The mayor of a town read an article that claimed the national unemployment rate was . They suspected that the unemployment rate was lower in their town, so they took a sample of residents to test versus , where is the proportion of residents that are unemployed. They found that residents in the sample were unemployed. Using these results, they calculated a test statistic of and a P-value of approximately . Assuming the conditions for inference were met, what is an appropriate conclusion at the significance level? Choose 1 answer: Choose 1 answer: (Choice A) Reject . This is strong evidence that the town's unemployment rate is lower than . A Reject . This is strong evidence that the town's unemployment rate is lower than . (Choice B) Reject . This isn't enough evidence to conclude that the town's unemployment rate is lower than . B Reject . This isn't enough evidence to conclude that the town's unemployment rate is lower than . (Choice C) Fail to reject . This is strong evidence that the town's unemployment rate is lower than . C Fail to reject . This is strong evidence that the town's unemployment rate is lower than . (Choice D) Fail to reject . This isn't enough evidence to conclude that the town's unemployment rate is lower than . D Fail to reject . This isn't enough evidence to conclude that the town's unemployment rate is lower than .