A parallel-plate capacitor initially has a potential difference of 400 V and is then disconnected from the charging battery. If the plate spacing is now doubled (without changing Q), what is the new value of the voltage?

We assume the stored charge and the area of the plates don't change. Then if we double the plate spacing, i.e. we double the value of d, then the potential difference ΔV is also doubled.

ap8997154 ap8997154 · Answer 2 · 2022-02-05T08:08:08+01:00

The potential difference(voltage) of the plates if the plate spacing is doubled without changing Q is 800 V.

Given to us

Potential difference initially, ΔV = 400V

The initial distance between the plate, [tex]\rm d = d[/tex]

Final distance between the plate, [tex]\rm d_{new} = 2d[/tex] = 2d

What is the potential difference if the spacing of the plates is now doubled?

We know the capacitance of two parallel plates can be given as,

[tex]C=\dfrac{K\ \epsilon_0\ A }{d} = \dfrac{Q}{V}[/tex]

where C is the capacitance, k is the dielectric constant of the material, A is the are of the plates, d is the distance between the plates, Q is the charge between them, V is the potential difference.

On further simplification we get,

[tex]V = \dfrac{Qd}{K\ \epsilon_0\ A }[/tex]

Potential difference in the initial condition

In the initial condition substituting the values,

[tex]400 = \dfrac{Qd}{K\ \epsilon_0\ A }[/tex]

Potential difference if the space is double

In the final condition substituting the values we get,

[tex]V_{new} = \dfrac{Qd_{new}}{K\ \epsilon_0\ A }[/tex]

[tex]V_{new} = \dfrac{Q2d}{K\ \epsilon_0\ A }[/tex]

[tex]V_{new} = 2\dfrac{Qd}{K\ \epsilon_0\ A }[/tex]

[tex]V_{new} = 2 \times 400 = 800\rm\ V[/tex]

Hence, the potential difference(voltage) of the plates if the plate spacing is doubled without changing Q is 800 V.

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