HP 48gII User Manual

Page 16-16

An interpretation for the integral above, paraphrased from Friedman (1990),
is that the

δ-function “picks out” the value of the function f(x) at x = x

0

. Dirac’s

delta function is typically represented by an upward arrow at the point x = x0,
indicating that the function has a non-zero value only at that particular value
of x

0

.

Heaviside’s step function, H(x), is defined as







<

>

=

0

,

0

0

,

1

)

(

x

x

x

H

Also, for a continuous function f(x),

Dirac’s delta function and Heaviside’s step function are related by dH/dx =
δ(x). The two functions are illustrated in the figure below.

You can prove that L{H(t)} = 1/s,
from which it follows that L{U

o

⋅H(t)} = U

o

/s,

where U

o

is a constant. Also, L

-1

{1/s}=H(t),

and L

-1

{ U

o

/s}= U

o

⋅H(t).

Also, using the shift theorem for a shift to the right, L{f(t-a)}=e

–as

⋅L{f(t)} =

e

–as

⋅F(s), we can write L{H(t-k)}=e

–ks

⋅L{H(t)} = e

–ks

⋅(1/s) = (1/s)⋅e

–ks

.

∫

∫

∞

∞

−

∞

=

−

0

.

)

(

)

(

)

(

0

x

dx

x

f

dx

x

x

H

x

f