Forcing function (differential equations)

Template:Short description Script error: No such module "about". In a system of differential equations used to describe a time-dependent process, a forcing function is a function that appears in the equations and is only a function of time, and not of any of the other variables.^[1]^[2] In effect, it is a constant for each value of t.

In the more general case, any nonhomogeneous source function in any variable can be described as a forcing function, and the resulting solution can often be determined using a superposition of linear combinations of the homogeneous solutions and the forcing term.^[3]

For example, $f (t)$ is the forcing function in the nonhomogeneous, second-order, ordinary differential equation: $a y^{″} + b y^{'} + c y = f (t)$

References

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Forcing function (differential equations)

References

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