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Published byCharles Shepherd Modified over 8 years ago
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Point Estimates
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Remember….. Population It is the set of all objects being studied Sample It is a subset of the population
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Parameter Quantity computed from values in a population Usually not known
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Statistic Quantity computed from values in a sample. Computed directly from sample data
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Point Estimate It is a single number that is based on sample data that represents a plausible value of the characteristic for the population. It’s the statistic (from a sample) that we use to estimate the parameter (of the population).
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Examples To find a point estimate of the average height of students in this class I could use a sample of 10 people and find their average height. To find the percent of green M&M’s in a bag, I could use 20 bags and find the average percent in those bags to estimate the true population proportion.
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An article on affirmative action reported that 537 of the 1013 people surveyed believed that affirmative action programs should be continued. Find a point estimate of the population proportion.
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Calories per ½ cup serving for 16 popular chocolate ice cream is shown below. Find a point estimate for the number of calories in a serving of chocolate ice cream. 270170160 199160150180 150140160290 190170110170
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Calories per ½ cup serving for 16 popular chocolate ice cream is shown below. Find a point estimate for the number of calories in a serving of chocolate ice cream. 270170160 199160150180 150140160290 190170110170 We could use the mean: median :
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Calories per ½ cup serving for 16 popular chocolate ice cream is shown below. Find a point estimate for the proportion that are greater than 190. 270170160 199160150180 150140160290 190170110170
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We tend to pick an estimate that yields an accurate estimate. To estimate a proportion – we use a proportion (not a mean). To estimate how many – we use the mean, median, or trimmed mean To estimate variation – we use standard deviation, variance, or range
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For our class (the population), find a point estimate for the … Average height Difference between height of girls & height of the boys Proportion with brown eyes
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Unbiased Statistic It’s a statistic whose mean value is equal to the value of the population being estimated. Biased – not equal to the population being estimated.
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Examples of unbiased estimators mean: median trimmed mean Proportion: Variance:
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Biased: Range If using a sample – it will only equal the population if you have the lowest & highest values. The probability for this to happen is very small – almost 0. Thus it’s biased because for most, the sample range is smaller than the population range.
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Airborne Times: 57, 54, 55, 51, 56, 48, 52, 51, 59, 59. Find point estimate of mean & variance. Put them in list 1 Do 1-var Stat To get the variance, you must take the st. dev. (Sx) and square it.
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Confidence Interval Proportions
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Remember Point estimate is different every time since it depends on the sample selected. In choosing a confidence interval, it is not a single point but rather an interval of reasonable values.
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Confidence Interval Interval of reasonable values for the characteristic chosen with a degree of confidence. The value of the population characteristic will likely be between the upper and lower bounds.
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Confidence Level This represents the success rate of the method used to construct the interval. If I repeat the process over & over, approximately this % of the intervals will contain the true parameter.
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Remember – for sampling distributions of proportions….
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So, if I want to be 95% confident that my interval contains the true proportion, how many deviations would I be from the mean proportion?
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So what’s the critical z value that corresponds to a 98% confidence.
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So what’s the formula for a Confidence Interval?
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PANIC! P – Parameter (tell what we are estimating) A – Assumptions N – Name the Formula I – Interval (calculate it) C - Conclusion
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When 320 college students were surveyed, 125 said they own their car. Construct a 90% confidence interval for the proportion of college students who own their car.
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A survey of 100 fatal accidents showed that 52 were alcohol related. Construct a 98% confidence interval for the proportion of fatal accidents that were alcohol related.
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Explain what the 90% confidence level means. If I repeat this process over & over, 90% of the intervals found will contain the true population proportion of households that own at least one gun.
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What happens to the width of the interval if we go from 90% confidence to 98% confidence? What happens to the width of the interval is we increase the sample size?
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Homework Worksheet
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