EE 805, Random Processes and Linear Systems OSU, Winter 2012 Problem Set 1 Problem 1
Jan. 6, 2012 Due: Jan. 18, 2012
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EE 805, Random Processes and Linear Systems OSU, Winter 2012
Jan. 15, 2012 Due: Jan. 25, 2012
Problem Set 2 Problem 1 Let C be a random variable uniformly distributed on [0, 1] and define X(t) = u(t - C). (a) Sketch two sample realizations of X(t). (b) Fi
EE 805, Random Processes and Linear Systems OSU, Winter 2012 Problem Set 3 Problem 1 Consider the random process X(t) = p sin 2f0 t + B[n] , 2 nT t < (n + 1)T,
Jan. 27, 2012 Due: Feb. 6, 2012
where p and f0 are known constants and B[n] is an iid Bernoull
EE 805, Random Processes and Linear Systems OSU, Winter 2012
Feb. 13, 2012 Due: Feb. 24, 2011
Problem Set 4 Problem 1 Let the input X(t) to a LTI system be white noise with CX ( ) = 2 ( ). The LTI system has impulse response h(t) = u(t) - u(t - T ) = Find