23.10 Rl circuits  (Page 2/3)

If you want a characteristic RL time constant of 1.00 s, and you have a $\text{500 Ω}$ resistor, what value of self-inductance is needed?

Your RL circuit has a characteristic time constant of 20.0 ns, and a resistance of $\text{5.00 MΩ}$ . (a) What is the inductance of the circuit? (b) What resistance would give you a 1.00 ns time constant, perhaps needed for quick response in an oscilloscope?

A large superconducting magnet, used for magnetic resonance imaging, has a 50.0 H inductance. If you want current through it to be adjustable with a 1.00 s characteristic time constant, what is the minimum resistance of system?

Verify that after a time of 10.0 ms, the current for the situation considered in [link] will be 0.183 A as stated.

Suppose you have a supply of inductors ranging from 1.00 nH to 10.0 H, and resistors ranging from $\text{0.100 Ω}$ to $\text{1.00 MΩ}$ . What is the range of characteristic RL time constants you can produce by connecting a single resistor to a single inductor?

(a) What is the characteristic time constant of a 25.0 mH inductor that has a resistance of $\text{4.00 Ω}$ ? (b) If it is connected to a 12.0 V battery, what is the current after 12.5 ms?

What percentage of the final current $I_{\text{0}}$ flows through an inductor $L$ in series with a resistor $R$ , three time constants after the circuit is completed?

The 5.00 A current through a 1.50 H inductor is dissipated by a $\text{2.00 Ω}$ resistor in a circuit like that in [link] with the switch in position 2. (a) What is the initial energy in the inductor? (b) How long will it take the current to decline to 5.00% of its initial value? (c) Calculate the average power dissipated, and compare it with the initial power dissipated by the resistor.

(a) Use the exact exponential treatment to find how much time is required to bring the current through an 80.0 mH inductor in series with a $\text{15.0 Ω}$ resistor to 99.0% of its final value, starting from zero. (b) Compare your answer to the approximate treatment using integral numbers of $\tau$ . (c) Discuss how significant the difference is.

(a) Using the exact exponential treatment, find the time required for the current through a 2.00 H inductor in series with a $\text{0.500 Ω}$ resistor to be reduced to 0.100% of its original value. (b) Compare your answer to the approximate treatment using integral numbers of $\tau$ . (c) Discuss how significant the difference is.