Answer:
a) 90% Confidence interval For population proportion of successes = (0.315, 0.485)
b) 90% Confidence interval For population proportion of failures = (0.515, 0.685)
Explanation:
A random sample of 90 observations results in 36 successes. [You may find it useful to reference the z table.]
a. Construct the a 90% confidence interval for the population proportion of successes. (Round intermediate calculations to at least 4 decimal places. Round "z" value and final answers to 3 decimal places.)
Confidence Interval for the population proportion is basically an interval of range of values where the true population proportion can be found with a certain level of confidence.
Mathematically,
Confidence Interval = (Sample proportion) ± (Margin of error)
Sample proportion = proportion of success = (36/90) = 0.40
Margin of Error is the width of the confidence interval about the mean.
It is given mathematically as,
Margin of Error = (Critical value) × (standard Error)
Critical value at 90% confidence interval
The question asks us to use the z-value. We should be using the t- value though as we do not have any information on the population standard deviation.
Critical value = 1.645 (from the z-tables)
Standard error of the mean
= σₓ = √[p(1-p)/n]
p = 0.40
n = sample size = 90
σₓ = √(0.4×0.6/90) = 0.0516
90% Confidence Interval = (Sample proportion) ± [(Critical value) × (standard Error)]
CI = 0.40 ± (1.645 × 0.0516)
CI = 0.40 ± 0.0849
90% CI = (0.315, 0.485)
90% Confidence interval For successes = (0.315, 0.485)
b. Construct the a 90% confidence interval for the population proportion of failures. (Round intermediate calculations to at least 4 decimal places. Round "z" value and final answers to 3 decimal places.)
Confidence Interval = (Sample proportion) ± (Margin of error)
Sample proportion = proportion of failures = 1 - 0.40 = 0.60
Margin of Error = (Critical value) × (standard Error)
Critical value at 90% confidence interval
The question asks us to use the z-value. We should be using the t- value though as we do not have any information on the population standard deviation.
Critical value = 1.645 (from the z-tables)
Standard error of the mean
= σₓ = √[p(1-p)/n]
p = 0.60
n = sample size = 90
σₓ = √(0.6×0.4/90) = 0.0516
CI = 0.60 ± (1.645 × 0.0516)
CI = 0.60 ± 0.0849
90% CI = (0.515, 0.685)
90% Confidence interval For failures = (0.515, 0.685)
Hope this Helps!!!