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[[Lecture30_blog_ECE302S13_Boutin|30]])
 
[[Lecture30_blog_ECE302S13_Boutin|30]])
 
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In Lecture 21,  
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In Lecture 21, we continued our discussion of normally distributed random variables, still focusing on the one-dimensional case. In particular, we showed how to compute the expectation and the variance of a normally distributed random variable: with the two tricks we introduced, the computations turned out to be quite reasonable. We also considered the effect of a linear transformation on a normally distributed random variable: it was observed that the resulting random variable Y=aX+b is also normally distributed. The relation between the mean and variance of X and that of Y=aX+b was given. However, note that we had already seen that relation when we looked  at the expectation and variance of aX+b in general.
  
  
 
==Action items for students (to be completed before next lecture)==
 
==Action items for students (to be completed before next lecture)==
*Read Section 6.1 in the textbook.
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*Read Section 5.1 in the textbook.
*Solve the following practice problems and consider sharing your answers for discussion and feedback. (You
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*Solve the following practice problems and consider sharing your answers for discussion and feedback. (You will hand in your solution as part of homework 5.)
::[[Practice_Question_uniform_random_variable_CDF2_ECE302S13Boutin]]
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::[[Practice_Question_linear_random_variable_probability_ECE302S13Boutin|Compute a probability]]
::[[Practice_Question_uniform_random_variable_CDF_ECE302S13Boutin]]
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::[[Practice_Question_uniform_random_variable_CDF_ECE302S13Boutin|Find the CDF]]
::[[Practice_Question_uniform_random_variable_mean_ECE302S13Boutin]]
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::[[Practice_Question_uniform_random_variable_mean_ECE302S13Boutin|Compute the mean]]
  
 
Previous: [[Lecture20_blog_ECE302S13_Boutin|Lecture 20]]
 
Previous: [[Lecture20_blog_ECE302S13_Boutin|Lecture 20]]

Latest revision as of 07:21, 27 February 2013


Lecture 21 Blog, ECE302 Spring 2013, Prof. Boutin

Monday February 25, 2013 (Week 8) - See Course Outline.

(Other blogs 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17, 18, 19, 20, 21, 22, 23, 24, 25, 26, 27, 28, 29, 30)


In Lecture 21, we continued our discussion of normally distributed random variables, still focusing on the one-dimensional case. In particular, we showed how to compute the expectation and the variance of a normally distributed random variable: with the two tricks we introduced, the computations turned out to be quite reasonable. We also considered the effect of a linear transformation on a normally distributed random variable: it was observed that the resulting random variable Y=aX+b is also normally distributed. The relation between the mean and variance of X and that of Y=aX+b was given. However, note that we had already seen that relation when we looked at the expectation and variance of aX+b in general.


Action items for students (to be completed before next lecture)

  • Read Section 5.1 in the textbook.
  • Solve the following practice problems and consider sharing your answers for discussion and feedback. (You will hand in your solution as part of homework 5.)
Compute a probability
Find the CDF
Compute the mean

Previous: Lecture 20

Next: Lecture 22


Back to 2013 Spring ECE302 Boutin

Alumni Liaison

Ph.D. on Applied Mathematics in Aug 2007. Involved on applications of image super-resolution to electron microscopy

Francisco Blanco-Silva