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:'''Click [[ECE-QE_CS1-2011_solusion-2|here]] to view student [[ECE-QE_CS1-2011_solusion-2|answers and discussions]]''' | :'''Click [[ECE-QE_CS1-2011_solusion-2|here]] to view student [[ECE-QE_CS1-2011_solusion-2|answers and discussions]]''' | ||
| + | ---- | ||
| + | '''Part 3.''' 25 pts | ||
| + | |||
| + | |||
| + | <font color="#ff0000"><span style="font-size: 19px;"><math>\color{blue} \text{Show that the sum of two jointly distributed Gaussian random variables that are not necessarily statistically independent is a Gaussian random variable.} | ||
| + | </math></span></font> | ||
| + | |||
| + | |||
| + | :'''Click [[ECE-QE_CS1-2011_solusion-3|here]] to view student [[ECE-QE_CS1-2011_solusion-3|answers and discussions]]''' | ||
| + | ---- | ||
| + | '''Part 4.''' 25 pts | ||
| + | |||
| + | |||
| + | <font color="#ff0000"><span style="font-size: 19px;"><math>\color{blue} \text{Assume that } \mathbf{X}(t) \text{ is a zero-mean continuous-time Gaussian white noise process with autocorrelation function} | ||
| + | </math></span></font> | ||
| + | |||
| + | <font color="#ff0000"><span style="font-size: 19px;"><math>\color{blue} R_{\mathbf{XX}}(t_1,t_2)=\delta(t_1-t_2). | ||
| + | </math></span></font> | ||
| + | |||
| + | <font color="#ff0000"><span style="font-size: 19px;"><math>\color{blue} \text{Let } \mathbf{Y}(t) \text{ be a new random process ontained by passing } \mathbf{Y}(t) \text{ through alinear time-invariant system with impulse response } h(t) \text{ whose Fourier transform} H(\omega) \text{ has the ideal low-pass characteristic} | ||
| + | </math></span></font> | ||
| + | |||
| + | <font color="#ff0000"><span style="font-size: 19px;"><math>\color{blue} H(\omega) = | ||
| + | \begin{cases} | ||
| + | 1, & \mbox{if } |\omega|<\Omega,\\ | ||
| + | 0, & \mbox{elsewhere,} | ||
| + | \end{cases} | ||
| + | </math></span></font> | ||
| + | |||
| + | <font color="#ff0000"><span style="font-size: 19px;"><math>\color{blue} \text{where } \Omega>0. | ||
| + | </math></span></font> | ||
| + | |||
| + | <font color="#ff0000"><span style="font-size: 19px;"><math>\color{blue} \text{a) Find the mean of } \mathbf{Y}(t). | ||
| + | </math></span></font> | ||
| + | |||
| + | <font color="#ff0000"><span style="font-size: 19px;"><math>\color{blue} \text{b) Find the autocorrelation function of } \mathbf{Y}(t). | ||
| + | </math></span></font> | ||
| + | |||
| + | <font color="#ff0000"><span style="font-size: 19px;"><math>\color{blue} \text{c) Find the joint pdf of } \mathbf{Y}(t_1) \text{ and } \mathbf{Y}(t_2) \text{ for any two arbitrary sample time } t_1 \text{ and } t_2. | ||
| + | </math></span></font> | ||
| + | |||
| + | <font color="#ff0000"><span style="font-size: 19px;"><math>\color{blue} \text{d) What is the minimum time difference } t_1-t_2 \text{ such that } \mathbf{Y}(t_1) \text{ and } \mathbf{Y}(t_2) \text{ are statistically independent?} | ||
| + | </math></span></font> | ||
| + | |||
| + | :'''Click [[ECE-QE_CS1-2011_solusion-4|here]] to view student [[ECE-QE_CS1-2011_solusion-4|answers and discussions]]''' | ||
---- | ---- | ||
[[ECE_PhD_Qualifying_Exams|Back to ECE Qualifying Exams (QE) page]] | [[ECE_PhD_Qualifying_Exams|Back to ECE Qualifying Exams (QE) page]] | ||
Revision as of 22:46, 29 March 2015
Communication, Networking, Signal and Image Processing (CS)
Question 1: Probability and Random Processes
August 2011
Question
Part 1. 25 pts
$ \color{blue}\text{ Let } \mathbf{X}\text{, }\mathbf{Y}\text{, and } \mathbf{Z} \text{ be three jointly distributed random variables with joint pdf } f_{XYZ}\left ( x,y,z \right )= \frac{3z^{2}}{7\sqrt[]{2\pi}}e^{-zy} exp \left [ -\frac{1}{2}\left ( \frac{x-y}{z}\right )^{2} \right ] \cdot 1_{\left[0,\infty \right )}\left(y \right )\cdot1_{\left[1,2 \right]} \left ( z \right) $
$ \color{blue}\left( \text{a} \right) \text{Find the joint probability density function } f_{YZ}(y,z). $
$ \color{blue}\left( \text{b} \right) \text{Find } f_{x}\left( x|y,z\right ). $
$ \color{blue}\left( \text{c} \right) \text{Find } f_{Z}\left( z\right ). $
$ \color{blue}\left( \text{d} \right) \text{Find } f_{Y}\left(y|z \right ). $
$ \color{blue}\left( \text{e} \right) \text{Find } f_{XY}\left(x,y|z \right ). $
- Click here to view student answers and discussions
Part 2. 25 pts
$ \color{blue} \text{Show that if a continuous-time Gaussian random process } \mathbf{X}(t) \text{ is wide-sense stationary, it is also strict-sense stationary.} $
- Click here to view student answers and discussions
Part 3. 25 pts
$ \color{blue} \text{Show that the sum of two jointly distributed Gaussian random variables that are not necessarily statistically independent is a Gaussian random variable.} $
- Click here to view student answers and discussions
Part 4. 25 pts
$ \color{blue} \text{Assume that } \mathbf{X}(t) \text{ is a zero-mean continuous-time Gaussian white noise process with autocorrelation function} $
$ \color{blue} R_{\mathbf{XX}}(t_1,t_2)=\delta(t_1-t_2). $
$ \color{blue} \text{Let } \mathbf{Y}(t) \text{ be a new random process ontained by passing } \mathbf{Y}(t) \text{ through alinear time-invariant system with impulse response } h(t) \text{ whose Fourier transform} H(\omega) \text{ has the ideal low-pass characteristic} $
$ \color{blue} H(\omega) = \begin{cases} 1, & \mbox{if } |\omega|<\Omega,\\ 0, & \mbox{elsewhere,} \end{cases} $
$ \color{blue} \text{where } \Omega>0. $
$ \color{blue} \text{a) Find the mean of } \mathbf{Y}(t). $
$ \color{blue} \text{b) Find the autocorrelation function of } \mathbf{Y}(t). $
$ \color{blue} \text{c) Find the joint pdf of } \mathbf{Y}(t_1) \text{ and } \mathbf{Y}(t_2) \text{ for any two arbitrary sample time } t_1 \text{ and } t_2. $
$ \color{blue} \text{d) What is the minimum time difference } t_1-t_2 \text{ such that } \mathbf{Y}(t_1) \text{ and } \mathbf{Y}(t_2) \text{ are statistically independent?} $
- Click here to view student answers and discussions
