Ta có
\(\begin{array}{l}{U^2} = U_R^2 + {({U_L} - {U_C})^2}\\ \Rightarrow {U_R} = \sqrt {{U^2} - {{({U_L} - {U_C})}^2}} \\ = \sqrt {{{50}^2} - {{(30 - 60)}^2}} = 40V\end{array}\)
Hệ số công suất đoạn mạch \(\cos \varphi = \dfrac{{{U_R}}}{U} = \dfrac{{40}}{{50}} = 0,8\)
b) Công suất \(P = \dfrac{{{U_R}^2}}{R} \Rightarrow R = \dfrac{{{U_R}^2}}{P} = \dfrac{{{{40}^2}}}{{20}} = 80\Omega \)
Lại có \(I = \dfrac{{{U_R}}}{R} = \dfrac{{{U_L}}}{{{Z_L}}} = \dfrac{{{U_C}}}{{{Z_C}}} \\\Rightarrow {Z_L} = 60\Omega ;{Z_C} = 120\Omega \)
\({Z_L} = \omega L \\\Rightarrow L = \dfrac{{{Z_L}}}{\omega } = \dfrac{{60}}{{100\pi }} = \dfrac{3}{{5\pi }}\left( H \right)\)
\({Z_C} = \dfrac{1}{{\omega C}} \\\Rightarrow C = \dfrac{1}{{{Z_C}.\omega }} \\= \dfrac{1}{{120.100\pi }} = \dfrac{{25}}{{3\pi }}{.10^{ - 5}}\left( F \right)\)
