in this problem, you will use desmos to compute a few statistics.\n\n• open a new browser window to the…

in this problem, you will use desmos to compute a few statistics.\n\n• open a new browser window to the page: https://www.desmos.com/calculator.\n• enter the command below, by copying and pasting the data between the brackets:\n\na = paste data here \n\n• to compute the mean and median, enter the commands below:\n\nmean(a)\nmedian(a)\n\n• to compute the midrange of the data set, you will need the minimum and maximum values, which are computed in desmos by entering:\n\nmin(a)\nmax(a)\n\nthe heights of 60 randomly selected women are recorded below.\n\n{ 51.4, 52.3, 53.1, 53.5, 56.5, 56.6, 57.3, 58.2, 58.7, 58.8, 59.8, 60, 60.2, 60.2, 60.3, 60.6, 60.8, 60.8, 60.9, 61.6, 61.6, 61.7, 61.8, 61.9, 62.3, 62.4, 63.3, 63.4, 63.9, 64.2, 64.5, 64.5, 64.5, 64.7, 64.9, 65, 65, 65.2, 65.3, 65.6, 65.6, 65.8, 65.9, 66.1, 66.1, 66.3, 66.4, 67.1, 67.5, 67.6, 68.3, 68.4, 68.6, 69.1, 69.5, 69.8, 70, 70.8, 71.4, 72.8 }.\n\ngive the mean of the data set.\n\n63.615\n\npart 2 of 4\n\ngive the median of the data set.\n\n64.05\n\npart 3 of 4\n\ngive the midrange of the data set.\n\n62.1\n\npart 4 of 4\n\ngiven the relationship between the mean and median, what distribution shape likely?\n\nthe distribution will be roughly symmetric.\nthe distribution will probably be skewed to the left.\nthe distribution will probably be skewed to the right.

in this problem, you will use desmos to compute a few statistics.\n\n• open a new browser window to the page: https://www.desmos.com/calculator.\n• enter the command below, by copying and pasting the data between the brackets:\n\na = paste data here \n\n• to compute the mean and median, enter the commands below:\n\nmean(a)\nmedian(a)\n\n• to compute the midrange of the data set, you will need the minimum and maximum values, which are computed in desmos by entering:\n\nmin(a)\nmax(a)\n\nthe heights of 60 randomly selected women are recorded below.\n\n{ 51.4, 52.3, 53.1, 53.5, 56.5, 56.6, 57.3, 58.2, 58.7, 58.8, 59.8, 60, 60.2, 60.2, 60.3, 60.6, 60.8, 60.8, 60.9, 61.6, 61.6, 61.7, 61.8, 61.9, 62.3, 62.4, 63.3, 63.4, 63.9, 64.2, 64.5, 64.5, 64.5, 64.7, 64.9, 65, 65, 65.2, 65.3, 65.6, 65.6, 65.8, 65.9, 66.1, 66.1, 66.3, 66.4, 67.1, 67.5, 67.6, 68.3, 68.4, 68.6, 69.1, 69.5, 69.8, 70, 70.8, 71.4, 72.8 }.\n\ngive the mean of the data set.\n\n63.615\n\npart 2 of 4\n\ngive the median of the data set.\n\n64.05\n\npart 3 of 4\n\ngive the midrange of the data set.\n\n62.1\n\npart 4 of 4\n\ngiven the relationship between the mean and median, what distribution shape likely?\n\nthe distribution will be roughly symmetric.\nthe distribution will probably be skewed to the left.\nthe distribution will probably be skewed to the right.

Answer

Explanation:

Step1: Recall distribution - mean and median relationship

If mean $\approx$ median, distribution is symmetric. If mean < median, distribution is skewed left. If mean > median, distribution is skewed right. Given mean = 63.615 and median = 64.05. Since mean < median.

Step2: Determine distribution shape

The distribution is likely skewed to the left.

Answer:

The distribution will probably be skewed to the left.