To calculate the transient response of an RL (resistor-inductor) circuit to a step input using differential equations, you'll need to set up and solve the governing differential equation for the circuit. The transient response refers to the behavior of the circuit immediately after the step input is applied and before it reaches a steady-state.
Let's consider a simple series RL circuit with a voltage source (step input) connected to an inductor and a resistor in series. Let:
V(t) be the voltage across the inductor as a function of time.
R be the resistance of the resistor in ohms (Ω).
L be the inductance of the inductor in henries (H).
Using Kirchhoff's voltage law (KVL), the governing differential equation for the circuit can be written as follows:
L di/dt + Ri = V(t)
where:
di/dt is the time derivative of the current through the inductor (dI/dt).
The initial condition for the current is also necessary for solving the differential equation. Typically, at t = 0-, the current through the inductor is assumed to be zero (I(0-) = 0). This is because inductors do not allow for an instantaneous change in current.
To solve this differential equation, you can follow these steps:
Write the differential equation using KVL as shown above.
Apply the initial condition: I(0-) = 0.
Take the Laplace transform of both sides of the equation. This converts the differential equation into an algebraic equation.
Solve for the Laplace-transformed current, I(s).
Take the inverse Laplace transform to get the current as a function of time, i(t).
The inverse Laplace transform may require some algebraic manipulations and knowledge of Laplace transform properties. You can use tables or software capable of symbolic calculations to find the inverse Laplace transform.
Note: The transient response will decay over time, and the circuit will eventually reach a steady-state with the inductor acting as a short circuit. The time constant for the RL circuit is given by τ = L/R, and it indicates how fast the transient response decays.
Please keep in mind that this explanation assumes a simple RL circuit. In more complex circuits or circuits with additional elements, the approach may differ, but the underlying principles of solving the differential equation and using the Laplace transform remain the same.