Now , the estimates of the sample proportions are ,
The pooled estimate for the proportion is ,
(a) The null and alternative hypothesis is ,
The test is right-tailed test.
(b) The test statistic is ,
(c) p-value=
; From standard normal distribution table
(d) Decision : Here , p-value=0.0446<0.1
Therefore , reject Ho
(e) Conclusion : There is not sufficient evidence from the sample data to warrant rejection of the claim.
Test the claim that the proportion of children from the low income group that drew the...
Test the claim that the proportion of children from the low income group that drew the nickel too large is greater than the proportion of the high income group that drew the nickel too large. Test at the 0.1 significance level. 19 of 40 children in the low income group drew the nickel too large, and 11 of 35 did in the high income group. a) If we use L to denote the low income group and H to denote...
The test claim that the proportion of children from the low income group that drew the nickle too large is greater than the proportion of the high income group that drew the nickle too large. Test at the 0.05 significance level. 25 of 40 children in the low income group drew the nickle too large, and 7 of 35 in the high income group. A) if we us L to denote the low income group and H to denote the...
Test the claim that the proportion of children from the low income group that drew the nickel too large is greater than the proportion of the high income group that drew the nickel too large. Test at the 0.1 significance level. 21 of 40 children in the low income group drew the nickel too large, and 15 of 35 did in the high income group. a) If we use LL to denote the low income group and HH to denote...
Homework > Homework 6.2 To begin answering our original question, test the claim that the proportion of children from the low income group that drew the nickel too large is greater than the proportion of the high income group that drew the nickel too large. Test at the 0.1 significance level. Recall 17 of 40 children in the low income group drew the nickel too large, and 12 of 35 did in the high income group a) If we use...
Given p = 0.3143 and N= 35 for the high income group, Test the claim that the proportion of children in the high income group that drew the nickel too large is smaller than 50%. Test at the 0.01 significance level. a) Identify the correct alternative hypothesis: Op = .50 Op > .50 Ou > .50 ou < .50 Op < .50 Ou = .50 AA. VV Give all answers correct to 3 decimal places. b) The test statistic value...
To begin answering our original question, test the claim that the proportion of children from the low income group that drew the nickel too large is greater than the proportion of the high income group that drew the nickel too large. Test at the 0.01 significance level.Recall 18 of 40 children in the low income group drew the nickel too large, and 13 of 35 did in the high income group.a) If we use LL to denote the low income...
1) Based on a sample of 600 people, 33% owned cats The test statistic is: (to 2 decimals) The p-value is: (to 2 decimals) 2) Based on a sample of 80 men, 30% owned cats Based on a sample of 60 women, 45% owned cats The test statistic is: (to 2 decimals) The p-value is: (to 2 decimals) 3) Exercise 6.13 presents the results of a poll evaluating support for the health care public option plan in 2009. 70% of 819 Democrats and 42%...
Homework > Homework 7.1 Given p = 0.4 and N = 35 for the high income group, Test the claim that the proportion of children in the high income group that drew the nickel too large is smaller than 50%. Test at the 0.1 significance level. a) Identify the correct alternative hypothesis: ON > .50 Op<.50 Op > 50 Op.50 Op<.50 OM.50 Give all answers correct to 3 decimal places. b) The test statistic value is: c) Using the P-value...
1) You want to obtain a sample to estimate a population mean. Based on previous evidence, you believe the population standard deviation is approximately σ=20.5σ=20.5. You would like to be 90% confident that your esimate is within 10 of the true population mean. How large of a sample size is required? n = Use a critical value accurate to three decimal places, and do not round mid-calculation — this is important for the system to be able to give hints...
You wish to test the following claim ( H a H a ) at a significance level of α = 0.02 α = 0.02 H o : μ = 74.5 H a : μ ≠ 74.5 You believe the population is normally distributed and you know the standard deviation is σ = 14.8. You obtain a sample mean of M = 67.5 for a sample of size n = 26 What is the critical value for this test? (Report answer...