Điện trở tương đương: \(R=\dfrac{R1\left(R2+R3\right)}{R1+R2+R3}=\dfrac{15\left(10+20\right)}{15+10+20}=10\Omega\)

Hiệu điện thế: \(U=R.I=10.0,75=7,5V\)

\(U=U1=U23=7,5V\)(R1//R23)

Cường độ dòng điện I23:

\(I23=U23:R23=7,5:\left(10+20\right)=0,25A\)

\(I23=I2=I3=0,25A\left(R2ntR3\right)\)

Hiệu điện thế R2: \(U2=R2.I2=10.0,25=2,5V\)

a) \(R_{23}=R_2+R_3=10+20=30\left(\Omega\right)\)

\(R_{tđ}=\dfrac{R_1.R_{23}}{R_1+R_{23}}=\dfrac{15.30}{15+30}=10\left(\Omega\right)\)

b) \(U=U_1=U_{23}=I.R_{tđ}=0,75.10=7,5\left(V\right)\)

\(I_2=I_3=\dfrac{U_{23}}{R_{23}}=\dfrac{7,5}{30}=0,25\left(A\right)\)

\(\left\{{}\begin{matrix}U_2=I_2.R_2=0,25.10=2,5\left(A\right)\\U_3=I_3.R_3=0,25.20=5\left(A\right)\end{matrix}\right.\)

\(MCD:\left(R1//R2\right)ntR3\)

\(=>R=R12+R3=\dfrac{R1\cdot R2}{R1+R2}+R3=\dfrac{15\cdot10}{15+10}+4=10\Omega\)

\(I=\dfrac{U}{R}=\dfrac{9}{10}=0,9A\)

\(R_{12}=\dfrac{15.30}{15+30}=10\left(\Omega\right)\)

\(R_m=R_{12}+R_3=10+30=40\left(\Omega\right)\)

\(I_m=\dfrac{U_{AB}}{R_m}=\dfrac{12}{40}=0,3\left(A\right)\)

\(b,I_{12}=I_3=0,3\left(A\right)\)

\(\dfrac{I_1}{I_2}=\dfrac{R_2}{R_1}=\dfrac{30}{15}=\dfrac{2}{1}\)

\(\rightarrow I_1=0,2\left(A\right);I_2=0,1\left(A\right)\)

\(a,R_{23}=R_2+R_3=30+30=60\left(\Omega\right)\)

\(R_m=\dfrac{R_{23}.R_1}{R_{23}+R_1}=\dfrac{60.15}{60+15}=12\left(\Omega\right)\)

\(b,I_m=\dfrac{U_{AB}}{R_m}=\dfrac{12}{12}=1\left(A\right)\)

\(I_1+I_{23}=1\left(A\right)\)

\(\dfrac{I_1}{I_{23}}=\dfrac{R_{23}}{R_1}=\dfrac{60}{15}=\dfrac{4}{1}\)

\(\rightarrow I_1=0,8\left(A\right);I_{23}=0,2\left(A\right)\)

\(\rightarrow I_2=I_3=0,2\left(A\right)\)

Mạch gì bạn nhỉ?

Dự đoán mạch: \(\left(R_1//R_2\right)ntR_3\)

Như vậy thì kết quả mới đẹp.

\(R_{12}=\dfrac{R_1\cdot R_2}{R_1+R_2}=\dfrac{15\cdot10}{15+10}=6\Omega\)

\(R_{tđ}=R_{12}+R_3=6+4=10\Omega\)

\(I=\dfrac{U}{R}=\dfrac{9}{10}=0,9A\)

\(U_1=I_{12}\cdot R_{12}=0,9\cdot6=5,4V\)

\(P_1=\dfrac{U_1^2}{R_1}=\dfrac{5,4^2}{15}=1,944W\)

`@R_[tđ]=[R_1(R_2+R_3)]/[R_1+R_2+R_3]=20/3(\Omega)`

`=>I=U/[R_[tđ]]=1,5(A)`

`@R_1 //// R_[23]=>U=U_1=U_[23]=10(V)`

  `=>{(I_1=10/10=1(A)),(I_[23]=10/[5+15]=0,5(A)=I_1 =I_2):}`

a. \(R=R1+\left(\dfrac{R2\cdot R3}{R2+R3}\right)=15+\left(\dfrac{10\cdot10}{10+10}\right)=20\Omega\)

b. \(I=I1=I23=\dfrac{U}{R}=\dfrac{2,8}{20}=0,14A\left(R1ntR23\right)\)

\(U23=U2=U3=I23\cdot R23=0,14\cdot\left(\dfrac{10\cdot10}{10+10}\right)=0,7V\left(R2\backslash\backslash R3\right)\)

\(\Rightarrow\left\{{}\begin{matrix}I2=U2:R2=0,7:10=0,07A\\I3=U3:R3=0,7:10=0,07A\end{matrix}\right.\)

bạn ơi phần nào là tính cddd qua mính chính và phần nào là tính cddd qua tung dieng tro vậy bạn