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This lecture covers the introduction to inductors, their voltage-current relations, power and energy storage, series and parallel combinations, as well as the natural response of RC circuits. It also explains first-order systems and their solutions.
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Lecture 16 Inductors Introduction to first-order circuits RC circuit natural response Related educational modules: Section 2.3, 2.4.1, 2.4.2
Energy storage elements - inductors • Inductors store energy in the form of a magnetic field • Commonly constructed by coiling a conductive wire around a ferrite core
Inductors • Circuit symbol: • L is the inductance • Units are Henries (H) • Voltage-current relation:
Inductor voltage-current relations • Differential form: • Integral form:
Annotate previous slide to show initial current, define times on integral, sketchy derivation of integration of differential form to get integral form.
Important notes about inductors • If current is constant, there is no voltage difference across inductor • If nothing in the circuit is changing with time, inductors act as short circuits • Sudden changes in current require infinite voltage • The current through an inductor must be a continuous function of time
Inductor Power and Energy • Power: • Energy:
Series combinations of inductors • A series combination of inductors can be represented as a single equivalent inductance
Example • Determine the equivalent inductance, Leq
First order systems • First order systems are governed by a first order differential equation • They have a single, first order, derivative term • They have a single (equivalent) energy storage elements • First order electrical circuits have a single (equivalent) capacitor or inductor
First order differential equations • General form of differential equation: • Initial condition:
Solutions of differential equations – overview • Solution is of the form: • yh(t) is homogeneous solution • Due to the system’s response to initial conditions • yp(t) is the particular solution • Due to the particular forcing function, u(t), applied to the system
Homogeneous Solution • Lecture 14: a dynamic system’s response depends upon the system’s state at previous times • The homogeneous solution is the system’s response to its initial conditions only • System response if no input is applied u(t) = 0 • Also called the unforced response, natural response, or zero input response • All physical systems dissipate energy yh(t)0 as t
Particular Solution • The particular solution is the system’s response to the input only • The form of the particular solution is dictated by the form of the forcing function applied to the system • Also called the forced response or zero state response • Since yh(t)0 as t, and y(t) = yp(t) + yh(t): • y(t) yp(t) as t
Qualitative example: heating frying pan • Natural response: • Due to pan’s initial temperature; no input • Forced response: • Due to input; if qin is constant, yp(t) is constant • Superimpose to get overall response
On previous slide, note steady-state response (corresponds to particular solution) and transient response (induced by initial conditions; transition from one steady-state condition to another)
RC circuit natural response – overview • No power sources • Circuit response is due to energy initially stored in the capacitor v(t=0) = V0 • Capacitor’s initial energy is dissipated through resistor after switch is closed
RC Circuit Natural Response • Find v(t), for t>0 if the voltage across the capacitor before the switch moves is v(0-) = V0
Derive governing first order differential equation on previous slide • Talk about initial conditions; emphasize that capacitor voltage cannot change suddenly
Finish derivation on previous slide • Sketch response on previous slide
RC Circuit Natural Response – summary • Capacitor voltage: • Exponential function: • Write v(t) in terms of :
Notes: • R and C set time constant • Increase C => more energy to dissipate • Increase R => energy disspates more slowly
RC circuit natural response – example 1 • Find v(t), t>0
Example 1 – continued • Equivalent circuit, t>0. v(0) = 6V.
