Final answer:
The normal approximation to the binomial distribution gives us a mean of 938.400 and a standard deviation of approximately 20.045 for a poll of 1380 people with 68% support for the incumbent.
Step-by-step explanation:
The question asks about using the normal approximation to the binomial distribution to determine the mean and standard deviation of a survey sample in an election. Given that 68% of people supported reelecting the incumbent and the poll size is 1380 people, the mean (μ) and standard deviation (σ) can be calculated using the formulas for a binomial distribution:
- Mean (μ) = n * p
- Standard deviation (σ) = sqrt(n * p * (1 - p))
Where 'n' is the sample size and 'p' is the probability of success (in this case, the support for reelecting the incumbent).
Therefore:
- The mean (μ) = 1380 * 0.68 = 938.4
- The standard deviation (σ) = sqrt(1380 * 0.68 * 0.32) = sqrt(1380 * 0.2176) which equals approximately 20.045.
Thus, the mean number of people who support reelecting the incumbent out of a poll of 1380 people is 938.400, and the standard deviation is approximately 20.045 to three decimal places.