Difference between revisions of "Solution3 Q1 CS1 2013QE" - Rhea
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Revision as of 22:23, 22 February 2017
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[[Category:ECE PhD QE CNSIP 2013 Problem1.1]][[Category:ECE PhD QE CNSIP 2013 Problem1.1]][[Category:ECE PhD QE CNSIP 2013 Problem1.1]][[Category:ECE PhD QE CNSIP 2013 Problem1.1]][[Category:ECE PhD QE CNSIP 2013 Problem1.1]][[Category:ECE PhD QE CNSIP 2013 Problem1.1]]
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=Solution3=
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<p>
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First, we define a Bernoulli random variable
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</p>
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<p><span class="mwe-math-fallback-source-inline tex" dir="ltr">$ X = \left\{ \begin{array}{ll} 0, & the change over does not occur\\ 1, & the change over occurs \end{array} \right. $</span>
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</p><p>Then we can compute
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</p><p><span class="mwe-math-fallback-source-inline tex" dir="ltr">$P(X = 1) = P(1-P)+(1-P)P = P-{P}^{2}+P-{P}^2=2P-2{P}^{2} $</span>
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</p><p><span class="mwe-math-fallback-source-inline tex" dir="ltr">$P(X = 0) = P•P+(1-P)(1-P) = {P}^{2}+1-2P+{P}^2 $</span>
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</p><p>Define Y as the number of changes occurred in n flips, there exists at most n-1 changes
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</p><p><span class="mwe-math-fallback-source-inline tex" dir="ltr">$E(Y)=E(\sum_{i=1}^{n-1}X_i)=\sum_{i=1}^{n-1}E(X_i) $</span>
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</p><p><span class="mwe-math-fallback-source-inline tex" dir="ltr">$E(X_i)=p(X_i=1)=p(1-p)+(1-p)p=2p(1-p) $</span>
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</p><p><span class="mwe-math-fallback-source-inline tex" dir="ltr">$ E(Y)=2(n-1)p(1-p) $</span>.
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</p>[[ ECE PhD QE CNSIP 2013 Problem1.1|Back to ECE PhD QE CNSIP 2013 Problem1.1]]
Latest revision as of 22:39, 22 February 2017
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