ผลต่างระหว่างรุ่นของ "Probstat/notes/random variables"
Jittat (คุย | มีส่วนร่วม) |
Jittat (คุย | มีส่วนร่วม) |
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(ไม่แสดง 4 รุ่นระหว่างกลางโดยผู้ใช้คนเดียวกัน) | |||
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− | : ''This is part of [[probstat]].'' | + | : ''This is part of [[probstat]]. These notes are meant to be used in complement to the video lectures. They only contain summary of the materials discussed in the video. Don't use them to avoid watching the clips please.'' |
In many cases, after we perform a random experiment, we are interested in certain quantity from the outcome, not the actual outcome. In that case, we can define a '''random variable''', which is a function from the sample space to real numbers, to represent the random quantity that we are interested in. | In many cases, after we perform a random experiment, we are interested in certain quantity from the outcome, not the actual outcome. In that case, we can define a '''random variable''', which is a function from the sample space to real numbers, to represent the random quantity that we are interested in. | ||
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The whole point of having probability models is that we want to say "something" about the experiments without having to perform them or exhaustively trying all their possible outcomes. For a given random variable, we would like to have "some number" that represents it on average. From this motivation, we have the definition of the expectation as follows. | The whole point of having probability models is that we want to say "something" about the experiments without having to perform them or exhaustively trying all their possible outcomes. For a given random variable, we would like to have "some number" that represents it on average. From this motivation, we have the definition of the expectation as follows. | ||
− | For a integer random variables ''X'', the '''expected value''' of ''X'' (or the '''expectation''' of ''X''), denoted by E[''X''] is defined as | + | {{กล่องฟ้า|For a integer random variables ''X'', the '''expected value''' of ''X'' (or the '''expectation''' of ''X''), denoted by E[''X''] is defined as |
− | <math>\mathrm{E}[X] = \sum_{i=-\infty}^{\infty} i\cdot P\{X=i\}</math>. | + | <center><math>\mathrm{E}[X] = \sum_{i=-\infty}^{\infty} i\cdot P\{X=i\}</math>.</center> |
+ | }} | ||
This is just the weighted average of the possible values of ''X''. (Note that each value ''i'' is weighted by its weight ''P{ X = i }''.) | This is just the weighted average of the possible values of ''X''. (Note that each value ''i'' is weighted by its weight ''P{ X = i }''.) | ||
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From this definition, we can compute expectations related to random variables ''X'' and ''Y'' defined previously. | From this definition, we can compute expectations related to random variables ''X'' and ''Y'' defined previously. | ||
− | + | {{กล่องเทา|'''EX1:''' <math>\mathrm{E}[X] = \left( 2\cdot\frac{1}{36} + | |
3\cdot\frac{2}{36} + | 3\cdot\frac{2}{36} + | ||
4\cdot\frac{3}{36} + | 4\cdot\frac{3}{36} + | ||
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11\cdot\frac{2}{36} + | 11\cdot\frac{2}{36} + | ||
12\cdot\frac{1}{36} \right) = 7.</math> | 12\cdot\frac{1}{36} \right) = 7.</math> | ||
+ | }} | ||
− | + | {{กล่องเทา|'''EX2:''' <math>\mathrm{E}[Y] = 2\cdot\frac{1}{6} + 3\cdot\frac{1}{3} + 4\cdot\frac{1}{2} = \frac{10}{3}\approx 3.3333</math>.}} | |
− | + | {{กล่องเทา|'''EX3:''' We can also compute the expectation of some function of a random variable. Suppose that we want to compute E[''Y''<sup>2</sup>]. We can look at all possible values of ''Y'' and take the average over the values of ''Y''<sup>2</sup> weighted by their probability. I.e., | |
<math>\mathrm{E}[Y^2] = 2^2\cdot P\{Y^2 = 2^2\} + 3^2\cdot P\{Y^2 = 3^2\} + 4^2\cdot P\{Y^2 = 4^2\}</math> | <math>\mathrm{E}[Y^2] = 2^2\cdot P\{Y^2 = 2^2\} + 3^2\cdot P\{Y^2 = 3^2\} + 4^2\cdot P\{Y^2 = 4^2\}</math> | ||
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<math> = 4\cdot\frac{1}{6} + 9\cdot\frac{1}{3} + 16\cdot\frac{1}{2} = 11\frac{2}{3}.</math> | <math> = 4\cdot\frac{1}{6} + 9\cdot\frac{1}{3} + 16\cdot\frac{1}{2} = 11\frac{2}{3}.</math> | ||
+ | }} | ||
− | + | {{กล่องเทา|'''EX4:''' As another example, consider a random variable ''Z'' which is -1 with probability 1/3, 0 with probability 1/3, and 1 with probability 1/3. We can find its expectation: | |
<math>\mathrm{E}[Z] = -1\cdot P\{Z=-1\} + 0\cdot P\{Z=0\} + 1\cdot P\{Z=1\} | <math>\mathrm{E}[Z] = -1\cdot P\{Z=-1\} + 0\cdot P\{Z=0\} + 1\cdot P\{Z=1\} | ||
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<math>\mathrm{E}[Z^2] = (-1)^2\cdot P\{Z=-1\} + (0)^2\cdot P\{Z=0\} + (1)^2\cdot P\{Z=1\} | <math>\mathrm{E}[Z^2] = (-1)^2\cdot P\{Z=-1\} + (0)^2\cdot P\{Z=0\} + (1)^2\cdot P\{Z=1\} | ||
= (-1)^2\cdot\frac{1}{3} + (0)^2\cdot\frac{1}{3} + (1)^2\cdot\frac{1}{3} = 2/3.</math> | = (-1)^2\cdot\frac{1}{3} + (0)^2\cdot\frac{1}{3} + (1)^2\cdot\frac{1}{3} = 2/3.</math> | ||
+ | }} |
รุ่นแก้ไขปัจจุบันเมื่อ 04:01, 18 กันยายน 2557
- This is part of probstat. These notes are meant to be used in complement to the video lectures. They only contain summary of the materials discussed in the video. Don't use them to avoid watching the clips please.
In many cases, after we perform a random experiment, we are interested in certain quantity from the outcome, not the actual outcome. In that case, we can define a random variable, which is a function from the sample space to real numbers, to represent the random quantity that we are interested in.
For example, consider the following experiment. We toss two dice. Let a random variable X be the sum of the values of these two dice. The table below shows the outcomes and probabilities related to X.
i | Outcomes for which X = i | Probability P{ X = i } |
2 | (1,1) | 1/36 |
3 | (1,2), (2,1) | 2/36 |
4 | (1,3), (2,2), (3,1) | 3/36 |
5 | (1,4), (2,3), (3,2), (4,1) | 4/36 |
6 | (1,5), (2,4), (3,3), (4,2), (5,1) | 5/36 |
7 | (1,6), (2,5), (3,4), (4,3), (5,2), (6,1) | 6/36 |
8 | (2,6), (3,5), (4,4), (5,3), (6,2) | 5/36 |
9 | (3,6), (4,5), (5,4), (6,4) | 4/36 |
10 | (4,6), (5,5), (6,4) | 3/36 |
11 | (5,6), (6,5) | 2/36 |
12 | (6,6) | 1/36 |
A random variable X also induces events related to it. From the previous example, the event that X=10 corresponds to the subset {(4,6), (5,5), 6,4)} of the sample space. Also, if the event X >= 11 corresponds to {(5,6), (6,5), (6,6)}.
Therefore, it is reasonable to consider the probability of events defined by random variables. From the two-dice example, we have P{ X >= 11 } = P({(5,6), (6,5), (6,6)}) = 3/36.
Given a random variable X, a probability mass function p of X is defined as p(i) = P{ X = i }. We usually denote the probability mass function as pmf.
Another example
Suppose that we pick two numbers from the set {1,2,3,4} without replacement. Let Y be the larger number. The following table shows each events defined on various values of Y.
i | Outcomes | Probability P{ Y = i } |
1 | - | 0 |
2 | (1,2), (2,1) | 2/12 = 1/6 |
3 | (1,3), (2,3), (3,1), (3,2) | 4/12 = 1/3 |
4 | (1,4), (2,4), (3,4), (4,1), (4,2), (4,3) | 6/12 = 1/2 |
Expectations
The whole point of having probability models is that we want to say "something" about the experiments without having to perform them or exhaustively trying all their possible outcomes. For a given random variable, we would like to have "some number" that represents it on average. From this motivation, we have the definition of the expectation as follows.
For a integer random variables X, the expected value of X (or the expectation of X), denoted by E[X] is defined as
This is just the weighted average of the possible values of X. (Note that each value i is weighted by its weight P{ X = i }.)
From this definition, we can compute expectations related to random variables X and Y defined previously.
EX1:
EX2: .
EX3: We can also compute the expectation of some function of a random variable. Suppose that we want to compute E[Y2]. We can look at all possible values of Y and take the average over the values of Y2 weighted by their probability. I.e.,
EX4: As another example, consider a random variable Z which is -1 with probability 1/3, 0 with probability 1/3, and 1 with probability 1/3. We can find its expectation:
We can also find :