Datrys ar gyfer b
\left\{\begin{matrix}b=-\frac{ia^{2}-4j-3i}{2aj-i}\text{, }&j=0\text{ or }a\neq \frac{i}{2j}\\b\in \mathrm{C}\text{, }&\left(j=\frac{1}{4}i\text{ and }a=2\right)\text{ or }\left(j=-\frac{1}{2}i\text{ and }a=-\frac{2\times 3}{3+3\sqrt{3}i}-\frac{\sqrt{3}i}{2}-\frac{1}{2}\right)\end{matrix}\right.
Datrys ar gyfer a
a=-i\sqrt{-b+4ij+\left(bj\right)^{2}-3}+ibj
a=i\left(\sqrt{-b+4ij+\left(bj\right)^{2}-3}+bj\right)
Rhannu
Copïo i clipfwrdd
ia^{2}-ib+2abj=3i+4j
Defnyddio’r briodwedd ddosbarthu i luosi a^{2}-b â i.
-ib+2abj=3i+4j-ia^{2}
Tynnu ia^{2} o'r ddwy ochr.
2abj-ib=-ia^{2}+4j+3i
Aildrefnu'r termau.
\left(2aj-i\right)b=-ia^{2}+4j+3i
Cyfuno pob term sy'n cynnwys b.
\left(2aj-i\right)b=3i+4j-ia^{2}
Mae'r hafaliad yn y ffurf safonol.
\frac{\left(2aj-i\right)b}{2aj-i}=\frac{3i+4j-ia^{2}}{2aj-i}
Rhannu’r ddwy ochr â -i+2aj.
b=\frac{3i+4j-ia^{2}}{2aj-i}
Mae rhannu â -i+2aj yn dad-wneud lluosi â -i+2aj.
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