Laplace transform theorems, Laplace transform theorems ,16-12 – HP 50g Graphing Calculator User Manual

Page 16-12

Example 3 – Determine the inverse Laplace transform of F(s) = sin(s). Use:
‘SIN(X)’

` ILAP. The calculator takes a few seconds to return the result:

‘ILAP(SIN(X))’, meaning that there is no closed-form expression f(t), such that f(t)
= L

-1

{sin(s)}.

Example 4 – Determine the inverse Laplace transform of F(s) = 1/s

3

. Use:

‘1/X^3’

` ILAP μ. The calculator returns the result: ‘X^2/2’, which is

interpreted as L

-1

{1/s

3

} = t

2

/2.

Example 5 – Determine the Laplace transform of the function f(t) = cos (a

⋅t+b).

Use: ‘COS(a*X+b)’

` LAP . The calculator returns the result:

Press

μ to obtain –(a sin(b) – X cos(b))/(X

2

+a

2

). The transform is interpreted

as follows: L {cos(a

⋅t+b)} = (s⋅cos b – a⋅sin b)/(s

2

+a

2

).

Laplace transform theorems

To help you determine the Laplace transform of functions you can use a number
of theorems, some of which are listed below. A few examples of the theorem
applications are also included.

Θ Differentiation theorem for the first derivative. Let f

o

be the initial condition

for f(t), i.e., f(0) = f

o

, then

L{df/dt} = s

⋅F(s) - f

o

.

Θ Differentiation theorem for the second derivative. Let f

o

= f(0), and (df/dt)

o

= df/dt|

t=0

, then L{d

2

f/dt

2

} = s

2

⋅F(s) - s⋅f

o

– (df/dt)

o

.

Example 1 – The velocity of a moving particle v(t) is defined as v(t) = dr/dt,
where r = r(t) is the position of the particle. Let r

o

= r(0), and R(s) =L{r(t)}, then,

the transform of the velocity can be written as V(s) = L{v(t)}=L{dr/dt}= s

⋅R(s)-r

o

.