In a three-digit lottery, each of the three digits is supposed to have the same

ID: 3253702 • Letter: I

Question

In a three-digit lottery, each of the three digits is supposed to have the same probability of occurrence (counting initial blanks as zeros, e.g., 32 is treated as 032). The table shows the frequency of occurrence of each digit for 90 consecutive daily three-digit drawings. (a) Calculate the chi-square test statistic, degrees of freedom, and the p-value. (Perform a uniform goodness-of. fit test. Round your test statistic value to 2 decimal places and the p-value to 4 decimal places.) Test statistic d.f. p-value

Explanation / Answer

X^2 = sum of [ (Oi – Ei)^2 / Ei ]

Oi = Observed Value

Ei = Expected Value

270

Oi - Ei

-9

-12

-1

-6

(Oi - Ei)^2

144

(Oi - Ei)^2/Ei

3.00

5.33

0.04

0.33

1.33

0.33

1.81

2.37

0.59

15.48

d.f = 10 - 1

= 9

p-value = chidist(15.48,9)

= 0.0786

Answer:

Test Statistics = 15.48

d.f = 9

p-value = 0.0786

270

Oi - Ei

-9

-12

-1

-6

(Oi - Ei)^2

144

(Oi - Ei)^2/Ei

3.00

5.33

0.04

0.33

1.33

0.33

1.81

2.37

0.59

15.48

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In a three-digit lottery, each of the three digits is supposed to have the same

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In a three-digit lottery, each of the three digits is supposed to have the same

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