Second order linear ODE: Difference between revisions

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Depending on the constants, it will give us anywhere from zero to two solutions: <math>y_1</math> and <math>y_2</math>
Depending on the constants, it will give us anywhere from zero to two solutions: <math>y_1</math> and <math>y_2</math>


Based on [[Abel's theorem]], the general solution is of the following form
Given that two linearly independent solutions are given, the general solution is of the following form


<math>
<math>
y(t) = c_1 y_1+c_2 y_2
y(t) = c_1 y_1+c_2 y_2
</math>
</math>
The independence of the solutions can be checked using the [[Wronskian]].

Revision as of 22:17, 21 May 2024

Second order linear ODEs are in the following form:

Important types of second order linear ODEs include

  • Homogeneous
  • Constant coefficients (where p and q are constants)

Initial value problem

There are two arbitrary constants in the solution of a second order linear ODE, so we need two initial conditions.

Solutions

Constant coefficient, homogeneous

These are the simplest kind. They have the general form

We can guess the form of the solution to be exponential, since exponential functions has the property of being the same after many differentiation.

We substitute in the guess and obtain the characteristic equation

Depending on the constants, it will give us anywhere from zero to two solutions: and

Given that two linearly independent solutions are given, the general solution is of the following form

The independence of the solutions can be checked using the Wronskian.