Datrys ar gyfer y
y=\frac{z\left(x-105\right)^{2}}{10000}
x\neq 105
Datrys ar gyfer x (complex solution)
\left\{\begin{matrix}\\x\neq 105\text{, }&\text{unconditionally}\\x=-100z^{-0.5}\sqrt{y}+105\text{; }x=100z^{-0.5}\sqrt{y}+105\text{, }&y\neq 0\text{ and }z\neq 0\end{matrix}\right.
Datrys ar gyfer x
\left\{\begin{matrix}\\x\neq 105\text{, }&\text{unconditionally}\\x=-100\sqrt{\frac{y}{z}}+105\text{; }x=100\sqrt{\frac{y}{z}}+105\text{, }&z>0\text{ and }y>0\\x=-100\sqrt{\frac{y}{z}}+105\text{; }x=100\sqrt{\frac{y}{z}}+105\text{, }&z<0\text{ and }y<0\end{matrix}\right.
Rhannu
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\frac{y}{0.01^{2}\left(x-105\right)^{2}}=z
Ehangu \left(0.01\left(x-105\right)\right)^{2}.
\frac{y}{0.0001\left(x-105\right)^{2}}=z
Cyfrifo 0.01 i bŵer 2 a chael 0.0001.
\frac{y}{0.0001\left(x^{2}-210x+11025\right)}=z
Defnyddio'r theorem binomaidd \left(a-b\right)^{2}=a^{2}-2ab+b^{2} i ehangu'r \left(x-105\right)^{2}.
\frac{y}{0.0001x^{2}-0.021x+1.1025}=z
Defnyddio’r briodwedd ddosbarthu i luosi 0.0001 â x^{2}-210x+11025.
\frac{1}{\frac{x^{2}}{10000}-\frac{21x}{1000}+1.1025}y=z
Mae'r hafaliad yn y ffurf safonol.
\frac{\frac{1}{\frac{x^{2}}{10000}-\frac{21x}{1000}+1.1025}y\left(\frac{x^{2}}{10000}-\frac{21x}{1000}+1.1025\right)}{1}=\frac{z\left(\frac{x^{2}}{10000}-\frac{21x}{1000}+1.1025\right)}{1}
Rhannu’r ddwy ochr â \left(0.0001x^{2}-0.021x+1.1025\right)^{-1}.
y=\frac{z\left(\frac{x^{2}}{10000}-\frac{21x}{1000}+1.1025\right)}{1}
Mae rhannu â \left(0.0001x^{2}-0.021x+1.1025\right)^{-1} yn dad-wneud lluosi â \left(0.0001x^{2}-0.021x+1.1025\right)^{-1}.
y=\frac{z\left(x-105\right)^{2}}{10000}
Rhannwch z â \left(0.0001x^{2}-0.021x+1.1025\right)^{-1}.
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