Answer to Question #279615 in Statistics and Probability for Mark Jason

Question #279615

Assuming the mean and SD are the same for this year’s national exam, what percentage of test-takers scored above and below you if your score is 1900 and given that X ~ N(1600, 140). Using the empirical rule, find the percentage of students who scored between 1880 and 1920?

Expert's answer

Given that "X\\sim N(1600, 140)."

Then

"\\mu=1600, \\sigma^2=140, \\sigma=\\sqrt{140}"

"P(X<1900)=P(Z<\\dfrac{1900-\\mu}{\\sigma})"

"=P(Z<\\dfrac{1900-1600}{\\sqrt{140}})\\approx P(Z<25.3546)"

"\\approx1(100\\%)"

The empirical rule formula:

68% of data falls within 1 standard deviation from the mean - that means between "\u03bc - \u03c3" and "\u03bc + \u03c3."

95% of data falls within 2 standard deviations from the mean - between "\u03bc \u2013 2\u03c3" and "\u03bc + 2\u03c3."

99.7% of data falls within 3 standard deviations from the mean - between "\u03bc - 3\u03c3" and "\u03bc + 3\u03c3."

Given

"\\mu=1600, \\sigma=\\sqrt{140}\\approx11.83"

Then

"(\\mu-\\sigma, \\mu+\\sigma)\\approx(1588.2, 1611.8)"

"(\\mu-2\\sigma, \\mu+2\\sigma)\\approx(1576.3, 1623.7)"

"(\\mu-3\\sigma, \\mu+3\\sigma)\\approx(1564.5, 1635.5)"

We cannot use the empirical rule to find the percentage of students who scored between 1880 and 1920.

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Answer to Question #279615 in Statistics and Probability for Mark Jason

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