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Question
Find the variance of the distribution:
| X | 0 | 1 | 2 | 3 | 4 | 5 |
| P(X) | `1/6` | `5/18` | `2/9` | `1/6` | `1/9` | `1/18` |
Sum
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Solution
We know that,
Variance (X) = E(X2) – [E(X)]2
E(X) = `sum_("i" = 1)^"n" "p"_"i"x_"i"`
= `0 xx 1/6 + 1 xx 5/18 + 2 xx 2/9 + 3 xx 1/6 + 4 xx 1/9 + 5 xx 1/18`
= `0 + 5/18 + 4/9 + 3/6 + 4/9 + 5/118`
= `(5 + 8 + 9 + 8 + 5)/18`
= `35/18`
E(X)2 = `0 xx 1/6 + 1 xx 5/18 + 4 xx 2/9 + 9 xx 1/6 + 16 xx 1/9 + 25 xx 1/18`
= `5/18 + 8/9 + 9/6 + 16/9 + 25/18`
= `(5 + 16 + 27 + 32 + 25)/18`
= `105/18`
∴ Var(x) = `105/18 - 35/18 xx 35/18`
= `(1890 - 1225)/324`
= `665/324`
Hence, the required variance is `665/324`.
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Variance of a Random Variable
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