Solvi għal V
V=\frac{94R_{1}v}{5\times \frac{161R_{1}+3381\Omega }{10}}
R_{1}\neq -21\Omega
Solvi għal R_1
\left\{\begin{matrix}\\R_{1}\neq 0\text{, }&\text{unconditionally}\\R_{1}=\frac{3381V\Omega }{188v-161V}\text{, }&\Omega \neq 0\text{ and }v\neq 0\text{ and }V\neq \frac{188v}{161}\\R_{1}\neq -21\Omega \text{, }&V=0\text{ and }v=0\end{matrix}\right.
Kwizz
Algebra
5 problemi simili għal:
16.1 V = 18.8 v \cdot \frac { R _ { 1 } } { R _ { 1 } + 21 \Omega }
Sehem
Ikkupjat fuq il-klibbord
16.1V\left(R_{1}+21\Omega \right)=18.8vR_{1}
Immultiplika ż-żewġ naħat tal-ekwazzjoni b'R_{1}+21\Omega .
16.1VR_{1}+338.1\Omega V=18.8vR_{1}
Uża l-propjetà distributtiva biex timmultiplika 16.1V b'R_{1}+21\Omega .
\left(16.1R_{1}+338.1\Omega \right)V=18.8vR_{1}
Ikkombina t-termini kollha li fihom V.
\frac{161R_{1}+3381\Omega }{10}V=\frac{94R_{1}v}{5}
L-ekwazzjoni hija f'forma standard.
\frac{10\times \frac{161R_{1}+3381\Omega }{10}V}{161R_{1}+3381\Omega }=\frac{94R_{1}v}{5\times \frac{161R_{1}+3381\Omega }{10}}
Iddividi ż-żewġ naħat b'16.1R_{1}+338.1\Omega .
V=\frac{94R_{1}v}{5\times \frac{161R_{1}+3381\Omega }{10}}
Meta tiddividi b'16.1R_{1}+338.1\Omega titneħħa l-multiplikazzjoni b'16.1R_{1}+338.1\Omega .
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