Answer:
Part a: The current flowing through the toy's circuit is 0.92 A.
Part b: The power of the toy is 5.60 W
Part c: The failing resistance is 16.42 Ω
Explanation:
From the given information
The 3 Alkaline Cells are given as E1=E2=E3=1.58 V
The internal resistance of the Alkaline Cells is R1=R2=R3=0.0205Ω
The Carbon Zinc dry cell is given as E4=1.53 V
The internal resistance of the Carbon Zinc dry cell is as R4=0.105Ω
Resistance of the Circuit is Rc=6.625 Ω
The circuit is given as in the indicated figure.
Part a
The current is given as
[tex]I=\dfrac{V}{R}\\I=\dfrac{E_1+E_2+E_3+E_4}{R_1+R_2+R_3+R_4+R_c}[/tex]
By substituting the values in the equation
[tex]I=\dfrac{E_1+E_2+E_3+E_4}{R_1+R_2+R_3+R_4+R_c}\\I=\dfrac{1.58+1.58+1.58+1.53}{0.0205+0.0205+0.0205+0.105+6.625}\\I=0.923 A[/tex]
The current flowing through the toy's circuit is 0.92 A.
Part b:
The power is given as
[tex]P=I^2R_c\\P=0.92^2*6.625\\P=5.60 W[/tex]
So the power of the toy is 5.60 W
Part c:
Now the power is given as P=0.5W
The equivalent circuit is given in the attached picture.
So the value of I is calculated as
[tex]P=I^2R_c\\I=\sqrt{\dfrac{P}{R_c}}\\I=\sqrt{\dfrac{0.5}{6.625}}\\I=0.27 A[/tex]
The equivalent voltage is given as
[tex]P=\dfrac{V^2}{R_c}\\V=\sqrt{P\times R_c}\\V=\sqrt{0.5\times 6.625}\\V=1.82 V[/tex]
So now the resistance of the failure is given as
[tex]R_i=\dfrac{E_1+E_2+E_3+E_4-V}{I}-[R_1+R_2+R_3]\\R_i=\dfrac{1.58+1.58+1.58+1.53-1.82}{0.27}-[0.0205+0.0205+0.0205]\\R_i=16.42 \Ohm[/tex]
So the failing resistance is 16.42 Ω
