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5 September, 12:11

Suppose ages of people who own their homes are normally distributed with a mean of 42 years and a standard deviation of 3.2 years. Approximately 75% of the home owners are older than what age?

38.2

39.9

44.2

48.6

The scores for a bowling tournament are normally distributed with a mean of 240 and a standard deviation of 100. Julian scored 240 at the tournament. What percent of bowlers scored less than Julian?

10%

25%

50%

75%

The odometer readings on a random sample of identical model sports cars are normally distributed with a mean of 120,000 miles and a standard deviation of 30,000 miles. Consider a group of 6000 sports cars. Approximately how many sports cars will have less than 150,000 miles on the odometer?

300

951

5048

5700

+4
Answers (1)
  1. 5 September, 14:01
    0
    Let the required number of home owners be x, then P (z > (x - 42) / 3.2) = 0.75

    1 - P (z < (x - 42) / 3.2) = 0.75

    P (z < (x - 42) / 3.2) = 0.25

    P (z < (x - 42) / 3.2) = P (z < - 0.6745)

    (x - 42) / 3.2 = - 0.6745

    x - 42 = - 2.1584

    x = - 2.1584 + 42 = 39.84 ≈ 39.9

    P (z < (240 - 240) / 100) = P (z < 0) = 0.5

    Required percentage = 50%

    P (z < (150,000 - 120,000) / 30,000) = P (z < 1) = 0.84134

    Required number of cars = 0.84134 x 6,000 = 5,048
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