Back to Exercise: Fit data to a normal distribution

Exercises: Fitting Data to a Normal Distribution

Work through each section in order. For empirical-rule problems, use the 68-95-99.7 percentages and the curve's symmetry. For z-score problems, first standardize with $z = \frac{x - \text{mean}}{\text{SD}}$, then look up the area with a calculator, spreadsheet, or table. Round percentages as directed. Remember: the empirical rule and z-scores apply ONLY to roughly normal data.

Grade 10·21 problems·~35 min·Common Core Math - HS Statistics and Probability·group·hss-id-a-4
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A

Warm-Up: The Normal Curve

These problems review the shape and vocabulary of the normal model.

A symmetric bell curve with a single peak at the center labeled mean = median, dashed inflection lines at plus and minus one standard deviation, and tails approaching the axis.
1.

The diagram shows a normal (bell) curve. Which statement correctly describes its features?

2.

A student says, "All real-world data is normal, because real data is normal/ordinary." Which response is correct?

3.

Adult female heights are approximately normal with mean 6464 inches and standard deviation 2.52.5 inches. The interval "within one standard deviation of the mean" runs from 61.561.5 inches up to what upper height, in inches?

B

Fluency Practice

Use the empirical rule and z-scores. Test scores below are normal with mean 500, SD 100.

A normal curve over a test-score axis marked at 200, 300, 400, 500, 600, 700, 800, with nested bands labeled 68 percent, 95 percent, and 99.7 percent centered on the mean of 500.
1.

Test scores are normally distributed with mean 500500 and standard deviation 100100. The diagram shows the empirical-rule bands. About what percentage of scores fall between 400400 and 600600 (within one standard deviation of the mean)? Enter a number (percent).

2.

Test scores are normal with mean 500500, SD 100100. Using the empirical rule, about what percentage of scores are ABOVE 600600? Use the symmetry of the curve. Enter a number (percent).

3.

Test scores are normal with mean 500500, SD 100100. About what percentage of scores fall between 300300 and 700700 (within two standard deviations)? Enter a number (percent).

4.

Test scores are normal with mean 500500, SD 100100. Compute the z-score for a score of x=420x = 420. Enter the z-score (it may be negative).

5.

Test scores are normal with mean 500500, SD 100100. For a score of x=650x = 650, the z-score is z=1.5z = 1.5. Using a calculator, spreadsheet, or table, the area BELOW z=1.5z = 1.5 is about 0.93320.9332. About what percentage of scores are ABOVE 650650? Round to the nearest tenth of a percent.

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