Lahendage ja leidke p_1
\left\{\begin{matrix}p_{1}=p_{2}-ϕ_{12}+\frac{iV_{12}}{v_{12}}\text{, }&v_{12}\neq 0\\p_{1}\in \mathrm{C}\text{, }&V_{12}=0\text{ and }v_{12}=0\end{matrix}\right,
Lahendage ja leidke V_12
V_{12}=-iv_{12}\left(p_{1}-p_{2}+ϕ_{12}\right)
Jagama
Lõikelauale kopeeritud
V_{12}=-iv_{12}ϕ_{12}-iv_{12}p_{1}+iv_{12}p_{2}
Kasutage distributiivsusomadust, et korrutada v_{12}\left(-i\right) ja ϕ_{12}+p_{1}-p_{2}.
-iv_{12}ϕ_{12}-iv_{12}p_{1}+iv_{12}p_{2}=V_{12}
Vahetage pooled nii, et kõik muutuvad liikmed asuksid vasakul.
-iv_{12}p_{1}+iv_{12}p_{2}=V_{12}-\left(-iv_{12}ϕ_{12}\right)
Lahutage mõlemast poolest -iv_{12}ϕ_{12}.
-iv_{12}p_{1}=V_{12}-\left(-iv_{12}ϕ_{12}\right)-iv_{12}p_{2}
Lahutage mõlemast poolest iv_{12}p_{2}.
-iv_{12}p_{1}=V_{12}+iv_{12}ϕ_{12}-iv_{12}p_{2}
Korrutage -1 ja -i, et leida i.
\left(-iv_{12}\right)p_{1}=V_{12}+iv_{12}ϕ_{12}-ip_{2}v_{12}
Võrrand on standardkujul.
\frac{\left(-iv_{12}\right)p_{1}}{-iv_{12}}=\frac{V_{12}+iv_{12}ϕ_{12}-ip_{2}v_{12}}{-iv_{12}}
Jagage mõlemad pooled -iv_{12}-ga.
p_{1}=\frac{V_{12}+iv_{12}ϕ_{12}-ip_{2}v_{12}}{-iv_{12}}
-iv_{12}-ga jagamine võtab -iv_{12}-ga korrutamise tagasi.
p_{1}=p_{2}-ϕ_{12}+\frac{iV_{12}}{v_{12}}
Jagage V_{12}+iv_{12}ϕ_{12}-iv_{12}p_{2} väärtusega -iv_{12}.
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