What happens to the shape of a sampling distribution as n increases?
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Anonymous Student 3 months ago As the sample size, n, increases, what happens to the shape of the sampling distribution of the means? A) Approaches a normal distribution B) Positively skewed C) Negatively skewed D) Approaches the exponential distribution All replies Expert Answer 3 months ago According to the "central limit theorem," as sample sizes increase, the distribution of sample means tends to be "normal," independent of the population's distribution. Suppose, x~N(μ, σ) Then the sample mean distribution is as follows, x ̄~N(μ, σ/√n) As a result, the sampling distribution of the means tends to follow a normal distribution as the sample size increases. Option A is correct. Video Transcriptin first part we have to tell them that when sample size and increases. Okay, so what happened to the shape of the sampling distribution? So when the size of the sample increases then we can say that standard deviation decreases. Okay, so if sample size increases, standard deviation decreases. So the shape of the distribution of the sample becomes approximately normal shape of the sample will be same as though sample size increases and increases regardless of the shape of the population. Okay, so no second part is that it's emphasizes and increases sample size and increases then what will happen with mean? After sample? Okay, so we have to tell this then we can say that it's emphasized, increases the mean of the sample remains same. There is no change. Okay, so the reason is that because the sample mean is an unbiased estimators for though population mean? Okay, so regardless of the sample size, it's mean is same as the population mean. Okay, now the hard part, third party is when synthesized increases then what will happened with mean and standard deviation? So if sample size increases then sample mean and standard deviation will be closer in value to population mean and standard devolution. Ok, so that's our answer. Now, deep part Now, now, 4th part that will be observed the mean and the standard deviation. So it will be absorbed by the assumption is that the normal distribution data. Normal distribution data is distributed normally. Okay, now, Last part that is 5th part is how is the result of investigation are consist with the central limit your um Okay, so our research is messed with the central limit your um that is C. L. T. Central limit to your. Um So according to CLT, it is applicable for only 30 sample size. OK applicable four only currently samples size and next is it must be followed now normal distribution. Ok? So if you increase the emphasize and the data will be close to the normal distribution. Okay, so that's our answer. I hope it is clear to you. Thank you. The law of large numbers says that if you
take samples of larger and larger size from any population, then the mean of the sampling distribution, \(\mu_{\overline x}\) tends to get closer and closer to the true population mean, \(\mu\). From the Central Limit Theorem, we know that as \(n\) gets larger and larger, the sample means follow a normal distribution. The larger n gets, the smaller the standard deviation of the sampling distribution gets. (Remember that the standard deviation for the sampling distribution of \(\overline X\) is
\(\frac{\sigma}{\sqrt{n}}\).) This means that the sample mean \(\overline x\) must be closer to the population mean \(\mu\) as \(n\) increases. We can say that \(\mu\) is the value that the sample means approach as n gets larger. The Central Limit Theorem illustrates the law of large numbers. This concept is so important and plays such a critical role in what follows it deserves to be developed further. Indeed, there are two critical issues that flow from the Central Limit Theorem and the
application of the Law of Large numbers to it. These are Taking these in order. It would seem counterintuitive that
the population may have any distribution and the distribution of means coming from it would be normally distributed. With the use of computers, experiments can be simulated that show the process by which the sampling distribution changes as the sample size is increased. These simulations show visually the results of the mathematical proof of the Central Limit Theorem. Here are three examples of very different population distributions and the evolution of the sampling
distribution to a normal distribution as the sample size increases. The top panel in these cases represents the histogram for the original data. The three panels show the histograms for 1,000 randomly drawn samples for different sample sizes: \(n=10\), \(n= 25\) and \(n=50\). As the sample size increases, and the number of samples taken remains constant, the distribution of the 1,000 sample means becomes closer to the smooth line that represents the normal distribution. Figure
\(\PageIndex{3}\) is for a normal distribution of individual observations and we would expect the sampling distribution to converge on the normal quickly. The results show this and show that even at a very small sample size the distribution is close to the normal distribution. Figure \(\PageIndex{3}\) Figure \(\PageIndex{4}\) is a uniform distribution which, a bit amazingly, quickly approached the normal distribution even with only a sample of 10. Figure \(\PageIndex{4}\) Figure \(\PageIndex{5}\) is a skewed distribution. This last one could be an exponential, geometric, or binomial with a small probability of success creating the skew in the distribution. For skewed distributions our intuition would say that this will take larger sample sizes to move to a normal distribution and indeed that is what we observe from the simulation. Nevertheless, at a sample size of 50, not considered a very large sample, the distribution of sample means has very decidedly gained the shape of the normal distribution. Figure \(\PageIndex{5}\)The Central Limit Theorem provides more than the proof that the sampling distribution of means is normally distributed. It also provides us with the mean and standard deviation of this distribution. Further, as discussed above, the expected value of the mean, \(\mu_{\overline{x}}\), is equal to the mean of the population of the original data which is what we are interested in estimating from the sample we took. We have already inserted this conclusion of the Central Limit Theorem into the formula we use for standardizing from the sampling distribution to the standard normal distribution. And finally, the Central Limit Theorem has also provided the standard deviation of the sampling distribution, \(\sigma_{\overline{x}}=\frac{\sigma}{\sqrt{n}}\), and this is critical to have to calculate probabilities of values of the new random variable, \(\overline x\). Figure \(\PageIndex{6}\) shows a sampling distribution. The mean has been marked on the horizontal axis of the \(\overline X\)'s and the standard deviation has been written to the right above the distribution. Notice that the standard deviation of the sampling distribution is the original standard deviation of the population, divided by the sample size. We have already seen that as the sample size increases the sampling distribution becomes closer and closer to the normal distribution. As this happens, the standard deviation of the sampling distribution changes in another way; the standard deviation decreases as \(n\) increases. At very very large \(n\), the standard deviation of the sampling distribution becomes very small and at infinity it collapses on top of the population mean. This is what it means that the expected value of \(\mu_{\overline{x}}\) is the population mean, \(\mu\). Figure \(\PageIndex{6}\) At non-extreme values of \(n\), this relationship between the standard deviation of the sampling distribution and the sample size plays a very important part in our ability to estimate the parameters we are interested in. Figure \(\PageIndex{7}\) shows three sampling distributions. The only change that was made is the sample size that was used to get the sample means for each distribution. As the sample size increases, \(n\) goes from 10 to 30 to 50, the standard deviations of the respective sampling distributions decrease because the sample size is in the denominator of the standard deviations of the sampling distributions.  Figure \(\PageIndex{7}\) The implications for this are very important. Figure \(\PageIndex{8}\) shows the effect of the sample size on the confidence we will have in our estimates. These are two sampling distributions from the same population. One sampling distribution was created with samples of size 10 and the other with samples of size 50. All other things constant, the sampling distribution with sample size 50 has a smaller standard deviation that causes the graph to be higher and narrower. The important effect of this is that for the same probability of one standard deviation from the mean, this distribution covers much less of a range of possible values than the other distribution. One standard deviation is marked on the \(\overline X\) axis for each distribution. This is shown by the two arrows that are plus or minus one standard deviation for each distribution. If the probability that the true mean is one standard deviation away from the mean, then for the sampling distribution with the smaller sample size, the possible range of values is much greater. A simple question is, would you rather have a sample mean from the narrow, tight distribution, or the flat, wide distribution as the estimate of the population mean? Your answer tells us why people intuitively will always choose data from a large sample rather than a small sample. The sample mean they are getting is coming from a more compact distribution. This concept will be the foundation for what will be called level of confidence in the next unit. Figure \(\PageIndex{8}\) What happens to the sampling distribution as n increases?From the Central Limit Theorem, we know that as n gets larger and larger, the sample means follow a normal distribution. The larger n gets, the smaller the standard deviation of the sampling distribution gets.
What happens to shape as sample size increases?Summary. As the sample size increases, the distribution of frequencies approximates a bell-shaped curved (i.e. normal distribution curve).
What happens when n increases?When n increases, the distributions becomes more and more normal and the spread of the distributions decreases.
How does the shape of at distribution change as the sample size increases?As explained above, the shape of the t-distribution is affected by sample size. As the sample size grows, the t-distribution gets closer and closer to a normal distribution. Theoretically, the t-distribution only becomes perfectly normal when the sample size reaches the population size.
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