Mediante il famoso principio di Heinsenberg si vuole alimentare un motore da 300 watt in corrente continua.

We want give a power of 300 watt to an engine, by the famous principle of Heinsenberg.

Uncertainty principle - Wikipedia, the free encyclopedia

Calculate the number of diodes required knowing that the diodes are Schottky type and thus can work at a frequency of 1 teraherz.
(All signals caused by the uncertainty principle that their frequency is greater than 1 teraherz will are all shorted because inevitable parasitic capacitances).

Conduct the exercise:

The Heisenberg Uncertainty Principle says that ...

Energy = h / (4 * GreekPi * time)

where h is Planck's constant

h= 6,626 * 10^-34

time is the inverse of twice the frequency

time = 1/ (2*frequency)

time = 1/ (2*10^12)

time = 5 *10^-13 seconds

Maximum energy provided by a single diode equals a.

energy = h / (4 * GreekPi * time)

energy = 6,626 * 10^-34 / (4 * 3.14 * 5 *10^-13 )

energy = 6,626 * 10^-34 / (12,56 * 5 *10^-13 )

energy = 6,626 * 10^-34 / (62,8 *10^-13 )

energy = 6,626 * 10^-34 / (6,28 *10^-12 )

energy = (6,626 / 6,28) * 10^(-34-(-12))

energy = (6,626 / 6,28) * 10^-22

energy = 1 * 10^-22 joule

total_power = 300 watts
if time is considered a second ...

power_unit = energy / 1 second

power_unit = 1 * 10 ^ -22 joules / 1

power_unit = 1 * 10 ^ -22 watts

Number of diodes required = NumDiodes

NumDiodes = total_power / power_unit

NumDiodes = 300 watts / 1 * 10 ^ -22 watts

NumDiodes = 3 * 10 ^ 24 diodes


So 3 * 10 ^ 24 type Schottky diodes or tunnel dioedes, are sufficient to power a 300 watt electric motor.

Maybe I did something wrong in the calculations ?


(sorry for my poor English, but I am italien)