Atrast n
n=-\frac{m\left(12m-1\right)}{60m+1}
m\neq -\frac{1}{60}\text{ and }m\neq 0
Atrast m (complex solution)
\left\{\begin{matrix}\\m=\frac{\sqrt{3600n^{2}-168n+1}}{24}-\frac{5n}{2}+\frac{1}{24}\text{, }&\text{unconditionally}\\m=-\frac{\sqrt{3600n^{2}-168n+1}}{24}-\frac{5n}{2}+\frac{1}{24}\text{, }&n\neq 0\end{matrix}\right,
Atrast m
\left\{\begin{matrix}m=-\frac{\sqrt{3600n^{2}-168n+1}}{24}-\frac{5n}{2}+\frac{1}{24}\text{, }&n\geq \frac{\sqrt{6}}{150}+\frac{7}{300}\text{ or }\left(n\neq 0\text{ and }n\leq -\frac{\sqrt{6}}{150}+\frac{7}{300}\right)\\m=\frac{\sqrt{3600n^{2}-168n+1}}{24}-\frac{5n}{2}+\frac{1}{24}\text{, }&n\geq \frac{\sqrt{6}}{150}+\frac{7}{300}\text{ or }n\leq -\frac{\sqrt{6}}{150}+\frac{7}{300}\end{matrix}\right,
Koplietot
Kopēts starpliktuvē
12mm+5n\times 12m=m-n
Reiziniet vienādojuma abas puses ar 12m.
12m^{2}+5n\times 12m=m-n
Reiziniet m un m, lai iegūtu m^{2}.
12m^{2}+60nm=m-n
Reiziniet 5 un 12, lai iegūtu 60.
12m^{2}+60nm+n=m
Pievienot n abās pusēs.
60nm+n=m-12m^{2}
Atņemiet 12m^{2} no abām pusēm.
\left(60m+1\right)n=m-12m^{2}
Savelciet visus locekļus, kuros ir n.
\frac{\left(60m+1\right)n}{60m+1}=\frac{m\left(1-12m\right)}{60m+1}
Daliet abas puses ar 60m+1.
n=\frac{m\left(1-12m\right)}{60m+1}
Dalīšana ar 60m+1 atsauc reizināšanu ar 60m+1.
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