrt[8]{\frac{91}{8}}}
Kapag na-divide gamit ang \sqrt[8]{\frac{91}{8}}, ma-a-undo ang multiplication gamit ang \sqrt[8]{\frac{91}{8}}.
x=\frac{\sqrt[8]{8}\left(y^{6}-\sqrt[4]{65}-2\right)}{\sqrt[8]{91}}
I-divide ang y^{6}-\sqrt[4]{65}-2 gamit ang \sqrt[8]{\frac{91}{8}}.
\left(\frac{91}{8}\right)^{\frac{1}{8}}x+65^{\frac{1}{4}}+2=y^{6}
Pagpalitin ang magkabilang panig para nasa kaliwang bahagi ang lahat ng variable na term.
\left(\frac{91}{8}\right)^{\frac{1}{8}}x+2=y^{6}-65^{\frac{1}{4}}
I-subtract ang 65^{\frac{1}{4}} mula sa magkabilang dulo.
\left(\frac{91}{8}\right)^{\frac{1}{8}}x=y^{6}-65^{\frac{1}{4}}-2
I-subtract ang 2 mula sa magkabilang dulo.
\sqrt[8]{\frac{91}{8}}x=y^{6}-\sqrt[4]{65}-2
Pagsunud-sunurin ang mga term.
\frac{\sqrt[8]{\frac{91}{8}}x}{\sqrt[8]{\frac{91}{8}}}=\frac{y^{6}-\sqrt[4]{65}-2}{\sqrt[8]{\frac{91}{8}}}
I-divide ang magkabilang dulo ng equation gamit ang \sqrt[8]{\frac{91}{8}}.
x=\frac{y^{6}-\sqrt[4]{65}-2}{\sqrt[8]{\frac{91}{8}}}
Kapag na-divide gamit ang \sqrt[8]{\frac{91}{8}}, ma-a-undo ang multiplication gamit ang \sqrt[8]{\frac{91}{8}}.
x=\frac{\sqrt[8]{8}\left(y^{6}-\sqrt[4]{65}-2\right)}{\sqrt[8]{91}}
I-divide ang y^{6}-\sqrt[4]{65}-2 gamit ang \sqrt[8]{\frac{91}{8}}.
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