Difference between revisions of "Bernoulli Equations (1st Order)"

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==Resources==
 
==Resources==
 
* [https://tutorial.math.lamar.edu/Classes/DE/Bernoulli.aspx Bernoulli Equations Notes]. Produced by Paul Dawkins, Lamar University
 
* [https://tutorial.math.lamar.edu/Classes/DE/Bernoulli.aspx Bernoulli Equations Notes]. Produced by Paul Dawkins, Lamar University
* [https://en.wikipedia.org/wiki/Bernoulli_differential_equation Bernoulli differential equation], Wikipedia
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==Licensing==
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Content obtained and/or adapted from:
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* [https://en.wikipedia.org/wiki/Bernoulli_differential_equation Bernoulli differential equation, Wikipedia] under a CC BY-SA license

Latest revision as of 22:09, 5 November 2021

In mathematics, an ordinary differential equation is called a Bernoulli differential equation if it is of the form

where is a real number. Some authors allow any real , whereas others require that not be 0 or 1. The equation was first discussed in a work of 1695 by Jacob Bernoulli, after whom it is named. The earliest solution, however, was offered by Gottfried Leibniz, who published his result in the same year and whose method is the one still used today.

Bernoulli equations are special because they are nonlinear differential equations with known exact solutions. A notable special case of the Bernoulli equation is the logistic differential equation.

Transformation to a linear differential equation

When , the differential equation is linear. When , it is separable. In these cases, standard techniques for solving equations of those forms can be applied. For and , the substitution reduces any Bernoulli equation to a linear differential equation

For example, in the case , making the substitution in the differential equation produces the equation , which is a linear differential equation.

Solution

Let and

be a solution of the linear differential equation

Then we have that is a solution of

And for every such differential equation, for all we have as solution for .

Example

Consider the Bernoulli equation

(in this case, more specifically Riccati's equation). The constant function is a solution. Division by yields

Changing variables gives the equations

which can be solved using the integrating factor

Multiplying by ,

The left side can be represented as the derivative of by reversing the product rule. Applying the chain rule and integrating both sides with respect to results in the equations

The solution for is


Resources

Licensing

Content obtained and/or adapted from: