- #1
Monnn
- 2
- 0
I expected it to be quite simple as it was without the battery, in which case [tex]\Delta[/tex]U = W, but now I am confused.
with the separation increased from x to x+[tex]\Delta[/tex]x,
It is obvious that [tex]\Delta[/tex]U changes with 0.5[1/x - 1/(x+[tex]\Delta[/tex]x)] since C changes with 1/r. (Without the common coefficient, Q^2 over A epsilon0 or something)
And the battery which maintains the voltage difference between the plates gains energy from the system with V[tex]\Delta[/tex]Q = [1/x - 1/(x+[tex]\Delta[/tex]x)] (Note that it is without 0.5 which sticks with the energy difference)
And the work exerted on the system by moving the plates is (pressure)*(area)*(distance) an integrand over 1/r^2, which gives 0.5[1/x - 1/(x+[tex]\Delta[/tex]x)] as well (the factor 0.5 originates from that of the electrostatic pressure).
So, 0.5 is exerted on the system and it seems that it is stored in the system, as [tex]\Delta[/tex]U. Then how should I explain the work with the battery?
with the separation increased from x to x+[tex]\Delta[/tex]x,
It is obvious that [tex]\Delta[/tex]U changes with 0.5[1/x - 1/(x+[tex]\Delta[/tex]x)] since C changes with 1/r. (Without the common coefficient, Q^2 over A epsilon0 or something)
And the battery which maintains the voltage difference between the plates gains energy from the system with V[tex]\Delta[/tex]Q = [1/x - 1/(x+[tex]\Delta[/tex]x)] (Note that it is without 0.5 which sticks with the energy difference)
And the work exerted on the system by moving the plates is (pressure)*(area)*(distance) an integrand over 1/r^2, which gives 0.5[1/x - 1/(x+[tex]\Delta[/tex]x)] as well (the factor 0.5 originates from that of the electrostatic pressure).
So, 0.5 is exerted on the system and it seems that it is stored in the system, as [tex]\Delta[/tex]U. Then how should I explain the work with the battery?