Examples of differential equations Guide, Meaning , Facts, Information and Description
A separable ordinary differential equation of the first order has the general form:
A separable first order ordinary differential equation
where f(t) is some known function. We may solve this simply by separating the variables as:
Some elaboration is needed since f(t) is not in fact a constant, indeed it might not even be integrable. Arguably, one must also assume something about the domains of the functions involved before the equation is fully defined. Are we talking complex functions, or just real, for example? The usual textbook approach is to discuss forming the equations well before considering how to solve them.
Some first order linear ODEs (ordinary differential equations) are not separable like in the above example. In order to solve non-separable first order linear ODEs one must use what is known as an integrating factor. This technique will be shown below.
Consider first order linear ODEs of the general form:
The method for solving this equation relies on a special "integrating factor", μ:
Multiply both sides of the differential equation by μ to get:
Because of the special μ we picked, this simplifies to:
Using the product rule we get:
Integrating both sides we get:
Finally, to solve for we divide both sides by :
(Since μ is a function of x, we cannot simplify any more.)
Suppose a mass is attached to a spring, which exerts an attractive force on the mass proportional to the extension/compression of the spring and ignore any other forces (gravity, friction etc). We shall write the extension of the spring at a time as . Now, using Newton's second law we can write (using convenient units)
For example, if we suppose at the extension is a unit distance (), and the particle is not moving (). We have
Therefore . (This is an example of simple harmonic motion.)
The above model of an oscillating mass on a spring is plausible but not really realistic. For a start, we've invented a perpetual motion machine which violates the second law of thermodynamics. So lets consider adding some friction for realism. Now, experimental scientists will tell us that friction will tend to deccelerate the mass and have magnitude proportional to its velocity (i.e. ). Our new differential equation, expressing the balancing of the acceleration and the forces, is
This is a damped oscillator, and the plot of displacement against time would look something like this:
An exact differential equation is a first-order ordinary differential equation of implicit form
Laplace transform, eigenvalue, eigenvector, vector field, slope field, integration, partial derivative, vector calculus, differential equations of mathematical physics, exact form. This is an Article on Examples of differential equations. Page Contains Information, Facts Details or Explanation Guide About Examples of differential equations Non-separable first order linear ordinary differential equations
A simple mathematical model
If we look for solutions that have the form , where is a constant, we discover the relationship , and thus must be one of the complex numbers or . Thus, using Euler's theorem we can say that the solution must be of the form:
To fix the unknown constants and , we need initial conditions, i.e. to specify the state of the system at a given time (usually taken to be ).
and so .
and so .Improving our model
where is our coefficient of friction, and . Again looking for solutions of the form , we find that
This is a quadratic equation which we can solve. If we have complex roots , and the solution (with the above boundary conditions) will look like this:
(We can show that )
which does resemble how we'd expect a vibrating spring to behave as friction removed the energy from the system.A simple exact equation
such that
This equation has the solution
where
u and v being dummy variables; x0 and y0 being initial-value constants.See also