Answer: t = 0.492τ
Explanation: In a circuit where there is a resistor and a capacitor, the equation for a charging capacitor is given by:
[tex]q = q_0(1 - e^{\frac{t}{RC} })[/tex]
where:
[tex]q_0[/tex] is the equilibrium charge
q is the charge at time t
RC is time constant also called τ (tau)
For this problem, the circuit is charged to 39%, which means: q = [tex]0.39 q_0[/tex]
[tex]0.39q_0 = q_0 (1 - e^\frac{-t}{RC} )[/tex]
0.39 = 1 - [tex]e^\frac{-t}{RC}[/tex]
[tex]e^\frac{-t}{RC}[/tex] = 0.61
[tex]\frac{-t}{RC}[/tex] = ln(0.61)
-t = ln(0.61)τ
t = 0.492τ
For the condition to be met it is needed 0.492 time constants must elapse.
