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communication-systems-solution-manual-5th-edition

Solutions Manual for:
Communications Systems,
5th edition
by
Karl Wiklund, McMaster University,
Hamilton, Canada
Michael Moher, Space-Time DSP
Ottawa, Canada
and
Simon Haykin, McMaster University,
Hamilton, Canada
Published by Wiley, 2009.
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
Chapter 2
2.1 (a)
g (t ) = A cos(2π f c t )
fc =
⎡ −T T ⎤
t∈⎢ , ⎥
⎣ 2 2⎦
1
T
We can rewrite the half-cosine as:
⎛t ⎞
A cos(2π f c t ) ⋅ rect ⎜ ⎟
⎝T ⎠
Using the property of multiplication in the time-domain:
G ( f ) = G1 ( f ) ∗ G2 ( f )
1
sin(π fT )
[δ ( f − fc ) + δ ( f + fc )] ∗ AT
π fT
2
Writing out the convolution:
∞
AT ⎛ sin(πλT ) ⎞
G( f ) = ∫
⎜
⎟ [δ (λ − ( f + f c ) + δ (λ − ( f − f c ) ] d λ
2
T
πλ
⎝
⎠
−∞
=
A ⎛ sin(π ( f + f c )T ) sin(π ( f − f c )T ) ⎞
+
⎜
⎟
f + fc
f − fc
2π ⎝
⎠
⎛
⎞
A ⎜ cos(π fT ) cos(π fT ) ⎟
=
−
⎜
1 ⎟
2π ⎜ f − 1
⎟
f+
2T
2T ⎠
⎝
=
fc =
1
2T
(b)By using the time-shifting property:
T
g (t − t0 ) R exp(− j 2π ft0 )
t0 =
2
⎛
⎞
A ⎜ cos(π fT ) cos(π fT ) ⎟
G( f ) =
−
⋅ exp(− jπ fT )
⎜
1 ⎟
2π ⎜ f − 1
⎟
f+
⎝
2T
2T ⎠
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
(c)The half-sine pulse is identical to the half-cosine pulse except for the centre frequency
and time-shift.
fc =
1
2Ta
⎡ cos(π fTa ) cos(π fTa ) ⎤
−
⎢
⎥ ⋅ (cos(π fTa ) − j sin(π fTa ))
f + fc ⎦
⎣ f − fc
A ⎡ cos(2π fTa ) cos(2π fTa )
sin(2π fTa )
sin(2π fTa) ⎤
=
−
+j
−j
⎢
⎥
4π ⎣ f − f c
f + fc
f − fc
f + fc ⎦
G( f ) =
=
A
2π
A ⎡ exp(− j 2π fTa ) exp(− j 2π fTa ) ⎤
−
⎢
⎥
4π ⎣
f − fc
f + fc
⎦
(d) The spectrum is the same as for (b) except shifted backwards in time and multiplied
by -1.
⎛
⎞
A ⎜ cos(π fT ) cos(π fT ) ⎟
−
⋅ exp( jπ fT )
G( f ) =
⎜
1 ⎟
2π ⎜ f − 1
⎟
f+
2T
2T ⎠
⎝
⎡
⎤
A ⎢ exp( j 2π fT ) exp( j 2π fT ) ⎥
=
−
⎢
⎥
1
4π ⎢ f − 1
⎥
f+
2T
2T ⎦
⎣
(e) Because the Fourier transform is a linear operation, this is simply the summation of
the results from (b) and (d)
⎡
⎤
A ⎢ exp( j 2π fT ) + exp(− j 2π fT ) exp( j 2π fT ) + (− j 2π fT ) ⎥
−
G( f ) =
⎢
⎥
1
1
4π ⎢
⎥
f−
f+
2T
2T
⎣
⎦
⎡
⎤
A ⎢ cos(2π fT ) cos(2π fT ) ⎥
=
−
⎢
1 ⎥
2π ⎢ f − 1
⎥
f+
2T
2T ⎦
⎣
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.2
g (t ) = exp(−t ) sin(2π f c t )u(t )
= ( exp(−t )u(t ) )( sin(2π f c t ) )
⎡1
⎤
1
∗ ⎢ (δ ( f − f c ) − δ ( f + f c ) ) ⎥
1 + j 2π f ⎣ 2 j
⎦
⎤
1 ⎡
1
1
=
−
⎢
⎥
2 j ⎣1 + j 2π ( f − f c ) 1 + j 2π ( f + f c ) ⎦
∴ G( f ) =
2.3 (a)
g (t ) = g e (t ) + g o (t )
1
[ g (t ) + g (−t )]
2
⎛ t ⎞
g e (t ) = Arect ⎜
⎟
⎝ 2T ⎠
g e (t ) =
1
[ g (t ) − g (−t )]
2
⎛
⎛ 1 ⎞
⎛ 1
⎜
⎜ t − 2T ⎟
⎜ t + 2T
−
g o (t ) = A ⎜ rect ⎜
rect
⎟
⎜
⎜⎜
⎜ T ⎟
⎜ T
⎝
⎠
⎝
⎝
g o (t ) =
⎞⎞
⎟⎟
⎟⎟
⎟ ⎟⎟
⎠⎠
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
(b)
By the time-scaling property g(-t) R G(-f)
1
[G ( f ) + G (− f ) ]
2
1
= [sinc( fT ) exp(− j 2π fT ) + sinc( fT ) exp( j 2π fT ) ]
2
= sinc( fT ) cos(π fT )
Ge ( f ) =
1
[G ( f ) − G (− f )]
2
1
= [sinc( fT ) exp(− j 2π fT ) − sinc( fT ) exp( j 2π fT ) ]
2
= − jsinc( fT ) sin(π fT )
Go ( f ) =
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.4. We need to find a function with the stated properties.
We can verify that:
G ( f ) = − j sgn( f ) + ju( f − W ) − ju(− f − W )
meets the stated criteria.
By duality g(f) R G(-t)
⎛1
1 ⎞
j ⎜ δ (t ) −
⎟ exp(− j 2π Wt ) −
j 2π t ⎠
⎝2
1
sin(2π Wt )
= +j
2π t
πt
g (t ) =
2.5
1
+
πt
g (t ) =
=
⎛1
1 ⎞
j ⎜ δ (t ) −
⎟ exp( j 2π Wt )
j 2π t ⎠
⎝2
t +T
⎛ π u2 ⎞
exp
⎜ − 2 ⎟ du
τ t −∫T
⎝ τ ⎠
1
1
τ
0
∫
h(τ )dτ +
t −T
1
τ
t +T
∫ h(τ )dτ
0
dg (t )
1
1
= − h(t − T ) + h(t + T )
dt
τ
τ
By the differentiation property:
⎛ dg (t ) ⎞
F⎜
⎟ = j 2π fG ( f )
⎝ dt ⎠
1
= [ H ( f ) exp( j 2π f τ ) − H ( f ) exp(− j 2π f τ )]
τ
=
2j
τ
H ( f ) sin(2π f τ )
But H ( f ) = τ exp(−π f 2τ 2 )
1
exp(−π f 2τ 2 ) sin(2π fT )
∴ G( f ) =
πf
sin(2π fT )
= exp(−π f 2τ 2 )
πf
= 2T exp(−π f 2τ 2 )sinc(2π fT )
lim G ( f ) = 2Tsinc(2π fT )
τ →0
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.6 (a)
1
[ g (t ) + g (−t )]
2
and g (t ) = g * (t ) ⇒ G ( f ) = G* (− f )
g (t ) =
If g(t) is even and real then
1
G* ( f ) = [G* ( f ) + G * (− f )]
2
1 *
1
G ( f ) = G* (− f )
2
2
*
G ( f ) = G( f )
∴ G ( f ) is all real
If g(t) is odd and real then
1
[ g (t ) − g (−t )]
2
and g (t ) = g * (t ) ⇒ G ( f ) = G* (− f )
g (t ) =
1
G ( f ) = [G ( f ) − G (− f )]
2
1
1
G* ( f ) = G* ( f ) − G* (− f )
2
2
*
*
G ( f ) = −G (− f )
G* ( f ) = −G ( f )
∴ G ( f ) must be all imaginary
(b)
(− j 2π t )G (t ) R
t ⋅ G (t ) R
d
g (− f ) by duality
df
j d
g (− f )
2π df
The previous step can be repeated n times so:
dn
(− j 2π ft ) n G (t ) R n g (− f )
df
But each factor (− j 2π ft ) represents another differentiation.
n
⎛ j ⎞ (n)
t n ⋅ G (t ) R ⎜
⎟ g (− f )
⎝ 2π ⎠
Replacing g with h
n
⎛ j ⎞ (n)
t n h(t ) R ⎜
⎟ H (f)
⎝ 2π ⎠
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
(c)
n
⎛ j ⎞ (n)
Let h(t ) = t g (t ) and H ( f ) = ⎜
⎟ G (f)
⎝ 2π ⎠
n
∞
n
⎛ j ⎞ (n)
∫−∞ h(t )dt = H (0) = ⎜⎝ 2π ⎟⎠ G (0)
(d)
g1 (t ) R G1 ( f )
g 2* (t ) R G2 (− f )
∞
g1 (t ) g 2 (t ) R
∫ G (λ )G ( f − λ )d λ
1
2
−∞
∞
g1 (t ) g 2* (t ) R
∫ G (λ )G (−( f − λ ))d λ
1
2
−∞
∞
=
∫ G (λ )G (λ − f )d λ
1
2
−∞
(e)
∞
g1 (t ) g 2* (t ) R
∫ G (λ )G (λ − f )d λ
1
2
−∞
∞
∫ g (t ) g (t )dt R G(0)
1
*
2
−∞
∞
∫
−∞
∞
g1 (t ) g 2* (t )dt R ∫ G1 (λ )G2 (λ − 0)d λ
−∞
∞
∞
∫ g (t ) g (t )dt R ∫ G (λ )G (λ )d λ
1
−∞
*
2
1
2
−∞
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.7 (a)
g (t ) R ATsinc 2 ( fT )
∞
∫
g (t ) dt = AT
−∞
max G ( f ) = G (0)
= ATsinc 2 (0)
= AT
∴ The first bound holds true.
(b)
∞
∫
−∞
dg (t )
dt = 2 A
dt
j 2π fG ( f ) = 2π fATsinc 2 ( fT )
= 2π fAT
= 2A
But,
sin(π fT ) sin(π fT )
⋅
π fT
π fT
sin(π fT )
⋅ sin(π fT )
π fT
sin(π fT ) ≤ 1 ∀f and sinc(π fT ) ≤ 1 ∀f
∴ 2A
sin(π fT )
⋅ sin(π fT ) ≤ 2 A
π fT
∴ j 2π fG ( f ) ≤ 2 A
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.7 c)
( j 2π f ) 2 G ( f ) = 4π 2 f 2G ( f )
sin 2 (π fT )
= 4π f AT
(π fT ) 2
2
2
4A 2
sin (π fT )
T
4A
≤
T
=
The second derivative of the triangular pulse is plotted as:
Integrating the absolute value of the delta functions gives:
∞
∫
−∞
d 2 g (t )
4A
dt =
2
dt
T
∴ ( j 2π f ) 2 G ( f ) ≤
∞
∫
−∞
d 2 g (t )
dt
dt 2
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.8. (a)
g1 (t ) ∗ g 2 (t ) R G1 ( f )G2 ( f )
= G2 ( f )G1 ( f ) by the commutative property of multiplication
b)
g1 ( f ) ∗ [ g 2 ( f ) ∗ g 3 ( f ) ] R G1 ( f ) [G2 ( f )G3 ( f ) ]
Because multiplication is commutative, the order of the multiplication
doesn't matter.
∴ G1 ( f ) [G2 ( f )G3 ( f ) ] = [G1 ( f )G2 ( f ) ] G3 ( f )
∴ G1 ( f ) [G2 ( f )G3 ( f ) ] R [ g1 ( f ) ∗ g 2 ( f ) ] ∗ g3 ( f )
c)
Taking the Fourier transform gives:
G1 ( f ) [G2 ( f ) + G3 ( f )]
Multiplication is distributive so:
G1 ( f )G2 ( f ) + G2 ( f )G 3 ( f ) R g1 (t ) g 2 (t ) + g1 (t ) g 2 (t )
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.9 a)
Let h(t ) = g1 (t ) ∗ g 2 (t )
dh(t )
R j 2π fH ( f )
dt
= j 2π fG1 ( f )G2 ( f )
= ( j 2π fG1 ( f ) ) G2 ( f )
( j 2π fG1 ( f ) ) G2 ( f ) R ⎡⎢
dg1 (t ) ⎤
∗ g 2 (t )
⎣ dt ⎥⎦
∴
d
dg (t )
[ g1 (t ) ∗ g 2 (t )] = ⎡⎢ 1 ⎤⎥ ∗ g 2 (t )
dt
⎣ dt ⎦
b)
t
∫ g (t ) ∗ g (t )dt R
1
2
−∞
1
G (0)G2 (0)
δ( f )
G1 ( f )G2 ( f ) + 1
j 2π f
2
⎡ 1
⎤
⎡ G (0)
⎤
=⎢
G1 ( f ) ⎥ G2 ( f ) + ⎢ 1 δ ( f ) ⎥ G2 ( f )
⎣ 2
⎦
⎣ j 2π f
⎦
⎡ 1
⎤
G (0)
=⎢
G1 ( f ) + 1 δ ( f ) ⎥ G2 ( f )
2
⎣ j 2π f
⎦
t
⎡t
⎤
∴ ∫ g1 (t ) ∗ g 2 (t )dt = ⎢ ∫ g1 (t ) ⎥ ∗ g 2 (t )
−∞
⎣ −∞
⎦
t
2.10.
Y( f ) =
∫ X (ν ) X ( f −ν )dν
−∞
X (ν ) ≠ 0 if ν ≤ W
X ( f −ν ) ≠ 0 if f −ν ≤ W
( f −ν ) ≤ W for f ≤ W +ν when ν ≥ 0 and ν ≤ W
( f −ν ) ≥ −W for f ≤ −W +ν when ν ≤ 0 and ν ≥ −W
∴ ( f −ν ) ≤ W for 0 ≤ ν ≤ W when f ≤ 2W
( f −ν ) ≥ −W for -W ≤ ν ≤ 0 when f ≥ −2W
∴ Over the range of integration [ −W ,W ] , the integral is non-zero if
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
f ≤ 2W
2.11 a) Given a rectangular function: g (t ) =
1
⎛t ⎞
rect ⎜ ⎟ , for which the area under g(t) is
T
⎝T ⎠
always equal to 1, and the height is 1/T.
1
⎛t
rect ⎜
T
⎝T
⎞
⎟ R sinc( fT )
⎠
Taking the limits:
1
⎛t⎞
lim rect ⎜ ⎟ = δ (t )
T →0 T
⎝T ⎠
1
lim sinc( fT ) = 1
T →0 T
b)
g (t ) = 2Wsinc(2Wt )
⎛ f ⎞
2Wsinc(2Wt ) R rect ⎜
⎟
⎝ 2W ⎠
lim 2Wsinc(2Wt ) = δ (t )
W →∞
⎛ 2 ⎞
lim rect ⎜
⎟ =1
⎝ 2W ⎠
W →∞
2.12.
1 1
+ sgn( f )
2 2
By duality:
G( f ) =
1
1
G ( f ) R δ ( −t ) −
j 2π t
2
j
1
∴ g (t ) = δ (t ) +
2
2π t
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.13. a) By the differentiation property:
2
( j 2π f ) G ( f ) = ∑ ki exp(− j 2π fti )
i
∴G( f ) = −
1
4π 2 f 2
∑ k exp(− j 2π ft )
i
i
i
b)the slope of each non-flat segment is: ±
A
tb − t a
⎛ 1 ⎞⎛ A ⎞
G( f ) = − ⎜ 2 2 ⎟ ⎜
⎟ [ exp( j 2π ftb ) − exp( j 2π fta ) − exp( j 2π fta ) + exp( j 2π ftb ) ]
⎝ 4π f ⎠ ⎝ tb − ta ⎠
A
=− 2 2
[cos(2π ftb ) − cos(2π fta )]
2π f ( tb − ta )
1
But: sin(π f (tb − ta )) sin(π f (tb + ta )) = [ cos(2π fta ) − cos(2π ftb ) ] by a trig identity.
2
A
∴ G( f ) = 2 2
[sin(π f (tb − ta )) sin(π f (tb + ta ))]
π f (tb − ta )
2.14 a) let g(t) be the half cosine pulse of Fig. P2.1a, and let g(t-t0) be its time-shifted
counterpart in Fig.2.1b
ε = G ( f )G* ( f )
= G( f )
2
( G ( f ) exp(− j 2π ft0 ) ) ( G* ( f ) exp( j 2π ft0 ) ) =
G ( f ) exp(− j 2π ft0 ) exp( j 2π ft0 )
( G ( f ) exp(− j 2π ft0 ) ) ( G* ( f ) exp( j 2π ft0 ) ) =
G( f )
2
2
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.14 b)Given that the two energy densities are equal, we only need to prove the result for
one. From before, it was shown that the Fourier transform of the half-cosine pulse was:
AT
1
[sinc(( f + fc )T ) + sinc(( f − f c )T )] for fc =
2
2T
After squaring, this becomes:
sin(π ( f + f c )T ) sin(π ( f − f c )T ) ⎤
A2T 2 ⎡ sin 2 (π ( f + f c )T ) sin 2 (π ( f − f c )T )
+
+
2
⎢
⎥
4 ⎣ (π ( f + f c )T ) 2
(π ( f − f c )T ) 2
π 2T 2 ( f + f c )( f − f c )
⎦
The first term reduces to:
π⎞
⎛
sin 2 ⎜ π fT + ⎟
2
cos 2 (π fT )
2 ⎠ cos (π fT )
⎝
=
=
2
2
2
π⎞
π ⎞ π 2T 2 ( f + f c )
⎛
⎛
⎜ π fT + ⎟
⎜ π fT + ⎟
2⎠
2⎠
⎝
⎝
The second term reduces to:
π⎞
⎛
sin 2 ⎜ π fT − ⎟
cos 2 (π fT )
2⎠
⎝
= 2 2
2
2
π⎞
π T ( f − fc )
⎛
−
π
fT
⎜
⎟
2⎠
⎝
The third term reduces to:
sin(π ( f + f c )T ) sin(π ( f − f c )T ) cos(π ) − cos 2 (2π fT )
=
1 ⎞
π 2T 2 ( f + f c )( f − f c )
⎛
π 2T 2 ⎜ f 2 − 2 ⎟
4T ⎠
⎝
−1 − cos(2π fT )
=
1 ⎞
⎛
π 2T 2 ⎜ f 2 − 2 ⎟
4T ⎠
⎝
2 cos 2 (π fT )
=−
1 ⎞
⎛
π 2T 2 ⎜ f 2 − 2 ⎟
4T ⎠
⎝
Summing these terms gives:
⎡
⎤
⎥
2
2
2 2 ⎢
2
cos (π fT )
A T ⎢ cos (π fT ) cos (π fT )
⎥
+
−2
2
2
1
1
⎥
4π 2T 2 ⎢ ⎛
⎛
⎞
⎛
⎞
1 ⎞
1
⎛
⎞
⎜f+
⎟⎜ f −
⎟⎥
⎢⎜ f +
⎟
⎜f−
⎟
2T ⎠ ⎝
2T ⎠ ⎦
⎝
2T ⎠
2T ⎠
⎝
⎣⎝
2
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.14 b)Cont’d
By rearranging the previous expression, and summing over a common denominator, we
get:
⎡
⎤
⎥
2 2 ⎢
2
A T ⎢ cos (π fT ) ⎥
2
4π 2T 2 ⎢ ⎛ 2
1 ⎞ ⎥
⎢⎜ f − 2 ⎟ ⎥
4T ⎠ ⎦
⎣⎝
⎡
⎤
⎥
A2T 2 ⎢
cos 2 (π fT )
= 2 4⎢
⎥
4π T ⎢ 1 1 4T 2 f 2 − 1 2 ⎥
(
)
⎣ 16 T 4
⎦
⎡
⎤
A2T 2 cos 2 (π fT ) ⎥
= 2 ⎢
π ⎢ ( 4T 2 f 2 − 1)2 ⎥
⎣
⎦
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
dg (t )
R j 2π fG ( f )
dt
2.15 a)The Fourier transform of
Let g '(t ) =
dg (t )
dt
∞
By Rayleigh’s theorem:
∞
∫
g (t ) dt =
2
−∞
∴W T
2
2
∫t
=
∫t
=
2
2
∫ G( f )
2
df
−∞
g (t ) dt ⋅ ∫ f 2 G ( f ) df
2
(∫
2
2
g (t ) dt
)
2
g (t ) dt ⋅ ∫ g '(t ) g '* (t )dt
2
4π 2
( ∫ g (t ) dt )
2
2
⎡ t 2 g * (t ) g '(t ) − tg (t )g '* (t )dt ⎤
∫
⎦
≥⎣
2
2
16π 2 ∫ g (t ) dt
(
)
d
⎡
⎤
*
⎢⎣ ∫ t ⋅ dt ( g (t ) g (t ) ) dt ⎥⎦
=
2
16π 2 ∫ g (t ) g * (t )dt
(
2
2
)
Using integration by parts, we can show that:
∞
∞
d
2
2
t
⋅
g
(
t
)
dt
=
∫−∞ dt
∫−∞ g (t )
1
16π 2
1
∴WT ≥
4π
∴W 2T 2 ≥
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.15 b) For g (t ) = exp(−π t 2 )
g (t ) R exp(−π f 2 )
∞
∴W 2T 2 =
∞
2
2
2
2
∫ t exp(−2π t )dt ⋅ ∫ f exp(−2π f )df
−∞
∞
−∞
∫ exp(−2π t
2
)dt
−∞
Using a table of integrals:
∞
∫x
2
exp(−ax 2 )dx =
0
1 π
4a a
∞
∴ ∫ t 2 exp(−2π t 2 )dt =
−∞
∞
∫
1 1
4π 2
f 2 exp(−2π t 2 )df =
−∞
∞
∫ exp(−2π t
2
)=
−∞
⎛ 1
⎜
4π
2
2
∴T W = ⎝
for a > 0
1
4π
1
2
1
2
1⎞
⎟
2⎠
2
1
2
⎛ 1 ⎞
=⎜
⎟
⎝ 4π ⎠
1
∴TW =
4π
2
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.16.
∞
Given:
∞
∫
x(t ) dt < ∞ and
2
−∞
∫
∞
h(t ) dt < ∞, which implies that
−∞
∞
However, if
∫
∫
h(t ) dt < ∞ .
−∞
∞
x(t ) dt < ∞ then
2
−∞
∫
∞
X ( f ) df < ∞ and
2
−∞
∫
X ( f ) df < ∞ . This result also
4
−∞
applies to h(t).
Y( f ) = H( f )X ( f )
∞
∞
∫
Y ( f ) df =
2
−∞
∫ X ( f )H ( f ) ⋅ X
*
( f ) H * ( f )df
−∞
∞
=
∫
2
2
X ( f ) H ( f ) df
−∞
2
∞
∫
2
Y ( f ) df
−∞
∞
≤
∫
∞
4
X ( f ) df
−∞
∫
4
H ( f ) df
−∞
<∞
∞
∴
∫ Y( f )
2
df < ∞
−∞
∞
By Rayleigh’s theorem:
∫ Y( f )
−∞
∞
2
df = ∫ y (t ) dt
2
−∞
∞
∴ ∫ y (t ) dt < ∞
2
−∞
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.17.
The transfer function of the summing block is: H1 ( f ) = [1 − exp(− j 2π fT ) ] .
The transfer function of the integrator is: H 2 ( f ) =
1
j 2π f
These elements are cascaded :
H ( f ) = ( H1 ( f ) H 2 ( f ) ) ⋅ ( H1 ( f ) H 2 ( f ) )
=−
=−
1
( 2π f )
2
[1 − exp(− j 2π fT )]
2
[1 − 2 exp(− j 2π fT ) + exp(− j 4π fT )]
2
1
( 2π f )
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.18.a) Using the Laplace transform representation of a single stage, the transfer function
is:
1
H 0 (s) =
1 + RCs
1
=
1+τ 0s
H0 ( f ) =
1
1 + j 2π f τ 0
These units are cascaded, so the transfer function for N stages is:
H ( f ) = ( H ( f ))
N
⎛
⎞
1
=⎜
⎟
⎝ 1 + j 2π f τ 0 ⎠
N
T2
4π 2 N
⎛
⎞
1
ln H ( f ) = N ln ⎜
⎟
⎝ 1 + j 2π f τ 0 ⎠
= − N ln (1 + j 2π f τ 0 )
b) For N→∞, and τ 02 =
jfT ⎞
⎛
= − N ln ⎜ 1 +
⎟
N⎠
⎝
jfT
let z =
, then for very large N , z < 1
N
∴ We can use the Taylor series expansion of ln(1 + z )
⎡∞ 1
⎤
m +1
− N ln(1 + z ) = − N ⎢ ∑ ( −1) z m ⎥
⎣ m =1 m
⎦
m
⎡∞ 1
fT ⎞ ⎤
m +1 ⎛
= − N ⎢ ∑ ( −1) ⎜ j
⎟ ⎥
N ⎠ ⎦⎥
⎝
⎣⎢ m =1 m
(next page)
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.18 (b) Cont’d
Taking the limit as N→∞:
m
⎛
⎡∞ 1
⎛ fT
fT ⎞ ⎤ ⎞
f 2T 2 ⎞
m +1 ⎛
⎟
lim ⎜ − N ⎢ ∑ ( −1) ⎜ j
N
j
=
−
+
⎥
⎜
⎟
⎟ ⎟
N →∞ ⎜
2N ⎠
N
N
m =1 m
⎝
⎠
⎝
⎢
⎥
⎣
⎦
⎝
⎠
1
= − f 2T 2 − j N fT
2
1
∴ H ( f ) = exp(− f 2T 2 ) exp(− j N ft )
2
1
∴ H ( f ) = exp(− f 2T 2 )
2
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T
2.19.a) y (t ) =
∫ x(τ )dτ
t −T
This is the convolution of a rectangular function with x(τ). The interval of the
rectangular function is [(t-T),T], and the midpoint is T/2.
T
⎛t⎞
rect ⎜ ⎟ R Tsinc( fT ), but the function is shifted by .
2
⎝T ⎠
∴ H ( f ) = Tsinc( fT ) exp(− jπ fT )
b)BW =
1
1
=
RC T
H( f ) =
T
T
exp(− j 2π f )
1 + j 2 RCπ f
2
⎛
⎞
⎟
1
T ⎜
=
⎜ 1
⎟ exp(− jπ fT )
RC ⎜
+ j 2π f ⎟
⎝ RC
⎠
T
T ⎞
T
⎛ 1
∴ h(t ) =
exp ⎜ −
(t − ) ⎟ u (t − )
2 ⎠
2
RC
⎝ RC
T ⎞
T
⎛ 1
= exp ⎜ − (t − ) ⎟ u (t − )
2 ⎠
2
⎝ T
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.20. a) For the sake of convenience, let h(t) be the filter time-shifted so that it is
symmetric about the origin (t = 0).
N −1
2
−
k =1
k =−1
H ( f ) = ∑ wk exp(− j 2π fk ) +
N −1
2
∑w
k
exp(− j 2π fk ) + w0
N −1
2
= 2 ∑ wk cos(2π fk )
k =1
Let G(f) be the filter returned to its correct position. Then
⎛ N −1 ⎞
⎛ N −1 ⎞
G ( f ) = H ( f ) exp(− j 2π f ⎜
⎟ samples.
⎟) , which is a time-shift of ⎜
⎝ 2 ⎠
⎝ 2 ⎠
N −1
2
∴ G ( f ) = exp ( − jπ f ( N − 1) ) 2 ∑ wk cos(2π fk )
k =1
b)By inspection, it is apparent that:
)G ( f ) = ) exp(− jπ f ( N − 1))
This meets the definition of linear phase.
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.21 Given an ideal bandpass filter of the type shown in Fig P2.7, we need to find the
response of the filter for x(t ) = A cos(2π f 0t )
1
⎛ f − fc ⎞ 1
⎛ f + fc ⎞
rect ⎜
rect ⎜
⎟+
⎟
2B
⎝ 2B ⎠ 2B
⎝ 2B ⎠
1
X ( f ) = [δ ( f − f 0 ) + δ ( f − f 0 ) ]
2
If f c − f 0 is large compared to 2B, then the response is zero in the steady state.
H( f ) =
However:
⎛
⎞
A
A
A
A
+ δ ( f − f0 ) +
+ δ ( f + f0 ) ⎟
x(t )u (t ) R ⎜
j 2π ( f + f 0 ) 2
⎝ j 2π ( f − f 0 ) 2
⎠
Since f c − f 0 is large, assume that the portion of the amplitude spectrum lying inside the
passband is approximately uniform with a magnitude of
A
.
4π ( f c − f 0 )
The phase spectum of the input is plotted as:
The approximate magnitude and phase spectra of the output:
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Taking the envelope by retaining the positive frequency components, shifting them to the
origin, and scaling by 2:
⎧
⎛ ⎛π ⎞
⎞
⎪ A exp ⎜ − j ⎜ 2 ⎟ − j 2π ft0 ⎟
⎪
⎝ ⎝ ⎠
⎠ if − B < f < B
Y ( f ) ⎨
2π ( f c − f 0 )
⎪
⎪⎩0
otherwise
y (t ) =
AB
sinc [ 2 B(t − t0 )]
jπ ( f c − f 0 )
∴ y (t ) AB
sinc [ 2 B(t − t0 ) ] sin(2π f ct )
π ( fc − f0 )
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.22
H ( f ) = X (− f ) exp( j 2π fT )
A
T
[δ ( f − fc ) + δ ( f + f c )] ∗ Tsinc( fT ) exp(− j 2π f )
2
2
AT
=
[sinc(T (f − fc )) + sinc(T (f + fc ))] exp(− jπ fT )
2
N
Let f c =
for N large
T
X(f ) =
Y( f ) = H( f )X ( f )
= X (− f ) exp( j 2π fT ) exp(− jπ fT )
AT
⎡sinc (T ( f − f c ) ) + sinc (T ( f + f c ) ) ⎤⎦
2 ⎣
A2T 2
⎡sinc (T ( f − f c ) ) + sinc (T ( f + f c ) ) ⎤⎦ ⎡⎣sinc ( T (− f − f c ) ) + sinc (T (− f + f c ) ) ⎤⎦
4 ⎣
A2T 2
= exp( j 2π fT )
[sinc(− fT − N ) + sinc(− fT + N )][sinc( fT − N ) + sinc( fT + N )]
4
= exp( j 2π fT )
But sinc(x)=sinc(-x)
∴Y ( f ) = exp( j 2π fT )
A2T 2
[sinc( fT − N ) + sinc( fT + N )]
2
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.23 G(k)=G
gn =
1
N
N −1
∑ G (k ) exp( j
k =0
2π
k ⋅ n)
N
=
2π
G N −1
exp( j
k ⋅ n)
∑
N k =0
N
=
2π
2π
G N −1
cos( j
k ⋅ n) + j sin( j
k ⋅ n)
∑
N k =0
N
N
G N −1
∑1 = G
N k =0
For n ≠ 0 , we are averaging over one full wavelength of a sine or cosine, with regularly
sampled points. These sums must always be zero.
If n = 0, g (n) =
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.24. a) By the duality and frequency-shifting properties, the impulse response of an ideal
low-pass filter is a phase-shifted sinc pulse. The resulting filter is non-causal and
therefore not realizable in practice.
c)Refer to the appropriate graphs for a pictorial representation.
i)Δt=T/100
BT
5
10
20
100
Overshoot (%)
9,98
9.13
9.71
100
Ripple Period
1/5
1/10
1/20
No visible ripple
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2.24 (d)
Δt
T/100
T/150
T/200
Overshoot (%)
100
16.54
~0
Ripple Period
No visible ripple.
1/100
No visible ripple.
Discussion
Increasing B, which also increases the filter’s bandwidth, allows for more of the highfrequency components to be accounted for. These high-frequency components are
responsible for producing the sharper edges. However, this accuracy also depends on the
sampling rate being high enough to include the higher frequencies.
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.25
BT
5
10
20
100
Overshoot (%)
8.73
8.8
9.8
100
Ripple Period
1/5
1/10
1/20
-
The overshoot figures better for the raised cosine pulse that for the square pulse. This is
likely because a somewhat greater percentage of the pulse’s energy is concentrated at
lower frequencies, and so a greater percentage is within the bandwidth of the filter.
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2.26.b)
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2.26 b)
If B is left fixed, at B=1, and only T is varied, the results are as follows
BT
5
2
1
0.5
0.45
Max. Amplitude
1.194
1.23
1.34
0.612
0.286
As the centre frequency of the square wave increases, so does the bandwidth of the signal
(and its own bandwidth shifts its centre as well). This means that the filter passes less of
the signal’s energy, since more of it will lie outside of the pass band. This results in
greater overshoot.
However, as the frequency of the pulse train continues to increase, the centre frequency is
no longer in the pass band, and the resulting output will also be attenuated.
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
c)
BT
5
2
1
0.5
0.45
Max. Amplitude
1.18
1.20
1.27
0.62
0.042
Extending the length of the filter’s impulse response has allowed it to better approximate
the ideal filter in that there is less ripple. However, this does not extend the bandwidth of
the filter, so the reduction in overshoot is minimal. The dramatic change in the last entry
(BT=0.45) can be accounted for by the reduction in ripple.
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.27
a)At fs = 4000 and fs = 8000, there is a muffled quality to the signals. This improves
with higher sampling rates. Lower sampling rates throw away more of the signal’s high
frequencies, which results in a lower quality approximation.
b)Speech suffers from less “muffling” than do other forms of music. This is because a
greater percentage of the signal energy is concentrated at low frequencies. Musical
instruments create notes that have significant energy in frequencies beyond the human
vocal range. This is particularly true of instruments whose notes have sharp attack times.
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
2.28
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Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
Chapter 3
3.1
s(t) = Ac[1+kam(t)]cos(2πfc t)
where m(t) = sin(2πfs t)
and fs=5 kHz and fc = 1 MHz.
ka
(sin(2π ( f c + fs)t ) + sin(2π ( f c − f s )t )]
2
s(t) is the signal before transmission.
f
106
The filter bandwidth is: BW = c =
= 5714 Hz
Q 175
m(t) lies close to the 3dB bandwidth of the filter, m(t) is therefore attenuated by a factor
of a half.
∴ s (t ) = Ac [cos(2π f c t ) +
∴ m' (t ) = 0.5m(t )
or ka' = 0.5ka
∴ ka' = 0.25
The modulation depth is 0.25
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
3.2 (a)
v
) − 1]
VT
Using the Taylor series expansion of exp(x) up to the third order terms, we get:
i = I 0 [exp(−
2
3
v 1⎛ v ⎞ 1⎛ v ⎞
i = I 0 [− + ⎜ ⎟ − ⎜ ⎟ ]
VT 2 ⎝ VT ⎠ 6 ⎝ VT ⎠
(b) v(t ) = 0.01[cos(2π f mt ) + cos(2π f c t )]
Let θ = 2π t
fc + fm
f − fm
, φ = 2π t c
2
2
then v(t ) = 0.02[cos θ cos φ ]
∴ v 2 (t ) = 0.022 [1 + cos(2θ )][1 + cos(2φ )]
1
= 0.022 [1 + cos(2θ ) + cos(2φ ) + (cos(2θ + 2φ ) + cos(2θ − 2φ ))]
2
1
= 0.022 [1 + cos(2π ( f c + f m )t ) + cos(2π ( f c − f m )t ) + (cos(4π f c t ) + cos(4π f mt ))]
2
⎡ 3cos θ + cos 3θ ⎤ ⎡ 3cos φ + cos 3φ ⎤
v 3 (t ) = 0.023 ⎢
⎥⎦ ⎢⎣
⎥⎦
4
4
⎣
0.023 9
3
=
[ (cos(θ + φ ) + cos(θ − φ )) + (cos(θ + 3φ ) + cos(θ − 3φ )
16 2
2
3
1
+ (cos(3θ + φ ) + cos(3θ − φ )) + (cos(3θ + 3φ ) + cos(3θ − 3φ ))]
2
2
0.022 9
3
[ (cos(2π f ct ) + cos(2π f mt )) + (cos(2π (2 f c − f m )t ) + cos(2π (2 f m − ft )t )
16 2
2
3
1
+ (cos(2π (2 f c + f m )t ) + cos(2π (2 f m + f t )t )) + (cos(6π f c t ) + cos(6π f mt ))]
2
2
∴ v 3 (t ) =
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
The output will have spectral components at:
fm
fc
fc+ fm
fc- fm
2fc
2fm
2fc- fm
2fc+ fm
fc- 2fm
fc+2 fm
3fc
3fm
(c)
The bandpass filter must be symmetric and centred around fc . It must pass components
at fc+ fm, but reject those at fc+2 fm and higher.
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
(d)
Term #
1
2
3
Carrier
0.01
Message
0.0001
-6
2.25 x 10
After filtering and assuming a filter gain of 1, we get:
i (t ) = 0.41cos(2π f c t ) + 0.074[cos(2π ( f c − f m )t ) + cos(2π ( f c + f m )t )]
= 0.41cos(2π f c t ) + .148[cos(2π f c t ) cos(2π f mt )]
= [0.41 + 0.148cos(2π f mt )]cos(2π f c t )
= [1 + 0.36 cos(2π f mt )]cos(2π f c t )
∴ The modulation percentage is ~36%
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
Taylor Coef.
-38.46
739.6
-9.48 x 103
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3.10. The circuit can be rearranged as follows:
(a)
(b)
Let the voltage Vb-Vd be the voltage across the output resistor, with Vb and Vd being the
voltages at each node.
Using the voltage divider rule for condition (a):
Vb = V
Rb
,
R f + Rb
Vd = V
Rf
R f + Rb
,
Vb − Vd =V
Rb − R f
R f + Rb
and for (b):
Vb = −V
Rf
R f + Rb
,
Vd = −V
Rb
,
R f + Rb
Vb − Vd =V
− Rb + R f
R f + Rb
∴The two voltages are of the same magnitude, but are of the opposite sign.
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3.16 (a)
s (t ) =
1
1
a ⋅ Am Ac cos(2π ( f m + f c )t ) + (1 − a ) Am Ac cos(2π ( f m + f c )t )
2
2
Am Ac
[a(cos(2π f ct ) cos(2π f mt ) − sin(2π f c t ) sin(2π f mt ))
2
+ (1 − a)(cos(2π f c t ) cos(2π f mt ) + sin(2π f c t ) sin(2π f mt ))]
s (t ) =
Am Ac
[cos(2π f c t ) cos(2π f mt ) + (1 − 2a ) sin(2π f c t ) sin(2π f mt ))]
2
A
∴ m1 (t ) = m cos(2π f mt )
2
A
m2 (t ) = m (1 − 2a ) sin(2π f mt )
2
s (t ) =
b)Let:
s (t ) =
1
1
Ac m(t ) cos(2π f c t ) + Ac ms (t ) sin(2π f c t )
2
2
By adding the carrier frequency:
1
1
s (t ) = Ac [1 + ka m(t )]cos(2π f c t ) + ka Ac ms (t ) sin(2π f ct )
2
2
where ka is the percentage modulation.
After passing the signal through an envelope detector, the output will be:
2
2
⎧⎪ ⎡ 1
⎤ ⎡1
⎤ ⎫⎪
s (t ) = Ac ⎨ ⎢1 + ka m(t ) ⎥ + ⎢ ka ms (t ) ⎥ ⎬
⎦ ⎣2
⎦ ⎭⎪
⎩⎪ ⎣ 2
1
2
2
⎧ ⎡ 1
⎤ ⎫
ka ms (t ) ⎥ ⎪
⎪
⎡ 1
⎤ ⎪⎪ ⎢
= Ac ⎢1 + ka m(t ) ⎥ ⋅ ⎨1 + ⎢ 2
⎥ ⎬
1
⎣ 2
⎦ ⎪ ⎢1 + k m(t ) ⎥ ⎪
a
⎦ ⎭⎪
⎩⎪ ⎣ 2
1
2
The second factor in s (t ) is the distortion term d(t). For the example in (a), this
becomes:
2
⎧ ⎡1
⎤ ⎫
⎪⎪ ⎢ (1 − 2a ) sin(2π f mt ) ⎥ ⎪⎪
d (t ) = ⎨1 + ⎢ 2
⎥ ⎬
⎪ ⎢ 1 + 1 cos(2π f mt ) ⎥ ⎪
2
⎦ ⎭⎪
⎩⎪ ⎣
1
2
Copyright © 2009 John Wiley & Sons, Inc. All Rights Reserved.
c)Ideally, d(t) is equal to one. However, the distortion factor increases with decreasing a.
Therefore, the worst case exists when a = 0.
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3.20. m(t) contains {100,200,400} Hz
Ac
[m(t ) cos(2π f ct ) − mˆ (t ) sin(2π f c t )
2
Demodulation is accomplished using a product modulator and multiplying by:
Ac' cos(2π f c't )
The transmitted SSB signal is:
(a)
1
Ac Ac' cos(2π f c't )[m(t ) cos(2π f c t ) − mˆ (t ) cos(2π f c t )]
2
The only lowpass components will be those that are functions of only t and Δf. Higher
frequency terms will be filtered out, and so can be ignored for the purposes of
determining the output of the detector.
vo (t ) =
∴ vo (t ) =
1
Ac Ac' [m(t ) cos(2π f Δt ) − mˆ (t ) sin(2π f Δt )] by using basic trig identities.
4
When the upper side-band is transmitted, and Δf>0, the frequencies are shifted inwards
by Δf.
∴Vo ( f ) contains {99.98,199.98,399.98} Hz
(b) When the lower side-band is transmitted, and Δf>0, then the baseband frequencies are
shifted outwards by Δf.
∴Vo ( f ) contains {100.02, 200.02, 400.02} Hz
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f1 = f c − Δf − W
3.22.
f 2 = f c + Δf
v1 (t )v2 (t ) = A1 A2 cos(2π f1t + φ1 ) cos(2π f 2t + φ2 )
=
A1 A2
[cos(2π ( f1 − f 2 )t + φ1 − φ2 ) + cos(2π ( f1 + f 2 )t + φ1 + φ2 )]
2
The low-pass filter will only pass the first term.
1
∴ LFP(v1 (t )v2 (t )) = A1 A2 [cos(−2π (W + 2Δf )t + φ1 − φ2 )]
2
Let v0(t) be the final output, before band-pass filtering.
⎛ W + 2Δf ⎞
1
φ1 − φ2
A1 A2 [cos(−2π ⎜
) ⋅ A2 cos(2π f 2t + φ2 )]
⎟t +
2
⎝ W / Δf + 2 ⎠ W / Δf + 2
vo (t ) =
1
φ −φ
φ −φ
A1 A22 [cos(−2πΔft + 1 2 − φ2 ) ⋅ cos(2π f 2t + 1 2 + φ2 )]
2
n+2
n+2
φ −φ
φ −φ
1
= A1 A22 [cos(−2π ( f c + 2Δf ) + 1 2 − φ2 ) + cos(−2π f c t + 1 2 + φ2 )]
4
n+2
n+2
=
After band-pass filtering, retain only the second term.
1
φ −φ
A1 A22 [cos(−2π f c t + 1 2 + φ2 )
4
n+2
∴ vo (t ) =
φ1
φ2
+ φ2 = 0
n+2 n+2
rearranging and solving for φ2 :
−
φ2 = −
φ1
n +1
(b) At the second multiplier, replace v2(t) with v1(t).
expression for the phase:
φ1
n+2
φ1 =
−
φ2
n+2
This results in the following
+ φ1 = 0
φ2
n+3
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3.23. Assume that the mixer performs a multiplication of the two signals.
y1 (t ) ∈ {1, 2,3, 4,5, 6, 7,8,9} MHz
y2 (t ) ∈ {100, 200,300, 400,500, 600, 700,800,900} kHz
This system essentially produces a DSB-SC signal centred around the frequency of y1(t).
The lowest frequencies that can be produced are:
1
yo (t ) = [cos(2π ( f1 − f 2 )t ) + cos(2π ( f1 + f 2 )t )]
2
f1 = 1 MHz
f1 − f 2 = 0.9 MHz
f 2 = 100 kHz
f1 + f 2 = 1.1 MHz
The highest frequencies that can be produced are:
f1 = 9 MHz
f1 − f 2 = 8.1 MHz
f 2 = 900 kHz
f1 + f 2 = 9.9 MHz
The resolution of the system is the bandwidth of the output signal. Assuming that no
branch can be zeroed, the narrowest resolution occurs with a modulation frequency of
100 kHz. The widest bandwidth occurs when there is a modulation frequency of 900
kHz.
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3.24 Given the presence of the filters, only the baseband signals need to be considered.
All of the other product components can be discarded.
(a) Given the sum of the modulated carrier waves, the individual message signals are
extracted by multiplying the signal with the required carrier.
For m1(t), this results in the conditions:
cos(α1 ) + cos( β1 ) = 0
cos(α 2 ) + cos( β 2 ) = 0
cos(α 3 ) + cos( β 3 ) = 0
∴α i = β i ± π
For the other signals:
m2 (t ) :
cos(−α1 ) + cos(− β1 ) = 0
cos(α 2 − α1 ) + cos( β 2 − β1 ) = 0
cos(α 3 − α1 ) + cos( β3 − β1 ) = 0
α1 = β1 ± π
(α 2 − α1 ) = ( β 2 − β1 ) ± π
(α 3 − α1 ) = ( β 3 − β1 ) ± π
Similarly:
m3 (t ) :
(α1 − α 2 ) = ( β1 − β 2 ) ± π
(α 3 − α 2 ) = ( β 3 − β 2 ) ± π
m4 (t ) :
(α1 − α 3 ) = ( β1 − β 3 ) ± π
(α 2 − α 3 ) = ( β 2 − β 3 ) ± π
(b) Given that the maximum bandwidth of mi(t) is W, then the separation between fa and
fb must be | fa- fb|>2W in order to account for the modulated components corresponding to
fa- fb.
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3.25 b) The charging time constant is (rf + Rs )C = 1μ s
The period of the carrier wave is 1/fc = 50 μs.
The period of the modulating wave is 1/fm = 0.025 s.
∴The time constant is much shorter than the modulating wave and therefore should track
the message signal very well.
The discharge time constant is: Rl C = 100μ s . This is twice the period of the carrier wave,
and should provide some smoothing capability.
From a maximum voltage of V0, the voltage Vc across the capacitor after time t = Ts is:
T
Vc = V0 exp(− s )
Rl C
Using a Taylor series expansion and retaining only the linear terms, will result in the
T
linear approximation of VC = V0 (1 − s ) . Using this approximation, the voltage will
Rl C
decay by a factor of 0.94 from its initial value after a period of Ts seconds.
From the code, it can be seen that the voltage decay is close to this figure. However, it is
somewhat slower than what was calculated using the linear approximation. In a real
circuit, it would also be expected that the decay would be slower, as the voltage does not
simply turn off, but rather decreases over time.
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3.25 c)
The output of a high-pass RC circuit can be described according to:
V0 (t ) = I (t ) R
Qc (t ) = C (Vin (t ) − V0 (t ))
dQc
dt
⎛ dV (t ) dV (t ) ⎞
V0 (t ) = RC ⎜ in − 0 ⎟
dt ⎠
⎝ dt
Using first order differences to approximate the derivatives results in the following
difference equation:
RC
RC
V0 (t ) =
V0 (t − 1) +
(Vin (t ) − Vin (t − 1))
RC + Ts
RC + Ts
I (t ) =
The high-pass filter applied to the envelope detector eliminates the DC component.
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Problem 3.25. MATLAB code
function [y,t,Vc,Vo]=AM_wave(fc,fm,mi)
%Problem 3.25
%Inputs:
fc
%
fm
%
mi
Carrier Frequency
Modulation Frequency
modulation index
%Problem 3.25 (a)
fs=160000;
%sampling rate
deltaT=1/fs; %sampling period
t=linspace(0,.1,.1/deltaT); %Create the list of time periods
y=(1+mi*cos(2*pi*fm*t)).*cos(2*pi*fc*t); %Create the AM wave
%Problem 3.25 (b)
%%%%Create the envelope detector%%%%
Vc=zeros(1,length(y));
Vc(1)=0; %inital voltage
for k=2:length(y)
if (y(k)>(Vc(k-1)))
Vc(k)=y(k);
else
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Vc(k)=Vc(k-1)-0.023*Vc(k-1);
end
end
%Problem 3.25 (c)
%%%Implement the high pass filter%%%
%%This implements bias removal
Vo=zeros(1,length(y));
Vo(1)=0;
RC=.001;
beta=RC/(RC+deltaT);
for k=2:length(y)
Vo(k)=beta*Vo(k-1)+beta*(Vc(k)-Vc(k-1));
end
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Chapter 4 Problems
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Problem 4.7.
s (t ) = Ac cos(θ (t ))
θ (t ) = 2π f c t + k p m(t )
Let β = 0.3 for m(t) = cos(2πfmt).
∴ s (t ) = A c cos(2π f c t + β m(t ))
= Ac [cos(2π f c t ) cos( β cos(2π f mt )) − sin(2π f c t ) sin( β cos(2π f mt ))]
for small β :
cos( β cos(2π f mt )) 1
sin( β sin(2π f mt )) β cos(2π f mt )
∴ s (t ) = Ac cos(2π f ct ) − β Ac sin(2π f c t ) cos(2π fmt )
= Ac cos(2π f c t ) − β
Ac
[sin(2π ( f c + f m )t ) + sin(2π ( f c + f m )t )
2
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Problem 4.14.
v2 = av12
s (t ) = Ac cos(2π f c t + β sin(2π f mt ))
= Ac cos(2π f c t + β m(t ))
v2 = a ⋅ s 2 (t )
= a ⋅ cos 2 (2π f c t + β m(t ))
=
a
⋅ cos(4π f c t + 2 β m(t ))
2
The square-law device produces a new FM signal centred at 2fc and with a frequency
deviation of 2β. This doubles the frequency deviation.
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4.17. Consider the slope circuit response:
The response of |X1(f)| after the resonant peak is the same as for a single pole low-pass
filter. From a table of Bode plots, the following gain response can be obtained:
| X 1 ( f ) |=
1
⎛ f − fB ⎞
1+ ⎜
⎟
⎝ B ⎠
2
Where fB is the frequency of the resonant peak, and B is the bandwidth.
For the slope circuit, B is the filter’s bandwidth or cutoff frequency. For convenience, we
can shift the filter to the origin (with X 1 ( f ) as the shifted version).
| X 1 ( f ) |=
d | X 1 ( f ) |
df
1
⎛ f ⎞
1+ ⎜ ⎟
⎝B⎠
=−
f = kB
2
k
3
2 2
B(1 + k )
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Because the filters are symmetric about the central frequency, the contribution of the
second filter is identical. Adding the filter responses results in the slope at the central
frequency being:
d | X ( f ) |
df
=−
f = kB
2k
3
2 2
B(1 + k )
In the original definition of the slope filter, the responses are multiplied by -1, so do this
here. This results in a total slope of:
2k
3
2 2
B(1 + k )
As can be seen from the following plot, the linear approximation is very accurate
between the two resonant peaks. For this plot B = 500, f1=-750, and f2=750.
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Problem 4. 23
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Problem 4.24
The amplitude spectrum corresponding to the Gaussian pulse
p(t ) = c exp ⎡⎣ −π c 2t 2 ⎤⎦ * rect[t / T ]
is given by the magnitude of its Fourier transform.
(
)
P ( f ) = F ⎣⎡ c exp −π c 2t 2 ⎦⎤ F ⎡⎣ rect ( t / T ) ⎤⎦
= c exp ⎡⎣ −π f 2 c 2 ⎤⎦ Tsinc [ fT ]
where we have used the convolution theorem
Problem 4.25
The Carson rule bandwidth for GSM is
BT = 2 ( Δf + W )
where the peak deviation is given by
k c 1
Δf = f = B 2π / log(2) = 0.75 B
2π 4
With BT = 0.3 and T = 3.77 microseconds, the peak deviation is 59.7 kHz
From Figure 4.22, the one-sided 3-dB bandwidth of the modulating signal is
approximately 50 kHz. Combining these two results, the Carson rule bandwidth is
BT = 2 ( 59.7 + 50 )
= 219.4 kHz
The 1-percent FM bandwidth is given by Figure 4.9 with β =
vertical axis we find that
Δf 59.7
=
= 1.19 . From the
W
50
BT
= 6 , which implies BT = 6(59.7) = 358.2 kHz.
Δf
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Problem 4.26.
a)
Beta
1
2
5
10
# of side frequencies
1
2
8
14
b)By experimentation, a modulation index of 2.408, will force the amplitude of the
carrier to be about zero. This corresponds to the first root of J0(β), as predicted by the
theory.
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Problem 4.27.
a)Using the original MATLAB script, the rms phase error is 6.15 %
b)Using the plot provided, the rms phase error is 19.83%
Problem 4.28
a)The output of the detected signal is multiplied by -1. This results from the fact that
m(t)=cos(t) is integrated twice. Once to form the transmitted signal and once by the
envelope detector.
In addition, the signal also has a DC offset, which results from the action of the envelope
detector. The change in amplitude is the result of the modulation process and filters used
in detection.
f ⎞
⎛
b)If s (t ) = sin(2π f mt ) + 0.5cos ⎜ 2π m t ⎟ , then some form of clipping is observed.
3 ⎠
⎝
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The above signal has been multiplied by a constant gain factor in order to highlight the
differences with the original message signal.
c)The earliest signs of distortion start to appear above about fm =4.0 kHz. As the
message frequency may no longer lie wholly within the bandwidth of either the
differentiator or the low-pass filter. This results in the potential loss of high-frequency
message components.
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4.29. By tracing the individual steps of the MATLAB algorithm, it can be seen that the
resulting sequence is the same as for the 2nd order PLL.
e(t ) is the phase error φe (t ) in the theoretical model.
The theoretical model of the VCO is:
t
φ2 (t ) = 2π kv ∫ v(t )dt
0
and the discrete-time model is:
VCOState = VCOState + 2π kv (t − 1)Ts
which approximates the integrator of the theoretical model.
The loop filter is a PI-controller, and has the transfer function:
a
H ( f ) = 1+
jf
This is simply a combination of a sum plus an integrator, which is also present in the
MATLAB code:
Filterstate = Filterstate + e(t )
Integrator
v(t ) = Filterstate + e(t )
Integrator +input
b)For smaller kv, the lock-in time is longer, but the output amplitude is greater.
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c)The phase error increases, and tracks the message signal.
d)For a single sinusoid, the track is lost if f m ≥ K 0 where K 0 = k f kv Ac Av
For this question, K0=100 kHz, but tracking degrades noticeably around 60-70 kHz.
e)No useful signal can be extracted.
By multiplying s(t) and r(t), we get:
Ac Av
⎡sin(k f φ − VCOState) + sin(4π f c t + k f φ + VCOState) ⎤⎦
2 ⎣
This is substantially different from the original error signal, and cannot be seen as an
adequate approximation. Of particular interest is the fact that this equation is
substantially more sensitive to changes in φ than the previous one owing to the presence
of the gain factor kv
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Chapter 5 Problems
5.1.
( x − μ x )2
exp(−
)
(a) Given f ( x) =
2σ x2
2πσ x2
1
and exp(−π t 2 ) R exp(−π f 2 ) , then by applying the time-shifting and scaling properties:
F( f ) =
1
2πσ
2
x
2πσ x2 exp(−π ( 2πσ x2 ) 2 π f 2 ) exp( j 2π f μ x )
= exp(−π 2 2σ x2 f 2 + j μ x 2π f )
1
= exp( jνμ x − ν 2σ x2 )
2
and let ν = 2π f
(b)The value of μx does not affect the moment, as its influence is removed.
Use the Taylor series approximation of φx(x), given μx = 0.
1
2
φx (ν ) = exp(− ν 2σ x2 )
∞
x2
exp( x) = ∑
n=0 n !
E[ X n ] =
d nφx (ν )
dν n v =0
2k 2k
∞
⎛ 1⎞ σ ν
∴ φx (ν ) = ∑ ⎜ − ⎟ x
k!
2⎠
k =0 ⎝
k
d nφx (ν )
leaves the lowest non-zero derivative as ν2k-n.
dν n
When this derivative is evaluated for v=0, then E[ X n ] =0.
For any odd value of n, taking
For even values of n, only the terms in the resulting derivative that correspond to ν2k-n =
ν0 are non-zero. In other words, only the even terms in the sum that correspond to k = n/2
are retained.
∴ E[ X n ] =
n!
σ x2
(n / 2)!
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5.2. (a) All the inputs for x ≤0 are mapped to y = 0. However, the probability that x > 0
is unchanged. Therefore the probability density of x ≤0 must be concentrated at y=0.
∞
(b) Recall that
∫
f x x)dx = 1 where f x ( x) is an even function.
Because fy(y) is a
−∞
probability distribution, its integral must also equal 1.
∞
∴
∫
0
∞
f x ( x)dx = 0.5 and
∫
0
f y ( y )dy = 0.5
+
Therefore, the integral over the delta function must be 0.5. This means that the factor k
must also be 0.5.
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5.3 (a)
p y ( y ) = p y ( y | x0 ) P( x0 ) + p y ( y | x1 ) P( x1 )
Assume: P( x0 ) = P( x1 ) = 0.5
1
∴ p y ( y ) = [ p y ( y | x0 ) + p y ( y | y1 )
2
1
( y + 1) 2
( y − 1) 2
py ( y) =
[exp(−
)
exp(
)]
+
−
2σ 2
2σ 2
2 2πσ 2
∞
(b) P ( y ≥ α ) = ∫ p y ( y )dy
α
Use the cumulative Gaussian distribution,
y
Φ μ ,σ 2 ( y ) =
∫
−∞
( y − μ )2
exp(−
)dy
2σ 2
2πσ 2
1
1
∴ P( y ≥ α ) = [Φ −1,σ 2 (−α ) + Φ1,σ 2 (−α )]
2
1
y−μ
)]
But, Φ μ ,σ 2 ( y ) = [1 + erf (
2
σ 2
1
⎛ −α + 1 ⎞
⎛ −α − 1 ⎞
∴ P( y ≥ α ) = [2 + erf ⎜
+ erf ⎜
⎟
⎟]
2
⎝σ 2 ⎠
⎝σ 2 ⎠
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Problem 5.4
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Problem 5.5
If, for a complex random process Z(t)
RZ (τ ) = E [ Z *(t ) Z (t + τ ) ]
then
(i) The mean square of a complex process is given by
RZ (0) = E [ Z *(t ) Z (t ) ]
2
= E ⎡ Z (t ) ⎤
⎣
⎦
(ii) We show RZ (τ ) has conjugate symmetry by the following
RZ (−τ ) = E [ Z *(t ) Z (t − τ ) ]
= E [ Z *( s + τ ) Z ( s ) ]
= E [ Z ( s ) Z ( s + τ )] *
= RZ* (τ )
where we have used the change of variable s = t - τ.
(iii) Taking an approach similar to that of Eq. (5.67)
2
0 ≤ E ⎡⎢ ( Z (t ) ± Z (t + τ ) ) ⎤⎥
⎣
⎦
= E ⎡⎣( Z (t ) ± Z (t + τ ) )( Z *(t ) ± Z *(t + τ ) ) ⎤⎦
= E [ Z (t ) Z *(t ) ± Z (t ) Z *(t + τ ) ± Z *(t ) Z (t + τ ) + Z (t + τ ) Z *(t + τ ) ]
2
2
= E ⎡ Z (t ) ⎤ ± E [ Z (t ) Z *(t + τ )] ± E [ Z *(t ) Z (t + τ ) ] + E ⎡ Z (t + τ ) ⎤
⎣
⎦
⎣
⎦
2
= 2E ⎡ Z (t ) ⎤ ± 2 Re {E [ Z *(t ) Z (t + τ ) ]}
⎣
⎦
= 2 RZ (0) ± 2 Re { RZ (τ )}
Thus Re { RZ (τ )} ≤ RZ (0) .
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Problem 5.6 (a)
E[ Z (t1 ) Z * (t2 )]
= E[( A cos(2π f1t1 + θ1 ) + jA cos(2π f 2t1 + θ 2 )) ⋅ ( A cos(2π f1t2 + θ1 ) + jA cos(2π f 2t2 + θ 2 ))]
Let ω1=2πf1 ω2=2πf2
After distributing the terms, consider the first term:
A2 E[cos(ω1t1 + θ1 ) cos(ω1t2 + θ1 )]
=
A2
E[cos(ω1 (t1 − t2 )) + cos(ω1 (t1 + t2 ) + 2θ1 )]
2
The expectation over θ1 goes to zero, because θ1 is distributed uniformly over [-π,π].
This result also applies to the term A2 [cos(ω2t1 + θ 2 ) cos(ω2t2 + θ 2 )] . Both cross-terms go
to zero.
∴ R(t1 , t2 ) =
A2
[cos(ω1 (t 1 −t2 )) + cos(ω2 (t1 − t2 ))]
2
(b) If f1 = f2, only the cross terms may be different:
E[ jA2 (cos(ω1t1 + θ 2 ) cos(ω1t2 + θ1 ) + cos(ω1t1 + θ 2 ) cos(ω1t2 + θ1 )]
But, unless θ1=θ2, the cross-terms will also go to zero.
∴ R(t1 , t2 ) = A2 cos(ω1 (t1 − t2 ))
(c) If θ1=θ2, then the cross-terms become:
− jA2 E[cos((ω1t1 − ω2t2 )) + cos((ω1t1 + ω2t2 ) + 2θ1 ) + jA2 E[cos((ω2t1 − ω1t2 )) + cos((ω1t1 + ω2t2 ) + 2θ1 )]
After computing the expectations, the cross-terms simplify to:
jA2
[cos(ω2t1 − ω1t2 ) − cos(ω1t1 − ω2t2 )]
2
∴ RZ (t1 , t2 ) =
A2
[cos(ω1 (t1 − t2 )) + cos(ω2 (t1 − t2 )) + j cos(ω2t1 − ω1t2 ) − j cos(ω1t1 − ω2t2 )]
2
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Problem 5.7
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Problem 5.8
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Problem 5.9
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Problem 5.10
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Problem 5.11
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Problem 5.12
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Problem 5.13
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Problem 5.14
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Problem 5.15
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Problem 5.16
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Problem 5.17
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Problem 5.18
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Problem 5.19
Problem 5.20
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Problem 5.21
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Problem 5.22
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Problem 5.23
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Problem 5.24
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Problem 5.25
Problem 5.26
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Problem 5.27
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Problem 5.28
c)For a given filter, H ( f ) , let α = ln H ( f )
∞
and the Paley-Wiener criterion for causality is:
α( f )
∫ 1 + (2π f ) df < ∞
2
−∞
For the filter of part (b)
1
α ( f ) = [ ln(2) + ln( S x ( f ) − ln( N 0 )]
2
The first and the last terms have no impact on the absolute integrability of the previous
expression, and so do not matter as far as evaluating the above criterion. This leaves the
only condition:
∞
ln S x ( f )
∫−∞ 1 + (2π f )2 df < ∞
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Problem 5.29
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Problem 5.30
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Problem 5.31
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Problem 5.32
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Problem 5.33
(a) The receiver position is given by x(t) = x0+vt Thus the signal observed by the
receiver is
⎡
⎛ x ⎞⎤
r (t , x) = A( x) cos ⎢ 2π f c ⎜ t − ⎟ ⎥
⎝ c ⎠⎦
⎣
⎡
⎛ x + vt ⎞ ⎤
= A( x) cos t ⎢ 2π f c ⎜ t − 0
c ⎟⎠ ⎥⎦
⎝
⎣
⎡ ⎛
f v⎞
x ⎤
= A( x) cos ⎢ 2π ⎜ f c − c ⎟ t − f c 0 ⎥
c ⎠
c⎦
⎣ ⎝
The Doppler shift of the frequency observed at the receiver is f D =
fc v
.
c
(b) The expectation is given by
E ⎡⎣exp ( j 2π f nτ ) ⎤⎦ =
1
2π
=
1
2π
π
∫ exp ( j 2π f τ cosψ ) dψ
D
n
n
−π
π
∫π exp ( j 2π f τ sinψ ) dψ
D
n
n
−
= J 0 ( 2π f Dτ )
where the second line comes from the symmetry of cos and sin under a
-π/2 translation.
Eq. (5.174) follows directly from this upon noting that, since the expectation result is
real-valued, the right-hand side of Eq.(5.173) is equal to its conjugate.
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Problem 5.34
The histogram has been plotted for 100 bins. Larger numbers of bins result in larger
errors, as the effects of averaging are reduced.
Distance
0σ
1σ
2σ
3σ
4σ
Relative Error
0.94%
2.6 %
4.8 %
47.4%
60.7%
The error increases further out from the centre. It is also important to note that the
random numbers generated by this MATLAB procedure can never be greater than 5.
This is very different from the Gaussian distribution, for which there is a non-zero
probability for any real number.
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5.34 Code Listing
%Problem 5.34
%Set the number of samples to be 20,000
N=20000
M=100;
Z=zeros(1,20000);
for i=1:N
for j=1:5
Z(i)=Z(i)+2*(rand(1)-0.5);
end
end
sigma=sqrt(var(Z-mean(Z)));
%Calculate a histogram of Z
[X,C]=hist(Z,M);
l=linspace(C(1),C(M),M);
%Create a gaussian function with the same variance as Z
G=1/(sqrt(2*pi*sigma^2))*exp(-(l.^2)/(2*sigma^2));
delta2=abs(l(1)-l(2));
X=X/(20000*delta2);
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5.35 (a) For the generated sequence:
μˆ y = −0.0343 + j 0.0493
σˆ y2 = 5.597
The theoretical values are: μy = 0 (by inspection).
The theoretical value of σ y2 =5.56. See 5.35 (c) for the calculation.
5.35 (b)
From the plots, it can be seen that both the real and imaginary components are
approximately Gaussian. In addition, from statistics, the sum of tow zero-mean Gaussian
signals is also Gaussian distributed. As a result, the filter output must also be Gaussian.
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5.35 (c)
y (n) = ay (n − 1) + w(n)
Y ( z ) = aY ( z ) z −1
∴ H ( z) =
1
n
R h( n) = a u ( n)
−1
1 − az
1
(1 − az )(1 − az )
-1
Rh(z) = H(z)H(z ) =
−1
=
a
z −1
1
1
+
2
−1
2
1 − a 1 − az
1 − a 1 − az
But, Ry(z) = Rh(z)Rw(z)
Taking the inverse z-transform:
ry (n) =
σ w2
1 − a2
an
−∞ < n < ∞
From the plots, the measured and observed autocorrelations are almost identical.
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Chapter 6 Solutions
Problem 6.3
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Problem 6.4
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Problem 6.5
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Problem 6.6
Problem 6.7
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Problem 6.8
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Problem 6.9
Problem 6.10
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Problem 6.11
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Problem 6.12
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Problem 6.13
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Problem 6.24
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Problem 6.15
Problem 6.16
Problem 6.17
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Chapter 7 Problems
Problem 7.1
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Problem 7.2
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Problem 7.3
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Problem 7.4
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Problem 7.5
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Problem 7.6
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Problem 7.7
Problem 7.8
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Problem 7.9
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Problem 7.10
Problem 7.11
Problem 7.12
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Problem 7.13
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Problem 7.14
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Problem 7.15
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Problem 7.16
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Problem 7.17
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Problem 7.18
Problem 7.19
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Problem 7.20
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Problem 7.21
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Problem 7.22
The maximum slope of the signal s (t ) = A sin ( 2π ft ) is 2πfA. Consequently, the
maximum change during a sample period is approximately 2πAfTs. To prevent slope
overload, we require
100mV > 2π AfTs
= 2π A(1kHz ) /(68kHz )
= 0.092 A
or A < 1.08 V.
Problem 7.23
(a) Theoretically, the sampled spectrum is given by
Ss ( f ) =
∞
∑ H ( f − nf )
n =−∞
s
s
where Hs(f) is the spectrum of the signal H(f) limited to f ≤ f s / 2 . For this
example, the sample spectrum should look as below.
0
-5 kHz
5 kHz
f
(b)
The sampled spectrum is given by
2.5
x 10
5
Amplitude Spectrum
2
1.5
1
0.5
0
-5
-4
-3
-2
-1
0
1
Frequency (kHz)
2
3
4
5
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There are several features to comment on:
(i)
The component at +4 kHz is due to aliasing of the -6 kHz sinusoid; and
the component at -4kHz is due to aliasing of the +6 kHz sinusoid.
The lower frequency is at 2 kHz is six times larger than the one at 4 kHz.
One would expect the power ratio to be 4:1, not 6:1. The difference is due
to relationship between the FFTsize (period) and the sampling rate. (Try a
sampling rate of 10.24 kHz and compare.)
(ii)
(b) The spectrum with a 11 kHz sampling rate is shown below.
2.5
x 10
5
Amplitude Spectrum
2
1.5
1
0.5
0
-6
-4
-2
0
Frequency (kHz)
2
4
6
As expected the 2kHz component is unchanged in frequency, while the aliased
component is shifted to reflect the new sampling rate.
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Problem 7.23
(a) The expanding portion of the μ-law compander is given by
exp ⎡⎣log(1 + μ ) υ ⎤⎦ − 1
m=
μ
=
(1 + μ ) exp ⎡⎣ υ ⎤⎦ − 1
μ
(b)
(i) For the non-companded case, the rms quantization error is determined by step size.
The step size is given by the maximum range over the number of quantization steps
2A
Δ= Q
2
For this signal the range is from +10 to -1, so A = 10 and with Q = 8, we have Δ = 0.078.
From Eq. ( ) , the rms quantization error is then given by
1 2 −2 R
2
σ Q2 = mmax
3
1
= (10) 2 2−16
3
= 0.0005086
and the rms error is σQ – 0.02255.
(ii) For a fair comparison, the signal must have similar amplitudes.
The rms error with companding is 0.0037 which is significantly less. The plot is shown
below. Note that the error is always positive.
0.035
0.03
0.025
0.02
0.015
0.01
0.005
0
-0.005
0
50
100
150
200
250
300
350
400
450
Rest TBD.
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Problem 7.24
Problem 7.25
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Chapter 8
Problem 8.1
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Problem 8.2
Problem 8.3
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Problem 8.4
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Problem 8.5
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Problem 8.6
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Problem 8.7
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Problem 8.8
Problem 8.9
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Problem 8.10
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Problem 8.11
Problem 8.12
.
Problem 8.13
Problem 8.14
Problem 8.15
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Problem 8.16
Problem 8.17
Problem 8.18
Problem 8.19
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Problem 8.20
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Problem 8.21
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Problem 8.22
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Problem 8.23
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Problem 8.24
Problem 8.25
Problem 8.26
Problem 8.29
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Chapter 9
Problem 9.1
The three waveforms are shown below for the sequence 0011011001. (b) is ASK, (c) is
PSK; and (d) is FSK.
Problem 9.2
The bandpass signal is given by
s (t ) = g (t ) cos ( 2π f c t )
The corresponding amplitude spectrum, using the multiplication theorem for Fourier
transforms, is given by
S ( f ) = G ( f ) * [δ ( f − f c ) + δ ( f + f c ) ]
= G( f − fc ) + G( f + fc )
For a triangular spectrum G(f), the corresponding sketch is shown below.
Problem 9.3
To be done
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Problem 9.4
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Problem 9.5
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Problem 9.6
**The problem here is solved as “erfc” here and in the old edition, but listed in the
textbook question as “Q(x)”.
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Problem 9.7
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Problem 9.8
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Problem 9.9
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Problem 9.10
Problem 9.11
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Problem 9.12
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Problem 9.13
Problem 9.14
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Problem 9.15
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Problem 9.16
Problem 9.17
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Problem 9.18
Problem 9.19
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Problem 9.20
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Problem 9.21
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Problem 9.22
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Problem 9.23
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Chapter 10 Problems
Problem 10.1
Problem 10.2
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Problem 10.3
Problem 10.4
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Problem 10.5
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Problem 10.6
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Problem 10.7
a)
b)To be done
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Problem 10.8
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Problem 10.9
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Problem 10.10
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Problem 10.11
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Problem 10.12
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Problem 10.13
Problem 10.14
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Problem 10.15
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Problem 10.16
Problem 10.17
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Problem 10.18
Problem 10.19
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Problem 10.20
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Problem 10.21
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Problem 10.22
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Problem 10.23
Problem 10.24
Problem 10.25
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Problem 10.26
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Problem 10.27
Problem 10.28
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Problem 10.29
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Problem 10.30
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