Explanation:
Energy stored in a capacitor is given by:
[tex]U=\frac{Q^2}{2C}(1][/tex]
Here, Q is the capacitor's charge and C the capacitance.
Capacitance is given by:
[tex]C=\frac{Q}{V}[/tex]
Where V is the potential difference. Rewriting for Q and replacing in 1:
[tex]Q=CV\\U=\frac{C^2V^2}{2C}=\frac{CV^2}{2}[/tex]
a.) [tex]U=\frac{12.5*10^{-6}F(24V)^2}{2}=3.6*10^{-3}J[/tex]
b.) Energy stored in the capacitor with dielectric is:
[tex]U_k=\frac{U}{k}\\U_k=\frac{3.6*10^{-3}J}{3.75}=9.6*10^{-4}J[/tex]
c.) Energy decreased in a rate of 3.75 due to the insertion of dielectric, that is the value of dielectric constant.
d.) If we introduce a dielectric, potential difference decreases, capacitance increases and charge is the same. Therefore, accord to (1) the energy decreases.
