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A market research company employs a large number of typists to enter data into a computer database. The time it takes for potential new typists to learn the computer system is known to have a Normal distribution with a mean of 90 minutes and a standard deviation of 18 minutes. A candidate is automatically hired if she learns the computer system in less than 100 minutes. A cut-off time is set at the slowest 10% of the learning distribution. Anyone slower than this cut-off time is definitely not hired. What proportion of candidates takes more than two hours to learn the computer system?

Respuesta :

Edufirst

Answer:

  • 4.75% of the candidates takes more than two hours to learn the computer system.

Explanation:

The relevant information to solve the problem is:

  • 1. The time it takes to learn follows a Normal distribution

  • 2. The mean is 90 minutes

  • 3. The standard deviation is 18 minutes

  • 4. The question is What proportion of candidates takes more than two hours to learn the computer system?

Then, you shall calculate the Z-score and use a standard distribution table to look up the Z-score and the corresponding probability.

Repeating myself from a recent answer, "there are two types of standard distribution tables: tables that show values that represent the AREA to the LEFT of the Z-score, and tables that show values that represent the AREA to the RIGHT of the Z-score".

1. First, calculate the Z-score:

       [tex]Z-score=\frac{x-mean}{standard\text{ }deviation}[/tex]

                          [tex]x=2hours=120min[/tex]

        [tex]Z-score=\frac{120-90}{18}\approx 1.67[/tex]

2. Use the table that represents the area to the right of the mean to find the ratio of typists that have a Z-score greater than 1.67.

          [tex]Probability=0.0475=4.75\%[/tex]

Therefore, 4.75% of the candidates takes more than two hours to learn the computer system.

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