steve_bank
Diabetic retinopathy and poor eyesight. Typos ...
In the 19th century Joule in his paddle wheel experiment demonstrated the equivalence of megapascal work and heat.
A similar experiment can be done using a resistor and a capacitor demonstrating the equivalence of electric potential energy and heat. Put a voltage on a capacitor, energy equaling .5*c*v^2. Discharge the capacitor and determining the power dissipated in the resistor.
To finish the experiment put the resistor in a container of water and measure the temperature rise. Calculate energy from q = m*c^dT.
Energy = Joules. Power in watts = Joules/second. Power dissipated in the resistor = i^2 *r. Interstate power to get total energy.
Conservation says the capacitor potential energy must equal the energy dissipated in the resistor. Mathematically the capacitor discharge is an exponential decay function which asymptotically approaches zero but never gets there. The integration carried out long enough would overflow.
Physically the amount of charge and energy on a capacitor is finite quantized by the unit charge, the electron. The energy will go to zero.
Joules Potential Energy 5000.00
Joules Simulated Dissipated Heat Energy 5000.50
A similar experiment can be done using a resistor and a capacitor demonstrating the equivalence of electric potential energy and heat. Put a voltage on a capacitor, energy equaling .5*c*v^2. Discharge the capacitor and determining the power dissipated in the resistor.
To finish the experiment put the resistor in a container of water and measure the temperature rise. Calculate energy from q = m*c^dT.
Energy = Joules. Power in watts = Joules/second. Power dissipated in the resistor = i^2 *r. Interstate power to get total energy.
Conservation says the capacitor potential energy must equal the energy dissipated in the resistor. Mathematically the capacitor discharge is an exponential decay function which asymptotically approaches zero but never gets there. The integration carried out long enough would overflow.
Physically the amount of charge and energy on a capacitor is finite quantized by the unit charge, the electron. The energy will go to zero.
Joules Potential Energy 5000.00
Joules Simulated Dissipated Heat Energy 5000.50
Code:
#Python
import math
def trap(x,y):
# trapezoidal integrqtion
n = len(x) - 1
integral = 0
for i in range(n):
dx = x[i+1]-x[i]
integral += dx * (y[i] + ( (y[i+1]-y[i]) * .5 ))
return integral
n = 10000
t = n*[0]
p = n*[0]
tau = 1. # rc time constnt seconds
rc = 1. # resistor acrooss capacitor
c = 1 # capCITOR farads
Tmax = 10000 # seconds
dt = Tmax/(n-1)
vc = 100 # capacitor voltage
Ec = .5*c*(vc**2) # potential energy in Joules on capacitor
for i in range(n):
t[i] = i * dt
ir = vc/rc # instantaneous resistor current Ohm's Law v = i*r
p[i] = (ir**2)*rc # instantaneous resistor power i^2*r watts
dv = ir*dt/c # solve i = c*dv/dt using differentials
vc -= dv
Ept = trap(t,p) # integrate power to get total energy
print("Joules Potential Energy %f" %Ec)
print("Joules Sinulated Heat Energy %.2f" %Ept)