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If j,an Unbiased Estimator of j,is Consistent,then The

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If If <sub>j</sub>,an unbiased estimator of <sub>j</sub>,is consistent,then the: A) distribution of <sub>j</sub>becomes more and more loosely distributed around <sub>j</sub>as the sample size grows. B) distribution of <sub>j</sub>becomes more and more tightly distributed around <sub>j</sub>as the sample size grows. C) distribution of <sub>j</sub>tends toward a standard normal distribution as the sample size grows. D) distribution of <sub>j</sub>remains unaffected as the sample size grows. j,an unbiased estimator of If <sub>j</sub>,an unbiased estimator of <sub>j</sub>,is consistent,then the: A) distribution of <sub>j</sub>becomes more and more loosely distributed around <sub>j</sub>as the sample size grows. B) distribution of <sub>j</sub>becomes more and more tightly distributed around <sub>j</sub>as the sample size grows. C) distribution of <sub>j</sub>tends toward a standard normal distribution as the sample size grows. D) distribution of <sub>j</sub>remains unaffected as the sample size grows. j,is consistent,then the:


A) distribution of If <sub>j</sub>,an unbiased estimator of <sub>j</sub>,is consistent,then the: A) distribution of <sub>j</sub>becomes more and more loosely distributed around <sub>j</sub>as the sample size grows. B) distribution of <sub>j</sub>becomes more and more tightly distributed around <sub>j</sub>as the sample size grows. C) distribution of <sub>j</sub>tends toward a standard normal distribution as the sample size grows. D) distribution of <sub>j</sub>remains unaffected as the sample size grows. jbecomes more and more loosely distributed around
If <sub>j</sub>,an unbiased estimator of <sub>j</sub>,is consistent,then the: A) distribution of <sub>j</sub>becomes more and more loosely distributed around <sub>j</sub>as the sample size grows. B) distribution of <sub>j</sub>becomes more and more tightly distributed around <sub>j</sub>as the sample size grows. C) distribution of <sub>j</sub>tends toward a standard normal distribution as the sample size grows. D) distribution of <sub>j</sub>remains unaffected as the sample size grows. jas the sample size grows.
B) distribution of If <sub>j</sub>,an unbiased estimator of <sub>j</sub>,is consistent,then the: A) distribution of <sub>j</sub>becomes more and more loosely distributed around <sub>j</sub>as the sample size grows. B) distribution of <sub>j</sub>becomes more and more tightly distributed around <sub>j</sub>as the sample size grows. C) distribution of <sub>j</sub>tends toward a standard normal distribution as the sample size grows. D) distribution of <sub>j</sub>remains unaffected as the sample size grows. jbecomes more and more tightly distributed around
If <sub>j</sub>,an unbiased estimator of <sub>j</sub>,is consistent,then the: A) distribution of <sub>j</sub>becomes more and more loosely distributed around <sub>j</sub>as the sample size grows. B) distribution of <sub>j</sub>becomes more and more tightly distributed around <sub>j</sub>as the sample size grows. C) distribution of <sub>j</sub>tends toward a standard normal distribution as the sample size grows. D) distribution of <sub>j</sub>remains unaffected as the sample size grows. jas the sample size grows.
C) distribution of If <sub>j</sub>,an unbiased estimator of <sub>j</sub>,is consistent,then the: A) distribution of <sub>j</sub>becomes more and more loosely distributed around <sub>j</sub>as the sample size grows. B) distribution of <sub>j</sub>becomes more and more tightly distributed around <sub>j</sub>as the sample size grows. C) distribution of <sub>j</sub>tends toward a standard normal distribution as the sample size grows. D) distribution of <sub>j</sub>remains unaffected as the sample size grows. jtends toward a standard normal distribution as the sample size grows.
D) distribution of If <sub>j</sub>,an unbiased estimator of <sub>j</sub>,is consistent,then the: A) distribution of <sub>j</sub>becomes more and more loosely distributed around <sub>j</sub>as the sample size grows. B) distribution of <sub>j</sub>becomes more and more tightly distributed around <sub>j</sub>as the sample size grows. C) distribution of <sub>j</sub>tends toward a standard normal distribution as the sample size grows. D) distribution of <sub>j</sub>remains unaffected as the sample size grows. jremains unaffected as the sample size grows.

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