How tired are students in the morning ? Jose Almanza Period 1 2013.

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Inference about a Population Mean

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Presentation transcript:

How tired are students in the morning ? Jose Almanza Period

California Standards 8.0 Student organized and describe distribution of data by using of different methods, including frequency table, histogram, standard line and bar graphs, stem-and-leaf displays, scatter plots, and box of whisker plots Students determine confidence interval for a simple random sample from a normal distribution of data and determine the sample size required for a desired margin of error Student determine the P-value for a statistic for a simple random sample from a normal distribution.

Hypothesis I believe the average is 7 from a rate from

Data Collection I asked 50 juniors and 50 seniors to rate themselves from 1-10 on how tired they are in the morning.

Data Rate of 1-1( of how tired you are in the morning ? Juniors= 3,6,6,3,1,1,4,5,3,1,5,6,2,7,2,1,1,4,3,6,5,7,4,6,6, 6,4,5,3,2,3,3,2,1,4,5,6,4,3,5,4,4,4,3,1,1,2,6,7,8 Seniors= 3,5,8,8,5,7,4,7,7,8,4,6,5,4,3,8,7,7,6,5,8,9,4,3,3, 3,5,2,7,6,7,5,6,5,5,4,2,3,4,2,4,6,7,7,2,4,8,6,7,4

Statistics Mean = 4.59 and Standard Deviation = 2.040

Confidence Interval 90% Confidence Interval Z-Interval (4.2544,4.9256) We are 90% confident the mean on how tired you are in the morning for juniors and seniors is between 4.25 to 4.93

Hypothesis Testing 1.Hypothesis 2.Test Statistics 3.At 5% level of significance, we reject. There is not enough evidence to support the claim.

Error Analysis The sample mean is 4.59, and the 90% confidence level for the population mean is between 4.25 to The sample error is that the seniors and juniors wake up at different times in the morning.

Conclusion I hypothesized that Century students average is 7 on how tired they are in the morning. In my survey of 100 students, I find the sample mean of 4.59 with a standard deviation of I conclude that the population mean for all the students is between 4.25 to 4.93 with 90% confident. I test my initial hypothesis with 5% level of significance, and confirm my hypothesis is wrong.