Answer:
a) 4.94e9 J b) 1.07e10 J
Explanation:
The electric potential energy stored in a capacitor, expressed in terms of the value of the capacitance C, and the voltage between its terminals V, is as follows:
[tex]U =\frac{1}{2}*C*V^{2}[/tex]
a) For the original capacitor, we can find directly U as follows:
[tex]U =\frac{1}{2}*1.81F*(73.9e3)^{2} V2 = 4.94e9 J[/tex]
U = 4.94*10⁹ J
b) Prior to find the electric potential energy of the upgraded capacitor, we need to find out the value of the capacitance C of this capacitor, which is identical to the original, except that has a different dielectric constant.
As the capacitance is proportional to the dielectric constant, we can write the following proportion:
ε₂ / ε₁ = [tex]\frac{943}{435}= \frac{C2}{C1} =\frac{Cx}{1.81F}[/tex]
[tex]Cx =\frac{1.81F*943}{435} = 3.92 F[/tex]
Once calculated the new value of the capacitance, as V remains the same, we can find the electric potential energy for the upgraded capacitor as follows:
[tex]U =\frac{1}{2}*3.92F*(73.9e3)^{2} V2 = 1.07e10 J[/tex]
⇒ U = 1.07*10¹⁰ J
