The central limit theorem states that if a random sample of size n is drawn from a population, then the sampling distribution of the sample mean:Group of answer choicesis approximately normal if n ≥ 30.is approximately normal if the underlying population is normal.has the same variance as the population.is approximately normal if n < 30.
Question
The central limit theorem states that if a random sample of size n is drawn from a population, then the sampling distribution of the sample mean:
- Group of answer choices
- is approximately normal if n ≥ 30.
- is approximately normal if the underlying population is normal.
- has the same variance as the population.
- is approximately normal if n < 30.
Solution
The correct answer is "is approximately normal if n ≥ 30." The Central Limit Theorem states that if you have a population with mean μ and standard deviation σ and take sufficiently large random samples from the population with replacement, then the distribution of the sample means will be approximately normally distributed. This will hold true regardless of whether the source population is normal or skewed, provided the sample size is sufficiently large (typically n ≥ 30).
Similar Questions
The central limit theorem states that:a.The mean of a population is equal to the mean of the sampleb.The sample mean will always be equal to the population meanc.The sampling distribution of the sample mean approaches a normal distribution as the sample size increasesd.The sample mean is always greater than the population mean
Central Limit Theorem for sampling distribution is valid only when:Select one:a. Large samples drawn from any independent and identically distributed populationb. The population follows normal distributionc. Samples are drawn from any independent and identically distributed populationd. The population follows a normal distribution and the sample size should be at least 30
According to the Central Limit Theorem, the sampling distribution of the sample mean becomes approximately normally distributed asthe standard error increasesthe population variance decreasesthe size of the population increasesthe number of samples drawn increasesthe size of the sample increases
Now consider the Central Limit Theorem (CLT). How confidently can you use a sample from this population to make inferences about the population mean?
Why is the Central Limit Theorem so convenient?Question 1Answera.Because of that we know that the mean will also be in the center.b.Because we know how likely sample-means will be.c.a & bClear my choiceQuestion 2Not yet answeredMarked out of 1.00Flag questionTipsQuestion textThe Central Limit Theorem states that every distribution is always normally distributedQuestion 2Answera.Trueb.FalseClear my choiceQuestion 3Not yet answeredMarked out of 1.00Flag questionTipsQuestion textAn important condition for the central limit theorem is for the sample size to be sufficiently large. What is the minimum sample size for the sample to be considered sufficiently large?Question 3Answera.1b.100c.30Clear my choiceQuestion 4Not yet answeredMarked out of 1.00Flag questionTipsQuestion textFrom the distribution of a random variable X a random sample of size n is drawn. What is the distribution of x̄?A. normally distributedB. x̄ )C. a and bQuestion 4Answera.Ab.Bc.CClear my choiceQuestion 5Not yet answeredMarked out of 1.00Flag questionTipsQuestion textWhich requirements should the Sampling Distribution fulfill to be normally distributed?Question 5Answera.Population must be normally distributed.b.Sample size must be sufficiently large.c.You must have more than 30 observations.d.b & cClear my choice
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