Difference between revisions of "ECE PhD QE CNSIP 2015 Problem1.3" - Rhea

Revision as of 15:57, 3 December 2015

Communication, Networking, Signal and Image Processing (CS)

Question 1: Probability and Random Processes

August 2015

Let $\lambda = \frac{1}{\mu}$ , then $E(X)=E(Y)=\frac{1}{\lambda}$ .

$\phi_{X+Y}=E[e^{it(X+Y)}]=\int_{X}\int_{Y}e^{it(X+Y)}p(x,y)dxdy$

As X and Y are independent

$\phi_{X+Y}=\int_{X}\int_{Y}e^{it(x+y)}p(x)p(y)dxdy = \int_{X}e^{itx}p(x)dx\int_{Y}e^{ity}p(y)dy$

@@ Line 30: / Line 30: @@
 <math>
-\phi_{X+Y}=\int_{x}\int_{y}e^{it(x+y)}p(x)p(y)dxdy = \int_{X}e^{itx}p(x)dx\int_{Y}e^{ity}p(y)dy
+\phi_{X+Y}=\int_{X}\int_{Y}e^{it(x+y)}p(x)p(y)dxdy = \int_{X}e^{itx}p(x)dx\int_{Y}e^{ity}p(y)dy
 </math>