HP 48gII User Manual

Page 16-44

integration of the form

∫

⋅

⋅

=

b

a

dt

t

f

t

s

s

F

.

)

(

)

,

(

)

(

κ

The function

κ(s,t) is

known as the kernel of the transformation.

The use of an integral transform allows us to resolve a function into a given
spectrum of components. To understand the concept of a spectrum, consider
the Fourier series

(

)

,

sin

cos

)

(

1

0

∑

∞

=

⋅

+

⋅

+

=

n

n

n

n

n

x

b

x

a

a

t

f

ω

ω

representing a periodic function with a period T. This Fourier series can be

re-written as

∑

∞

=

+

⋅

+

=

1

0

),

cos(

)

(

n

n

n

n

x

A

a

x

f

φ

ϖ

where

,

tan

,

1

2

2









=

+

=

−

n

n

n

n

n

n

a

b

b

a

A

φ

for n =1,2, …
The amplitudes A

n

will be referred to as the spectrum of the function and will

be a measure of the magnitude of the component of f(x) with frequency f

n

=

n/T. The basic or fundamental frequency in the Fourier series is f

0

= 1/T, thus,

all other frequencies are multiples of this basic frequency, i.e., f

n

= n

⋅f

0

. Also,

we can define an angular frequency,

ω

n

= 2n

π/T = 2π⋅f

n

= 2

π⋅ n⋅f

0

= n

⋅ω

0

,

where

ω

0

is the basic or fundamental angular frequency of the Fourier series.

Using the angular frequency notation, the Fourier series expansion is written
as

∑

∞

=

+

⋅

+

=

1

0

).

cos(

)

(

n

n

n

n

x

A

a

x

f

φ

ω

(

)

∑

∞

=

⋅

+

⋅

+

=

1

0

sin

cos

n

n

n

n

n

x

b

x

a

a

ω

ω