An education rehearser claims that at most 5% of working college students are employed as teachers...

An education rehearser claims that at most 5% of working college students are employed as teachers...

An education rehearser claims that at most 5% of working college students are employed as teachers or teaching assistants. In a random sample of 250 working college students, 15 of them are employed as teachers or teaching assistants. Is there enough evidence to support your thinking at α = 0.05? 1. The proportion of students in the sample who are employed as teachers or teaching assistants is 2. Null hypothesis p̂ > 0.06 μ = 0.06 p̂ = 0.05 p...

An educated researcher claims that 57% of college students working year-round in a random sample 500...

An educated researcher claims that 57% of college students working year-round in a random sample 500 college students 285 say that they work year-round. At a= 0.01 is there enough evidence to reject the researchers claim? what is critical value? what is the standard test statistic z? what is the p value?

An education researcher claims that 58​% of college students work​ year-round. In a random sample of...

An education researcher claims that 58​% of college students work​ year-round. In a random sample of 300 college​ students, 174 say they work​ year-round. At α=0.10​, is there enough evidence to reject the​ researcher's claim? Complete parts​ (a) through​ (e) below. a) Identify the claim and state H0 and Ha. Identify the claim in this scenario. Select the correct choice below and fill in the answer box to complete your choice. ​(Type an integer or a decimal. Do not​ round.)...

A college instructor claims that the proportion of students who will fail the final exam is...

A college instructor claims that the proportion of students who will fail the final exam is less than 10%.     To test this claim, a random sample of student results on the final exam is monitored. Assume that the test statistic for this hypothesis test is −2.13. Assume the critical value for this hypothesis test is −1.645. Come to a decision for the hypothesis test and interpret your results with respect to the original claim. Select the correct answer below: a)...

The college board claims that 32% of community college students take five semesters to complete a...

The college board claims that 32% of community college students take five semesters to complete a two-year program. In a survey of 1400 randomly selected community college students enrolled in a two-year program, 401 of them took five semesters to complete their two-year program. Test the college board's claim at a level of significance of 0.01. Calculate the test statistics associated with this hypothesis. (Round your answer to 2 decimal places) Calculate the P-Value associated with the test statistics that...

A college claims that 25% of its students receive tuition discounts. In a sample of 150...

A college claims that 25% of its students receive tuition discounts. In a sample of 150 students, 35 of the students receive tuition discounts. a. Using a significance level of α=0.1, perform a two-tailed hypothesis test to determine if the college’s claim is being met. Use the confidence interval approach. b. Repeat part (a), but use the p-value approach.

recently conducted Gallup poll surveyed 1,485 randomly selected US adults and found that 48% of those...

recently conducted Gallup poll surveyed 1,485 randomly selected US adults and found that 48% of those polled approve of the job the Supreme Court is doing. The Gallup poll's margin of error for 95% confidence was given as ±5%. Students at the College of Idaho are interested in determining if the percentage of Yotes that approve of the job the Supreme Court is doing is different from 48%. They take a random sample of 30C of I students. (a) Will...

Question 3 A college professor claims the proportion of students that complete a homework assignment is...

Question 3 A college professor claims the proportion of students that complete a homework assignment is 70%.     To test this claim, a random sample of students are monitored and checked if they completed the home the algebra class. Assume that the test statistic for this hypothesis test is −1.73. Since this is a two tailed hypothesis test, assume that the critical values for this hypothesis test are −1.96 and 1.96. Come to a decision for the hypothesis test and interpret...

3) According to the institute for Students in Shackles, 67% of all college students in a...

3) According to the institute for Students in Shackles, 67% of all college students in a recent year graduated with student loan debt. The University of Central Florida reports that only 52% of its graduates from a random sample of 500 students have student loan debt. Use a hypothesis test to determine if there is enough evidence to support UCF''s claim that their student loan debt is less. Assume all conditions have been met and proceed with the hypothesis test....

An organization monitors many aspects of elementary and secondary education nationwide. Their 1996 numbers are often...

An organization monitors many aspects of elementary and secondary education nationwide. Their 1996 numbers are often used as a baseline to assess changes. In 1996, 33% of students had not been absent from school even once during the previous month. In the 2000 survey, responses from 8737 randomly selected students showed that this figure had slipped to 32​%.Officials​ would, of​ course, be concerned if student attendance were declining. Do these figures give evidence of a change in student​ attendance? Complete...