Signal processing
$${a_1} = 1,{a_2} = W_6^2,{a_3} = {W_6}$$
$${a_1} = - 1,{a_2} = W_6^2,{a_3} = {W_6}$$
$${a_1} = - 1,{a_2} = {W_6},{a_3} = W_6^2$$
$${a_1} = 1,{a_2} = {W_6},{a_3} = W_6^2$$
Answer is Right!
Answer is Wrong!
102. An FIR system is described by the system function $$H\left( z \right) = 1 + \frac{7}{2}{z^{ – 1}} + \frac{3}{z}{z^{ – 2}}$$ The system is
Maximum phase
Minimum phase
Mixed phase
Zero phase
Answer is Right!
Answer is Wrong!
103. Given that $$L\left[ {f\left( t \right)} \right] = {{s + 2} \over {{s^2} + 1}},L\left[ {g\left( t \right)} \right] = {{{s^2} + 1} \over {\left( {s + 3} \right)\left( {s + 2} \right)}},$$ $$h\left( t \right) = \int\limits_0^t {f\left( \tau \right)} g\left( {t – \tau } \right)d\tau $$ L[h(t)] is
$${{{s^2} + 1} over {s + 3}}$$
$${1 over {s + 3}}$$
$${{{s^2} + 1} over {left( {s + 3} ight)left( {s + 2} ight)}} + {{s + 2} over {{s^2} + 1}}$$
None of the above
Answer is Right!
Answer is Wrong!
104. A 1.0 kHz signal is flat-top sampled at the rate of 1800 samples/sec and the samples are applied to an ideal rectangular LPF with cut-off frequency of 1100 Hz, then the output of the filter contains
Only 800 Hz component
800 Hz and 900 Hz components
800 Hz and 1000 Hz components
800 Hz, 900 Hz and 1000 Hz components
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Answer is Wrong!
105. The input x(t) and the output y(t) of a continuous- time system are related as $$y\left( t \right) = \int\limits_{t – T}^t {x\left( u \right)du} $$ The system is
Linear and time-variant
Linear and time-invariant
Non-linear and time-variant
Non-linear and time-invariant
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Answer is Wrong!
106. The input to a channel is a bandpass signal. It is obtained by linearly modulating a sinusoidal carrier with a single-tone signal. The output of the channel due to this input is given by $$y\left( t \right) = \left( {{1 \over {100}}} \right)\cos \left( {100t – {{10}^{ – 6}}} \right)\cos \left( {{{10}^6}t – 1.56} \right)$$ The group delay (tg) and the phase delay (tp) in seconds, of the channel are
tg = 10-6, tp = 1.56
tg = 1.56, tp = 10-6
tg = 10-8, tp = 1.56 Ã 10-6
tg = 108, tp = 1.56
Answer is Right!
Answer is Wrong!
107. The z-transform F(z) of the function f(nT) = anT is
$${z over {z - {a^T}}}$$
$${z over {z + {a^T}}}$$
$${z over {z - {a^{ - T}}}}$$
$${z over {z + {a^{ - T}}}}$$
Answer is Right!
Answer is Wrong!
Detailed SolutionThe z-transform F(z) of the function f(nT) = anT is
108. The response of an initially relaxed linear constant parameter network to a unit impulse applied at t = 0 is 4e-2tu(t). The response of this network to a unit step function will be
”2[1
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Answer is Wrong!
109. A network consisting of a finite number of linear resistor (R), inducer (L), and capacitor (C) elements, connected all in series or all in parallel, is excited with a source of the form $$\sum\limits_{k = 1}^3 {{a_x}\,\cos \left( {k{\omega _0}t} \right),{\rm{were}}\,{a_k} \ne 0,} \,{\omega _0} \ne 0.$$ The source has nonzero impedance. Which one of the following is a possible form of the output measured across a resistor in the network?
$$sumlimits_{k = 1}^3 {{b_x},cos left( {k{omega _0}t + {phi _k}} ight),{ m{were}},{b_k} e {a_k},} , orall K$$
$$sumlimits_{k = 1}^3 {{b_x},cos left( {k{omega _0}t + {phi _k}} ight),{ m{were}},{b_k} e 0,} , orall K$$
$$sumlimits_{k = 1}^3 {{a_x},cos left( {k{omega _0}t + {phi _k}} ight)} $$
$$sumlimits_{k = 1}^2 {{a_x},cos left( {k{omega _0}t + {phi _k}} ight)} $$
Answer is Right!
Answer is Wrong!
110. The Fourier Transform of a function x(t) is X(f). The Fourier transform of $${{dx\left( t \right)} \over {dt}}$$ will be
$${{dxleft( t ight)} over {dt}}$$
$$j2pi fXleft( f ight)$$
$$jfXleft( f ight)$$
$${{Xleft( f ight)} over {jf}}$$
Answer is Right!
Answer is Wrong!