Central Limit Theorem Activity e 1. First, pick the normal distribution from which to sample. Observe how the graph of the distribution of the sample mean changes as the sample size increases from / = 2, then n = 9. n = 25, n = 36, and finally, n = 100. Does the distribution of the sample means remain bell-shaped (graph on the right) as the sample size increases? What happens to the mean of the sample means / (graph on the right) as the sample size increases? What happens to the standard deviation of the sample means o (graph on the right) as the sample size increases? Take a screen shot of the activity when distribution is normal and / = 100 and include it with your post (you can include an image in a *.png format by clicking on Upload Image of the toolbar. 2. Next, choose a non-normal distribution (you can choose skewed right or skewed left) from which to sample. Observe how the graph of the distribution of the sample mean changes as the sample size increases from / = 2, then n = 9, n - 25, , = 36, and finally, n = 100. Does the graph of the sample means (the graph on the right) stays as skewed as the sample size increases? What happens to the mean of the sample means # (graph on the right) as the sample size increases? What happens to the standard deviation of the sample means o- (graph on the right) as the sample size increases? Take a screen shot of the activity when distribution is not normal and / = 100 and include it with your post. Did this activity help you understand Central Limit Theorem better? INSTRUCTIONS: To begin your post, please click the reply button, Once you post your reply, you will see other students posts. Please reply to at least one student in a meaningful way (see Grading Rubric on the top where the 3 dots are)