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Question
A fair coin is tossed four times. Let X denote the number of heads occurring. Find the probability distribution, mean and variance of X.
Solution
If a coin is tossed 4 times, then the possible outcomes are:
HHHH, HHHT, HHTT, HTTT, THHH, ...
For the longest string of heads, X can take the values 0, 1, 2, 3 and 4.
(As when a coin is tossed 4 times, we can get minimum 0 and maximum 4 strings.)
Now,
\[P\left( X = 0 \right) = P\left( 0 \text{ head }\right) = \frac{1}{16}\]
\[P\left( X = 1 \right) = P\left( 1 \text{ head } \right) = \frac{4}{16}\]
\[P\left( X = 2 \right) = P\left( 2 \text{ heads } \right) = \frac{6}{16}\]
\[P\left( X = 3 \right) = P\left( 3 \text{ heads } \right) = \frac{4}{16}\]
\[P\left( X = 4 \right) = P\left( 4 \text{ heads } \right) = \frac{1}{16}\]
Thus, the probability distribution of X is given by
| x | P(X) |
| 0 |
\[\frac{1}{16}\]
|
| 1 |
\[\frac{4}{16}\]
|
| 2 |
\[\frac{6}{16}\]
|
| 3 |
\[\frac{4}{16}\]
|
| 4 |
\[\frac{1}{16}\]
|
Computation of mean and variance
| xi | pi | pixi | pixi2 |
| 0 |
\[\frac{1}{16}\]
|
0 | 0 |
| 1 |
\[\frac{4}{16}\]
|
\[\frac{4}{16}\]
|
\[\frac{4}{16}\]
|
| 2 |
\[\frac{6}{16}\]
|
\[\frac{12}{16}\]
|
\[\frac{24}{16}\]
|
| 3 |
\[\frac{4}{16}\]
|
\[\frac{12}{16}\]
|
\[\frac{36}{16}\]
|
| 4 |
\[\frac{1}{16}\]
|
\[\frac{4}{16}\]
|
1 |
| `∑`pixi = 2 | `∑`pixi2=5
|
\[\text{ Mean } = \sum p_i x_i = 2\]
\[\text{ Variance } = \sum p_i {x_i}2^{}_{} - \left( \text{ Mean } \right)^2 \]
\[ = 5 - 4\]
\[ = 1\]
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