Chapter 6: Q.6.35 (page 261)

Female College Students. Refer to Example 6.3 on page 256 .
a. Use the relative-frequency distribution in Table 6.1 to obtain the percentage of female students who are between $60 a n d 65$ inches tall.
b. Use your answer from part (a) to estimate the area under the normal curve having parameters $μ = 64.4 a n d σ = 2.4$ that lies between $60 a n d 65$ . Why do you get only an estimate of the true area?

Expert verified

(a) The percentage of female students who are between $60 a n d 65$ inches is $55.70 %$

(b) The area under the associated normal curve between $60 a n d 65$ is $0.5570$

Step by step solution

The given table is:

we have to find the percentage of female students who are between $60 a n d 65$ inches tall.

Consider the classes

60-61

61-62

62-63

63-64

64-65

The percentage of kids who are between $60$ and $65$ inches tall can be calculated by multiplying the relative frequencies as follows:

$0.0450 + 0.0757 + 0.1170 + 0.1480 + 0.1713 = 0.5570$

As a result, the percentage of students between the ages of $60$ and $65$ is role="math" localid="1650964055783" $55.70$ percent.

We have To estimate The area under the normal curve having parameters $μ = 64.4 a n d σ = 2.4$ .

The students' heights are roughly evenly divided in this group. So, between $60 a n d 65$ , the area under the related normal curve is $0.5570$ .

We can only acquire an estimate of the true area because the students heights are somewhat regularly distributed.

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