Hypothesis Test for Proportions Section 10 3 One
- Slides: 15
Hypothesis Test for Proportions Section 10. 3 One Sample
Remember: Properties of Sampling Distribution of Proportions l l l Approximately Normal if
Test Statistic
Conditions l
Educators estimate the dropout rate is 15%. Last year 38 seniors from a random sample of 200 seniors withdrew. At a 5% significance level, is there enough evidence to reject the claim? p=true proportion of seniors who dropout Assumptions: (1) SRS (2) Approximately normal since np=200(. 15)=30 and nq=200(. 85)=270 (3) 10(200)=2000 {Pop of seniors is at least 2000} Therefore the large sample Z-test for proportions may be used. Fail to reject Ho since p-value >α. There is insufficient evidence to support the claim that the dropout rate is not 15%. What type of error might we be making?
PHANTOMS l l l l P H A N T O M S arameter ypotheses ssumptions ame the test statistic btain p-value ake decision tate conclusions in context
If the significance level is not stated – use 0. 05.
Reject Ho l There is sufficient evidence to support the claim that …. .
Fail to Reject Ho l There is insufficient evidence to support the claim that ….
A random sample of 270 CA lawyers revealed 117 who felt that the ethical standards of most lawyers are high. Does this provide strong evidence for concluding that fewer than 50% of all CA lawyers feel this way
Experts claim that 10% of murders are committed by women. Is there evidence to reject the claim if in a sample of 67 murders, 10 were committed by women. Use 0. 01 significance.
Experts claim that 10% of murders are committed by women. Is there evidence to reject the claim if in a sample of 67 murders, 10 were committed by women. Use 0. 01 significance.
A study on crime suggests that at least 40% of all arsonists were under 21 years old. Checking local crime statistics, we found that 30 out of 80 were under 21. Test at 0. 10 significance.
A telephone company representative estimates that 40% of its customers want call-waiting. To test this hypothesis, she selected a sample of 100 customers and found that 37% had call waiting. At a 1% significance, is her estimate appropriate?
A statistician read that at least 77% of the population oppose replacing $1 bills with $1 coins. To see if this claim is valid, the statistician selected a sample of 80 people and found that 55 were opposed to replacing the $1 bills. Test at 1% level.
- One gene one enzyme hypothesis
- Ccu life
- Phenylalanine
- Effect size for one sample t test
- One way anova null hypothesis
- Hypothesis in research example
- Developing null and alternative hypothesis
- Null hypothesis statistics
- Nebular hypothesis and protoplanet hypothesis venn diagram
- Two sample z test for difference in proportions
- One god one empire one emperor
- One one one little puppy run
- One king one law one faith
- Byzantine definition
- One team one plan one goal
- See one do one teach one