Introduction

 

The Laplace transform is a powerful tool formulated to solve a wide variety ofinitial-value problems. The strategy is to transform the difficult differential equations into simple algebra problems where solutions can be easily obtained. One then applies the Inverse Laplace transform to retrieve the solutions of the original problems. This can be illustrated as follows:

Initial-Value Problems
ODE's or PDE's

Algebra Problems

 

 

 


Difficult

 


Very Easy

 

 

 

Solutions of
Initial-Value Problems

  

Solutions of
Algebra Problems

 

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Definition of the Laplace Transform

 

For a function  defined on , its Laplace transform is denoted as  obtained by the following integral:

Laplace Transforms Related Calculator

where  is real and  is called the Laplace Transform Operator.

Conditions for the Existence 
of a Laplace Transform of f(t) = F(s)

1)

 is piecewise continuous on .

2)

 is of exponential order as . That is, there exist real constants , , and  such that

for all .

Note that conditions 1 and 2 are sufficient, but not necessary, for  to exist.

 

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Definition of the Inverse Laplace Transform

 

If the Laplace transform of  is , then the we say that the Inverse Laplace Transform of  is . Or,

 

Laplace Transforms Related Calculator

where  is called the Inverse Laplace Transform Operator.

Conditions for the Existence of an Inverse Laplace Transform of F(s) = f(t)

1)

.

2)

 is finite.