(New page: ==7.11 QE 2006 January== 1 (33 points) Let <math>\mathbf{X}</math> and <math>\mathbf{Y}</math> be two joinly distributed random variables having joint pdf <math>f_{\mathbf{XY}}\left(...) |
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| − | ==7.11 QE 2006 January== | + | ==7.11 [[ECE_PhD_Qualifying_Exams|QE]] 2006 January== |
1 (33 points) | 1 (33 points) | ||
| − | Let <math>\mathbf{X}</math> and <math>\mathbf{Y}</math> be two joinly distributed random variables having joint pdf | + | Let <math class="inline">\mathbf{X}</math> and <math class="inline">\mathbf{Y}</math> be two joinly distributed random variables having joint pdf |
| − | <math>f_{\mathbf{XY}}\left(x,y\right)=\left\{ \begin{array}{lll} | + | <math class="inline">f_{\mathbf{XY}}\left(x,y\right)=\left\{ \begin{array}{lll} |
1, & & \text{ for }0\leq x\leq1\text{ and }0\leq y\leq1\\ | 1, & & \text{ for }0\leq x\leq1\text{ and }0\leq y\leq1\\ | ||
0, & & \text{ elsewhere. } | 0, & & \text{ elsewhere. } | ||
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(a) | (a) | ||
| − | Are <math>\mathbf{X}</math> and <math>\mathbf{Y}</math> statistically independent? Justify your answer. | + | Are <math class="inline">\mathbf{X}</math> and <math class="inline">\mathbf{Y}</math> statistically independent? Justify your answer. |
| − | <math>f_{\mathbf{X}}\left(x\right)=\int_{-\infty}^{\infty}f_{\mathbf{XY}}\left(x,y\right)dy=\int_{0}^{1}dy=1\text{ for }0\leq x\leq1.</math> | + | <math class="inline">f_{\mathbf{X}}\left(x\right)=\int_{-\infty}^{\infty}f_{\mathbf{XY}}\left(x,y\right)dy=\int_{0}^{1}dy=1\text{ for }0\leq x\leq1.</math> |
| − | <math>f_{\mathbf{Y}}\left(y\right)=\int_{-\infty}^{\infty}f_{\mathbf{XY}}\left(x,y\right)dx=\int_{0}^{1}dx=1\text{ for }0\leq y\leq1.</math> | + | <math class="inline">f_{\mathbf{Y}}\left(y\right)=\int_{-\infty}^{\infty}f_{\mathbf{XY}}\left(x,y\right)dx=\int_{0}^{1}dx=1\text{ for }0\leq y\leq1.</math> |
| − | Since <math>f_{\mathbf{XY}}\left(x,y\right)=f_{\mathbf{X}}\left(x\right)f_{\mathbf{Y}}\left(y\right)</math> , <math>\mathbf{X}</math> and <math>\mathbf{Y}</math> are <math>statistically independent.</math> | + | Since <math class="inline">f_{\mathbf{XY}}\left(x,y\right)=f_{\mathbf{X}}\left(x\right)f_{\mathbf{Y}}\left(y\right)</math> , <math class="inline">\mathbf{X}</math> and <math class="inline">\mathbf{Y}</math> are <math class="inline">statistically independent.</math> |
(b) | (b) | ||
| − | Let <math>\mathbf{Z}</math> be a new random variable defined as <math>\mathbf{Z}=\mathbf{X}+\mathbf{Y}</math> . Find the cdf of <math>\mathbf{Z}</math> . | + | Let <math class="inline">\mathbf{Z}</math> be a new random variable defined as <math class="inline">\mathbf{Z}=\mathbf{X}+\mathbf{Y}</math> . Find the cdf of <math class="inline">\mathbf{Z}</math> . |
| − | <math>F_{\mathbf{Z}}\left(z\right)=P\left(\left\{ \mathbf{Z}\leq z\right\} \right)=P\left(\left\{ \mathbf{X}+\mathbf{Y}\leq z\right\} \right).</math> | + | <math class="inline">F_{\mathbf{Z}}\left(z\right)=P\left(\left\{ \mathbf{Z}\leq z\right\} \right)=P\left(\left\{ \mathbf{X}+\mathbf{Y}\leq z\right\} \right).</math> |
| − | • i) if <math>z<0</math> , then <math>F_{\mathbf{Z}}\left(z\right)=0</math> . | + | • i) if <math class="inline">z<0</math> , then <math class="inline">F_{\mathbf{Z}}\left(z\right)=0</math> . |
| − | • ii) if <math>z\geq2</math> , then <math>F_{\mathbf{Z}}\left(z\right)=1</math> . | + | • ii) if <math class="inline">z\geq2</math> , then <math class="inline">F_{\mathbf{Z}}\left(z\right)=1</math> . |
| − | • iii) if <math>0\leq z\leq1</math> , then <math>F_{\mathbf{Z}}\left(z\right)=\iint f_{\mathbf{XY}}\left(x,y\right)dxdy=\iint1\cdot dxdy=\frac{1}{2}z^{2}</math> . | + | • iii) if <math class="inline">0\leq z\leq1</math> , then <math class="inline">F_{\mathbf{Z}}\left(z\right)=\iint f_{\mathbf{XY}}\left(x,y\right)dxdy=\iint1\cdot dxdy=\frac{1}{2}z^{2}</math> . |
| − | • iv) if <math>1<z<2</math> , then <math>F_{\mathbf{Z}}=\iint f_{\mathbf{XY}}\left(x,y\right)dxdy=\iint1\cdot dxdy=1-\frac{1}{2}\left(2-z\right)^{2}</math> . | + | • iv) if <math class="inline">1<z<2</math> , then <math class="inline">F_{\mathbf{Z}}=\iint f_{\mathbf{XY}}\left(x,y\right)dxdy=\iint1\cdot dxdy=1-\frac{1}{2}\left(2-z\right)^{2}</math> . |
| − | <math>\therefore F_{\mathbf{Z}}\left(z\right)=\left\{ \begin{array}{lll} | + | <math class="inline">\therefore F_{\mathbf{Z}}\left(z\right)=\left\{ \begin{array}{lll} |
0 & & ,z<0\\ | 0 & & ,z<0\\ | ||
\frac{1}{2}z^{2} & & ,0\leq z\leq1\\ | \frac{1}{2}z^{2} & & ,0\leq z\leq1\\ | ||
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\end{array}\right.</math> | \end{array}\right.</math> | ||
| − | [[Image:003. | + | [[Image:003.png]] |
(c) | (c) | ||
| − | Find the variance of <math>\mathbf{Z}</math> . | + | Find the variance of <math class="inline">\mathbf{Z}</math> . |
| − | <math>f_{\mathbf{Z}}\left(z\right)=\left\{ \begin{array}{lll} | + | <math class="inline">f_{\mathbf{Z}}\left(z\right)=\left\{ \begin{array}{lll} |
z & & ,0\leq z\leq1\\ | z & & ,0\leq z\leq1\\ | ||
2-z & & ,1<z<2\\ | 2-z & & ,1<z<2\\ | ||
| − | 0 & & \ | + | 0 & & \text{,otherwise.} |
\end{array}\right.</math> | \end{array}\right.</math> | ||
| − | <math>E\left[\mathbf{Z}\right]=\int_{-\infty}^{\infty}z\cdot f_{\mathbf{Z}}\left(z\right)dz=\int_{0}^{1}z^{2}dz+\int_{1}^{2}\left(2z-z^{2}\right)dz=\frac{1}{3}z^{3}\Bigl|_{0}^{1}+z^{2}-\frac{1}{3}z^{3}\Bigl|_{1}^{2}=\frac{1}{3}+3-\frac{7}{3}=1.</math> <math>E\left[\mathbf{Z}^{2}\right]=\int_{-\infty}^{\infty}z^{2}\cdot f_{\mathbf{Z}}\left(z\right)dz=\int_{0}^{1}z^{3}dz+\int_{1}^{2}\left(2z^{2}-z^{3}\right)dz=\frac{1}{4}z^{4}\Bigl|_{0}^{1}+\frac{2}{3}z^{3}-\frac{1}{4}z^{4}\Bigl|_{1}^{2}=\frac{1}{4}+\frac{14}{3}-\frac{15}{4}=\frac{7}{6}.</math> <math>Var\left[\mathbf{Z}\right]=E\left[\mathbf{Z}^{2}\right]-\left(E\left[\mathbf{Z}\right]\right)^{2}=\frac{1}{6}.</math> | + | <math class="inline">E\left[\mathbf{Z}\right]=\int_{-\infty}^{\infty}z\cdot f_{\mathbf{Z}}\left(z\right)dz=\int_{0}^{1}z^{2}dz+\int_{1}^{2}\left(2z-z^{2}\right)dz=\frac{1}{3}z^{3}\Bigl|_{0}^{1}+z^{2}-\frac{1}{3}z^{3}\Bigl|_{1}^{2}=\frac{1}{3}+3-\frac{7}{3}=1.</math> <math class="inline">E\left[\mathbf{Z}^{2}\right]=\int_{-\infty}^{\infty}z^{2}\cdot f_{\mathbf{Z}}\left(z\right)dz=\int_{0}^{1}z^{3}dz+\int_{1}^{2}\left(2z^{2}-z^{3}\right)dz=\frac{1}{4}z^{4}\Bigl|_{0}^{1}+\frac{2}{3}z^{3}-\frac{1}{4}z^{4}\Bigl|_{1}^{2}=\frac{1}{4}+\frac{14}{3}-\frac{15}{4}=\frac{7}{6}.</math> <math class="inline">Var\left[\mathbf{Z}\right]=E\left[\mathbf{Z}^{2}\right]-\left(E\left[\mathbf{Z}\right]\right)^{2}=\frac{1}{6}.</math> |
2 (33 points) | 2 (33 points) | ||
| − | Suppose that <math>\mathbf{X}</math> and <math>\mathbf{N}</math> are two jointly distributed random variables, with <math>\mathbf{X}</math> being a continuous random variable that is uniformly distributed on the interval <math>\left(0,1\right)</math> and <math>\mathbf{N}</math> being a discrete random variable taking on values <math>0,1,2,\cdots</math> and having conditional probability mass function <math>p_{\mathbf{N}}\left(n|\left\{ \mathbf{X}=x\right\} \right)=x^{n}\left(1-x\right),\quad n=0,1,2,\cdots</math> . | + | Suppose that <math class="inline">\mathbf{X}</math> and <math class="inline">\mathbf{N}</math> are two jointly distributed random variables, with <math class="inline">\mathbf{X}</math> being a continuous random variable that is uniformly distributed on the interval <math class="inline">\left(0,1\right)</math> and <math class="inline">\mathbf{N}</math> being a discrete random variable taking on values <math class="inline">0,1,2,\cdots</math> and having conditional probability mass function <math class="inline">p_{\mathbf{N}}\left(n|\left\{ \mathbf{X}=x\right\} \right)=x^{n}\left(1-x\right),\quad n=0,1,2,\cdots</math> . |
(a) | (a) | ||
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Find the probability that \mathbf{N}=n . | Find the probability that \mathbf{N}=n . | ||
| − | <math>f_{\mathbf{X}}\left(x\right)=\left\{ \begin{array}{lll} | + | <math class="inline">f_{\mathbf{X}}\left(x\right)=\left\{ \begin{array}{lll} |
1 & & ,0\leq x\leq1\\ | 1 & & ,0\leq x\leq1\\ | ||
| − | 0 & & ,\ | + | 0 & & ,\text{otherwise.} |
\end{array}\right.</math> | \end{array}\right.</math> | ||
| − | <math>P\left(\left\{ \mathbf{N}=n\right\} \right)=\int_{-\infty}^{\infty}p_{\mathbf{N}}\left(n|\left\{ \mathbf{X}=x\right\} \right)f_{\mathbf{X}}\left(x\right)dx=\int_{0}^{1}x^{n}\left(1-x\right)dx</math> | + | <math class="inline">P\left(\left\{ \mathbf{N}=n\right\} \right)=\int_{-\infty}^{\infty}p_{\mathbf{N}}\left(n|\left\{ \mathbf{X}=x\right\} \right)f_{\mathbf{X}}\left(x\right)dx=\int_{0}^{1}x^{n}\left(1-x\right)dx</math> |
| − | <math>=\frac{1}{n+1}x^{n+1}-\frac{1}{n+2}x^{n+2}\Bigl|_{0}^{1}=\frac{1}{n+1}-\frac{1}{n+2}=\frac{1}{\left(n+1\right)\left(n+2\right)}. </math> | + | <math class="inline">=\frac{1}{n+1}x^{n+1}-\frac{1}{n+2}x^{n+2}\Bigl|_{0}^{1}=\frac{1}{n+1}-\frac{1}{n+2}=\frac{1}{\left(n+1\right)\left(n+2\right)}. </math> |
(b) | (b) | ||
| − | Find the conditional density of <math>\mathbf{X}</math> given <math>\left\{ \mathbf{N}=n\right\}</math> . | + | Find the conditional density of <math class="inline">\mathbf{X}</math> given <math class="inline">\left\{ \mathbf{N}=n\right\}</math> . |
By using Bayes' theorem, | By using Bayes' theorem, | ||
| − | <math>f_{\mathbf{X}}\left(x|\left\{ \mathbf{N}=n\right\} \right)=\frac{p_{\mathbf{N}}\left(n|\left\{ \mathbf{X}=x\right\} \right)f_{\mathbf{X}}\left(x\right)}{p_{\mathbf{N}}\left(n\right)}=\left\{ \begin{array}{lll} | + | <math class="inline">f_{\mathbf{X}}\left(x|\left\{ \mathbf{N}=n\right\} \right)=\frac{p_{\mathbf{N}}\left(n|\left\{ \mathbf{X}=x\right\} \right)f_{\mathbf{X}}\left(x\right)}{p_{\mathbf{N}}\left(n\right)}=\left\{ \begin{array}{lll} |
\left(n+1\right)\left(n+2\right)x^{n}\left(1-x\right) & & ,0\leq x\leq1\\ | \left(n+1\right)\left(n+2\right)x^{n}\left(1-x\right) & & ,0\leq x\leq1\\ | ||
0 & & ,\text{otherwise.} | 0 & & ,\text{otherwise.} | ||
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(c) | (c) | ||
| − | Find the minimum mean-square error estimator of <math>\mathbf{X}</math> given <math>\left\{ \mathbf{N}=n\right\}</math> . | + | Find the minimum mean-square error estimator of <math class="inline">\mathbf{X}</math> given <math class="inline">\left\{ \mathbf{N}=n\right\}</math> . |
| − | <math>MMSE=E\left[\mathbf{X}|\left\{ \mathbf{N}=n\right\} \right]=\int_{-\infty}^{\infty}x\cdot f_{\mathbf{X}}\left(x|\left\{ \mathbf{N}=n\right\} \right)dx=\int_{0}^{1}\left(n+1\right)\left(n+2\right)x^{n+1}\left(1-x\right)dx</math><math>=\left(n+1\right)\left(n+2\right)\left(\frac{1}{n+2}x^{n+2}-\frac{1}{n+3}x^{n+3}\right)\biggl|_{0}^{1}=\left(n+1\right)\left(n+2\right)\left(\frac{1}{n+2}-\frac{1}{n+3}\right)</math><math>=\frac{\left(n+1\right)\left(n+2\right)}{\left(n+2\right)\left(n+3\right)}=\frac{n+1}{n+3}.</math> | + | <math class="inline">MMSE=E\left[\mathbf{X}|\left\{ \mathbf{N}=n\right\} \right]=\int_{-\infty}^{\infty}x\cdot f_{\mathbf{X}}\left(x|\left\{ \mathbf{N}=n\right\} \right)dx=\int_{0}^{1}\left(n+1\right)\left(n+2\right)x^{n+1}\left(1-x\right)dx</math><math class="inline">=\left(n+1\right)\left(n+2\right)\left(\frac{1}{n+2}x^{n+2}-\frac{1}{n+3}x^{n+3}\right)\biggl|_{0}^{1}=\left(n+1\right)\left(n+2\right)\left(\frac{1}{n+2}-\frac{1}{n+3}\right)</math><math class="inline">=\frac{\left(n+1\right)\left(n+2\right)}{\left(n+2\right)\left(n+3\right)}=\frac{n+1}{n+3}.</math> |
3 (34 points) | 3 (34 points) | ||
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2. The number of towers in any two disjoint regions are statistically independent. | 2. The number of towers in any two disjoint regions are statistically independent. | ||
| − | Assume you are located at a point we will call the origin within this 2-dimensional region, and let <math>R_{\left(1\right)}<R_{\left(2\right)}<R_{\left(3\right)}<\cdots</math> be the ordered distances between the origin and the towers. | + | Assume you are located at a point we will call the origin within this 2-dimensional region, and let <math class="inline">R_{\left(1\right)}<R_{\left(2\right)}<R_{\left(3\right)}<\cdots</math> be the ordered distances between the origin and the towers. |
(a) | (a) | ||
| − | Show that <math>R_{\left(1\right)}^{2},R_{\left(2\right)}^{2},R_{\left(3\right)}^{2},\cdots</math> are the points of a one-dimensional homogeneous Poisson process. | + | Show that <math class="inline">R_{\left(1\right)}^{2},R_{\left(2\right)}^{2},R_{\left(3\right)}^{2},\cdots</math> are the points of a one-dimensional homogeneous Poisson process. |
| − | <math>P\left(R_{\left(k+1\right)}^{2}-R_{\left(k\right)}^{2}>r\right)=P\left(\ | + | <math class="inline">P\left(R_{\left(k+1\right)}^{2}-R_{\left(k\right)}^{2}>r\right)=P\left(\text{there is no tower in area }\pi r\right)=\frac{\left(\lambda\pi r\right)^{0}}{0!}e^{-\lambda\pi r}=e^{-\lambda\pi r}.</math> |
| − | <math>P\left(R_{\left(k+1\right)}^{2}-R_{\left(k\right)}^{2}\leq r\right)=P\left(\left\{ \text{there is at least one tower in area }\pi r\right\} \right)</math><math>=1-e^{-\lambda\pi r}\text{: CDF of exponential random variable}.</math> | + | <math class="inline">P\left(R_{\left(k+1\right)}^{2}-R_{\left(k\right)}^{2}\leq r\right)=P\left(\left\{ \text{there is at least one tower in area }\pi r\right\} \right)</math><math class="inline">=1-e^{-\lambda\pi r}\text{: CDF of exponential random variable}.</math> |
ref. You can see the expressions about exponentail distribution [CS1ExponentialDistribution]. | ref. You can see the expressions about exponentail distribution [CS1ExponentialDistribution]. | ||
| − | <math>R_{\left(k+1\right)}^{2}-R_{\left(k\right)}^{2}</math> is an exponential random variable with parameter <math>\lambda\pi</math> . | + | <math class="inline">R_{\left(k+1\right)}^{2}-R_{\left(k\right)}^{2}</math> is an exponential random variable with parameter <math class="inline">\lambda\pi</math> . |
| − | <math>\therefore R_{\left(1\right)}^{2},R_{\left(2\right)}^{2},R_{\left(3\right)}^{2},\cdots</math> are the points of a one-dimensional homogeneous Poisson process. | + | <math class="inline">\therefore R_{\left(1\right)}^{2},R_{\left(2\right)}^{2},R_{\left(3\right)}^{2},\cdots</math> are the points of a one-dimensional homogeneous Poisson process. |
(b) | (b) | ||
| − | What is the rate of the Poisson process in part (a)? <math>\lambda\pi</math> . | + | What is the rate of the Poisson process in part (a)? <math class="inline">\lambda\pi</math> . |
| − | cf. The mean value for the exponential random variable is <math>\frac{1}{\lambda\pi}</math> . | + | cf. The mean value for the exponential random variable is <math class="inline">\frac{1}{\lambda\pi}</math> . |
(c) | (c) | ||
| − | Determine the density function of <math>R_{\left(k\right)}</math> , the distance to the <math>k</math> -th nearest cell tower. | + | Determine the density function of <math class="inline">R_{\left(k\right)}</math> , the distance to the <math class="inline">k</math> -th nearest cell tower. |
| − | <math>F_{k}\left(x\right)\triangleq P\left(R_{\left(k\right)}\leq x\right)</math><math>=P\left(\text{There are at least }k\text{ towers within the distance between origin and }x\right)</math><math>=P\left(N\left(0,x\right)\geq k\right)=1-P\left(N\left(0,x\right)\leq k-1\right)=1-\sum_{j=0}^{k-1}\frac{\left(\lambda\pi x^{2}\right)^{j}}{j!}e^{-\lambda\pi x^{2}}.</math> | + | <math class="inline">F_{k}\left(x\right)\triangleq P\left(R_{\left(k\right)}\leq x\right)</math><math class="inline">=P\left(\text{There are at least }k\text{ towers within the distance between origin and }x\right)</math><math class="inline">=P\left(N\left(0,x\right)\geq k\right)=1-P\left(N\left(0,x\right)\leq k-1\right)=1-\sum_{j=0}^{k-1}\frac{\left(\lambda\pi x^{2}\right)^{j}}{j!}e^{-\lambda\pi x^{2}}.</math> |
| − | <math>f_{k}\left(x\right)=\frac{dF_{k}\left(x\right)}{dx}=-\sum_{j=0}^{k-1}\left\{ \frac{j\left(\lambda\pi x^{2}\right)^{j-1}\left(2\lambda\pi x\right)}{j!}e^{-\lambda\pi x^{2}}+\frac{\left(\lambda\pi x^{2}\right)^{j}}{j!}e^{-\lambda\pi x^{2}}\left(-2\lambda\pi x\right)\right\} </math><math>=\left(2\lambda\pi x\right)e^{-\lambda\pi x^{2}}\cdot\left\{ -\sum_{j=1}^{k-1}\frac{\left(\lambda\pi x^{2}\right)^{j-1}}{\left(j-1\right)!}e^{-\lambda\pi x^{2}}+\sum_{j=0}^{k-1}\frac{\left(\lambda\pi x^{2}\right)^{j}}{j!}\right\} </math><math>=\left(2\lambda\pi x\right)e^{-\lambda\pi x^{2}}\cdot\left\{ -\sum_{j=0}^{k-2}\frac{\left(\lambda\pi x^{2}\right)^{j}}{j!}+\sum_{j=0}^{k-1}\frac{\left(\lambda\pi x^{2}\right)^{j}}{j!}\right\} </math><math>=\left(2\lambda\pi x\right)e^{-\lambda\pi x^{2}}\cdot\frac{\left(\lambda\pi x^{2}\right)^{k-1}}{\left(k-1\right)!}.</math> | + | <math class="inline">f_{k}\left(x\right)=\frac{dF_{k}\left(x\right)}{dx}=-\sum_{j=0}^{k-1}\left\{ \frac{j\left(\lambda\pi x^{2}\right)^{j-1}\left(2\lambda\pi x\right)}{j!}e^{-\lambda\pi x^{2}}+\frac{\left(\lambda\pi x^{2}\right)^{j}}{j!}e^{-\lambda\pi x^{2}}\left(-2\lambda\pi x\right)\right\} </math><math class="inline">=\left(2\lambda\pi x\right)e^{-\lambda\pi x^{2}}\cdot\left\{ -\sum_{j=1}^{k-1}\frac{\left(\lambda\pi x^{2}\right)^{j-1}}{\left(j-1\right)!}e^{-\lambda\pi x^{2}}+\sum_{j=0}^{k-1}\frac{\left(\lambda\pi x^{2}\right)^{j}}{j!}\right\} </math><math class="inline">=\left(2\lambda\pi x\right)e^{-\lambda\pi x^{2}}\cdot\left\{ -\sum_{j=0}^{k-2}\frac{\left(\lambda\pi x^{2}\right)^{j}}{j!}+\sum_{j=0}^{k-1}\frac{\left(\lambda\pi x^{2}\right)^{j}}{j!}\right\} </math><math class="inline">=\left(2\lambda\pi x\right)e^{-\lambda\pi x^{2}}\cdot\frac{\left(\lambda\pi x^{2}\right)^{k-1}}{\left(k-1\right)!}.</math> |
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[[ECE600|Back to ECE600]] | [[ECE600|Back to ECE600]] | ||
| − | [[ECE 600 QE|Back to ECE 600 QE]] | + | [[ECE 600 QE|Back to my ECE 600 QE page]] |
| + | |||
| + | [[ECE_PhD_Qualifying_Exams|Back to the general ECE PHD QE page]] (for problem discussion) | ||
Latest revision as of 08:30, 27 June 2012
7.11 QE 2006 January
1 (33 points)
Let $ \mathbf{X} $ and $ \mathbf{Y} $ be two joinly distributed random variables having joint pdf
$ f_{\mathbf{XY}}\left(x,y\right)=\left\{ \begin{array}{lll} 1, & & \text{ for }0\leq x\leq1\text{ and }0\leq y\leq1\\ 0, & & \text{ elsewhere. } \end{array}\right. $
(a)
Are $ \mathbf{X} $ and $ \mathbf{Y} $ statistically independent? Justify your answer.
$ f_{\mathbf{X}}\left(x\right)=\int_{-\infty}^{\infty}f_{\mathbf{XY}}\left(x,y\right)dy=\int_{0}^{1}dy=1\text{ for }0\leq x\leq1. $
$ f_{\mathbf{Y}}\left(y\right)=\int_{-\infty}^{\infty}f_{\mathbf{XY}}\left(x,y\right)dx=\int_{0}^{1}dx=1\text{ for }0\leq y\leq1. $
Since $ f_{\mathbf{XY}}\left(x,y\right)=f_{\mathbf{X}}\left(x\right)f_{\mathbf{Y}}\left(y\right) $ , $ \mathbf{X} $ and $ \mathbf{Y} $ are $ statistically independent. $
(b)
Let $ \mathbf{Z} $ be a new random variable defined as $ \mathbf{Z}=\mathbf{X}+\mathbf{Y} $ . Find the cdf of $ \mathbf{Z} $ .
$ F_{\mathbf{Z}}\left(z\right)=P\left(\left\{ \mathbf{Z}\leq z\right\} \right)=P\left(\left\{ \mathbf{X}+\mathbf{Y}\leq z\right\} \right). $
• i) if $ z<0 $ , then $ F_{\mathbf{Z}}\left(z\right)=0 $ .
• ii) if $ z\geq2 $ , then $ F_{\mathbf{Z}}\left(z\right)=1 $ .
• iii) if $ 0\leq z\leq1 $ , then $ F_{\mathbf{Z}}\left(z\right)=\iint f_{\mathbf{XY}}\left(x,y\right)dxdy=\iint1\cdot dxdy=\frac{1}{2}z^{2} $ .
• iv) if $ 1<z<2 $ , then $ F_{\mathbf{Z}}=\iint f_{\mathbf{XY}}\left(x,y\right)dxdy=\iint1\cdot dxdy=1-\frac{1}{2}\left(2-z\right)^{2} $ .
$ \therefore F_{\mathbf{Z}}\left(z\right)=\left\{ \begin{array}{lll} 0 & & ,z<0\\ \frac{1}{2}z^{2} & & ,0\leq z\leq1\\ 1-\frac{1}{2}\left(2-z\right)^{2} & & ,1<z<2\\ 1 & & ,z\geq2 \end{array}\right. $
(c)
Find the variance of $ \mathbf{Z} $ .
$ f_{\mathbf{Z}}\left(z\right)=\left\{ \begin{array}{lll} z & & ,0\leq z\leq1\\ 2-z & & ,1<z<2\\ 0 & & \text{,otherwise.} \end{array}\right. $
$ E\left[\mathbf{Z}\right]=\int_{-\infty}^{\infty}z\cdot f_{\mathbf{Z}}\left(z\right)dz=\int_{0}^{1}z^{2}dz+\int_{1}^{2}\left(2z-z^{2}\right)dz=\frac{1}{3}z^{3}\Bigl|_{0}^{1}+z^{2}-\frac{1}{3}z^{3}\Bigl|_{1}^{2}=\frac{1}{3}+3-\frac{7}{3}=1. $ $ E\left[\mathbf{Z}^{2}\right]=\int_{-\infty}^{\infty}z^{2}\cdot f_{\mathbf{Z}}\left(z\right)dz=\int_{0}^{1}z^{3}dz+\int_{1}^{2}\left(2z^{2}-z^{3}\right)dz=\frac{1}{4}z^{4}\Bigl|_{0}^{1}+\frac{2}{3}z^{3}-\frac{1}{4}z^{4}\Bigl|_{1}^{2}=\frac{1}{4}+\frac{14}{3}-\frac{15}{4}=\frac{7}{6}. $ $ Var\left[\mathbf{Z}\right]=E\left[\mathbf{Z}^{2}\right]-\left(E\left[\mathbf{Z}\right]\right)^{2}=\frac{1}{6}. $
2 (33 points)
Suppose that $ \mathbf{X} $ and $ \mathbf{N} $ are two jointly distributed random variables, with $ \mathbf{X} $ being a continuous random variable that is uniformly distributed on the interval $ \left(0,1\right) $ and $ \mathbf{N} $ being a discrete random variable taking on values $ 0,1,2,\cdots $ and having conditional probability mass function $ p_{\mathbf{N}}\left(n|\left\{ \mathbf{X}=x\right\} \right)=x^{n}\left(1-x\right),\quad n=0,1,2,\cdots $ .
(a)
Find the probability that \mathbf{N}=n .
$ f_{\mathbf{X}}\left(x\right)=\left\{ \begin{array}{lll} 1 & & ,0\leq x\leq1\\ 0 & & ,\text{otherwise.} \end{array}\right. $
$ P\left(\left\{ \mathbf{N}=n\right\} \right)=\int_{-\infty}^{\infty}p_{\mathbf{N}}\left(n|\left\{ \mathbf{X}=x\right\} \right)f_{\mathbf{X}}\left(x\right)dx=\int_{0}^{1}x^{n}\left(1-x\right)dx $
$ =\frac{1}{n+1}x^{n+1}-\frac{1}{n+2}x^{n+2}\Bigl|_{0}^{1}=\frac{1}{n+1}-\frac{1}{n+2}=\frac{1}{\left(n+1\right)\left(n+2\right)}. $
(b)
Find the conditional density of $ \mathbf{X} $ given $ \left\{ \mathbf{N}=n\right\} $ .
By using Bayes' theorem,
$ f_{\mathbf{X}}\left(x|\left\{ \mathbf{N}=n\right\} \right)=\frac{p_{\mathbf{N}}\left(n|\left\{ \mathbf{X}=x\right\} \right)f_{\mathbf{X}}\left(x\right)}{p_{\mathbf{N}}\left(n\right)}=\left\{ \begin{array}{lll} \left(n+1\right)\left(n+2\right)x^{n}\left(1-x\right) & & ,0\leq x\leq1\\ 0 & & ,\text{otherwise.} \end{array}\right. $
(c)
Find the minimum mean-square error estimator of $ \mathbf{X} $ given $ \left\{ \mathbf{N}=n\right\} $ .
$ MMSE=E\left[\mathbf{X}|\left\{ \mathbf{N}=n\right\} \right]=\int_{-\infty}^{\infty}x\cdot f_{\mathbf{X}}\left(x|\left\{ \mathbf{N}=n\right\} \right)dx=\int_{0}^{1}\left(n+1\right)\left(n+2\right)x^{n+1}\left(1-x\right)dx $$ =\left(n+1\right)\left(n+2\right)\left(\frac{1}{n+2}x^{n+2}-\frac{1}{n+3}x^{n+3}\right)\biggl|_{0}^{1}=\left(n+1\right)\left(n+2\right)\left(\frac{1}{n+2}-\frac{1}{n+3}\right) $$ =\frac{\left(n+1\right)\left(n+2\right)}{\left(n+2\right)\left(n+3\right)}=\frac{n+1}{n+3}. $
3 (34 points)
Assume that the locations of cellular telephone towers can be accurately modeled by a 2-dimensional homogeneous Poisson process for which the following two facts are know to be true:
1. The number of towers in a region of area A is a Poisson random variable with mean \lambda A , where \lambda>0 .
2. The number of towers in any two disjoint regions are statistically independent.
Assume you are located at a point we will call the origin within this 2-dimensional region, and let $ R_{\left(1\right)}<R_{\left(2\right)}<R_{\left(3\right)}<\cdots $ be the ordered distances between the origin and the towers.
(a)
Show that $ R_{\left(1\right)}^{2},R_{\left(2\right)}^{2},R_{\left(3\right)}^{2},\cdots $ are the points of a one-dimensional homogeneous Poisson process.
$ P\left(R_{\left(k+1\right)}^{2}-R_{\left(k\right)}^{2}>r\right)=P\left(\text{there is no tower in area }\pi r\right)=\frac{\left(\lambda\pi r\right)^{0}}{0!}e^{-\lambda\pi r}=e^{-\lambda\pi r}. $
$ P\left(R_{\left(k+1\right)}^{2}-R_{\left(k\right)}^{2}\leq r\right)=P\left(\left\{ \text{there is at least one tower in area }\pi r\right\} \right) $$ =1-e^{-\lambda\pi r}\text{: CDF of exponential random variable}. $
ref. You can see the expressions about exponentail distribution [CS1ExponentialDistribution].
$ R_{\left(k+1\right)}^{2}-R_{\left(k\right)}^{2} $ is an exponential random variable with parameter $ \lambda\pi $ .
$ \therefore R_{\left(1\right)}^{2},R_{\left(2\right)}^{2},R_{\left(3\right)}^{2},\cdots $ are the points of a one-dimensional homogeneous Poisson process.
(b)
What is the rate of the Poisson process in part (a)? $ \lambda\pi $ .
cf. The mean value for the exponential random variable is $ \frac{1}{\lambda\pi} $ .
(c)
Determine the density function of $ R_{\left(k\right)} $ , the distance to the $ k $ -th nearest cell tower.
$ F_{k}\left(x\right)\triangleq P\left(R_{\left(k\right)}\leq x\right) $$ =P\left(\text{There are at least }k\text{ towers within the distance between origin and }x\right) $$ =P\left(N\left(0,x\right)\geq k\right)=1-P\left(N\left(0,x\right)\leq k-1\right)=1-\sum_{j=0}^{k-1}\frac{\left(\lambda\pi x^{2}\right)^{j}}{j!}e^{-\lambda\pi x^{2}}. $
$ f_{k}\left(x\right)=\frac{dF_{k}\left(x\right)}{dx}=-\sum_{j=0}^{k-1}\left\{ \frac{j\left(\lambda\pi x^{2}\right)^{j-1}\left(2\lambda\pi x\right)}{j!}e^{-\lambda\pi x^{2}}+\frac{\left(\lambda\pi x^{2}\right)^{j}}{j!}e^{-\lambda\pi x^{2}}\left(-2\lambda\pi x\right)\right\} $$ =\left(2\lambda\pi x\right)e^{-\lambda\pi x^{2}}\cdot\left\{ -\sum_{j=1}^{k-1}\frac{\left(\lambda\pi x^{2}\right)^{j-1}}{\left(j-1\right)!}e^{-\lambda\pi x^{2}}+\sum_{j=0}^{k-1}\frac{\left(\lambda\pi x^{2}\right)^{j}}{j!}\right\} $$ =\left(2\lambda\pi x\right)e^{-\lambda\pi x^{2}}\cdot\left\{ -\sum_{j=0}^{k-2}\frac{\left(\lambda\pi x^{2}\right)^{j}}{j!}+\sum_{j=0}^{k-1}\frac{\left(\lambda\pi x^{2}\right)^{j}}{j!}\right\} $$ =\left(2\lambda\pi x\right)e^{-\lambda\pi x^{2}}\cdot\frac{\left(\lambda\pi x^{2}\right)^{k-1}}{\left(k-1\right)!}. $
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