HP 40gs User Manual

14-66

Computer Algebra System (CAS)

ILAP is the inverse Laplace transform of a given
expression. Again, the expression is the value of a
function of the variable stored in VX.

Laplace transform (LAP) and inverse Laplace transform
(ILAP) are useful in solving linear differential equations
with constant coefficients, for example:

The following relations hold:

where c is a closed contour enclosing the poles of f.

The following property is used:

The solution, y, of:

is then:

Example

To solve:

c

type:

LAP(X · EXP(3 · X))

The result is:

y

″ p y′

⋅

q y

⋅

+

+

f x

( )

=

y 0

( )

a y

′ 0

( )

b

=

=

LAP(y)(x)

e

x

–

t

⋅

y t

( ) t

d

0

+

∞

∫

=

ILAP(f)(x)

1

2i

π

--------

e

zx

f z

( ) z

d

c

∫

⋅

=

LAP y

′

( ) x

( )

y 0

( )

–

x LAP y

( ) x

( )

⋅

+

=

y

″ p y′

⋅

q y

⋅

+

+

f x

( ), y 0

( )

a, y

′ 0

( )

b

=

=

=

ILAP

LAP f x

( )

(

)

x p

+

(

) a b

+

⋅

+

x

2

px q

+

+

-------------------------------------------------------------------

⎝

⎠

⎛

⎞

y

″ 6

–

y

′

⋅

9 y

⋅

+

x e

3x

⋅

, y 0

( )

a, y

′ 0

( )

b

=

=

=

1

x

2

6x

–

9

+

--------------------------

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