Difference between revisions of "Order of Differential Equations"

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Examples:
 
Examples:
* <math> y'' + xy' x^3y = \sin{x} </math> is of order 2 because the highest-order derivative, <math> y'' </math>, is of order 2.
+
* <math> y'' + xy' - x^3y = \sin{x} </math> is of order 2 because the highest-order derivative, <math> y'' </math>, is of order 2.
 
* <math>  </math>
 
* <math>  </math>
 
* <math>  </math>
 
* <math>  </math>

Revision as of 18:52, 17 September 2021

Introduction

The order of a differential equation is determined by the highest-order derivative. The higher the order of the differential equation, the more arbitrary constants need to be added to the general solution. A first-order equation will have one, a second-order two, and so on. The degree of a differential equation, similarly, is determined by the highest exponent on any variables involved.

Examples:

  • is of order 2 because the highest-order derivative, , is of order 2.

Resources