Answer:
τ = RC = 2.17 s
Explanation:
- The voltage through a capacitor can't change instantaneously, so immediately after the switch is closed, the potential difference will keep at 100 V.
- This voltage will produce a flow of charge (a current) from the capacitor to the resistor, which will be diminishing continuously, till the capacitor be totally discharged, and the current becomes zero.
- The voltage through the capacitor will follow an exponential function of time, as follows:
[tex]V_{C} =V_{o} * e^{-t/RC} (1)[/tex]
- Replacing by the givens in (1):
[tex]V_{C} = 1.00 V\\V_{o} = 100V\\t = 10.0 s[/tex]
[tex]\frac{1.00V}{100 V} = e^{-10s/RC} (2)[/tex]
- Taking ln on both sides in (2), and solving for RC, we have:
[tex]R*C= \frac{-10s}{ln 0.01} = 2.17s (3)[/tex]
- So, the time constant of the circuit (the product of R times C) is equal to 2.17s.
