Integrating factor: Difference between revisions

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[[Category:Differential Equations]]
'''Integrating factor''' is a method to solve scalar [[Linear First Order ODE]]<nowiki/>s. It takes advantage of the product rule of derivatives
'''Integrating factor''' is a method to solve scalar [[Linear First Order ODE]]<nowiki/>s. It takes advantage of the product rule of derivatives


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<math>y(t) = \frac{1}{\mu(t)}\int \mu g dt + C </math>
<math>y(t) = \frac{1}{\mu(t)}\int \mu g dt + C </math>
[[Category:Differential Equations]]

Latest revision as of 19:46, 17 May 2024

Integrating factor is a method to solve scalar Linear First Order ODEs. It takes advantage of the product rule of derivatives

and attempts to move all y terms into the same differential order.

Note that Separation of variables is generally easier when both options are available.

Procedure

Consider a linear first order ODE.

We multiply bothsides by integrating factor such that the left hand side to be the exact derivative of a product. For this to work, we need

Applying the integrating factor, we have

From there, simple integration and algebra will solve the equation.