20) Area between two standard deviation is 95.45%
So option is C)
21) area between 0 and 2
It is 0.4770
So option D) is correct.
22)
Normal distribution is not positively skewed.
So option A) is correct.
0.In a normal distribution, plus and minus 2 standard deviations from the mean will include about...
For a normal distribution, the mean plus and minus one standard deviation is an interval that contains roughly: 50% of the cases 68% of the cases 85.5% of the cases @ 99.7% of the cases
The mean of a normal probability distribution is 400; the standard deviation is 18. a. About 68% of the observations lie between what two values? Value 1 Value 2 L b. About 95% of the observations lie between what two values? Value 1 Value 2 ences c. Practically all of the observations lie between what two values? Value 1 Value 2
The mean of a normal probability distribution is 500; the standard deviation is 14. a. About 68% of the observations lie between what two values? Value 1 Value 2 b. About 95% of the observations lie between what two values? value a Value 1 Value 2 c. Practically all of the observations lie between what two values? Value 1 Value 2
15.When a distribution is bell-shaped, approximately what percentage of data values will fall within 1 standard deviation of the mean? a. 50% c. 95% b. 68% d. 99.7% 21. If the mode is to the left of the median and the mean is to the right of the median, then the distribution is _________ skewed.
The mean of a normal probability distribution is 340; the standard deviation is 12. About 68% of the observations lie between what two values? About 95% of the observations lie between what two values? Practically all of the observations lie between what two values?
data valu es in a 7. The 68-95-99.7 rule for normal distributions states that 95% of the mally distributed data set will be within 2 standard deviations of the mear Generate numbers with a distribution that has fewer than 95% of the data values within 2 standard deviations of the mean. Can you generate a set that has many fewer than 95% of the data values within 2 standard deviations of the mean? How small can you make that percentage?...
If a normal distribution has a mean of 30 and a standard deviation of 5, thenA) the median is 35 and the mode is 25.B) the median is 30 and the mode is 30.C) the median is 30 and the mode is 35.D) the median is 25 and the mode is 35.
Assume that a normal distribution of data has a mean of 12 and a standard deviation of 3. Use the 68-95-99.7 rule to find the percentage of values that lie below 9.
In a normal distribution, if x bar represents the mean and o represents the standard deviation what percent of information falls between x bar and x bar + o? a. 34 b. 50 c. 68 d. 95
The distribution of the annual income of mid-management at Everbright Battery approximates a normal distribution with a mean of $75,000 and a standard deviation of $1,500 a. 68% lie between +16 from the mean => b. 95 % lie between 20 from the mean => c. Virtually all, but not totally all, is between 30 from the mean => d. Can the median and mode income be the same as the mean? e. Is the distribution symmetrical? f. Approximately, what...