HP 50g Graphing Calculator User Manual

Page 16-46

The continuous spectrum, F(

ω), is calculated with the integral:

This result can be rationalized by multiplying numerator and denominator by
the conjugate of the denominator, namely, 1-i

ω. The result is now:

which is a complex function.

The absolute value of the real and imaginary parts of the function can be
plotted as shown below

Notes:
The magnitude, or absolute value, of the Fourier transform, |F(

ω)|, is the

frequency spectrum of the original function f(t). For the example shown above,
|F(

ω)| = 1/[2π(1+ω

2

)]

1/2

. The plot of |F(

ω)| vs. ω was shown earlier.

Some functions, such as constant values, sin x, exp(x), x

2

, etc., do not have

Fourier transform. Functions that go to zero sufficiently fast as x goes to infinity
do have Fourier transforms.

∫

∫

+

−

∞

∞

→

+

−

=

ε

ω

ε

ω

π

π

0

)

1

(

0

)

1

(

2

1

lim

2

1

dt

e

dt

e

t

i

t

i

.

1

1

2

1

1

)

)

1

(

exp(

1

2

1

lim

ω

π

ω

ω

π

ε

i

i

t

i

+

⋅

=

⎥⎦

⎤

⎢⎣

⎡

+

+

−

−

=

∞

→

⎟

⎠

⎞

⎜

⎝

⎛

−

−

⋅

⎟

⎠

⎞

⎜

⎝

⎛

+

⋅

=

+

⋅

=

ω

ω

ω

π

ω

π

ω

i

i

i

i

F

1

1

1

1

2

1

1

1

2

1

)

(

⎟

⎠

⎞

⎜

⎝

⎛

+

⋅

−

+

=

2

2

1

1

1

2

1

ω

ω

ω

π

i