A gardener plants some tomato seeds, and after 30 days measures the heights (in

Question

A gardener plants some tomato seeds, and after 30 days measures the heights (in cm) of a random sample of 100 of the seedlings. The data are recorded in the file tomatoes.txt.

a) (3 marks) Assuming the seedling heights are iid, provide an (approximate) 98% confidence interval for the mean height.

b) (1 mark) Which result allows you to make the required approximation in a)?

c) (2 marks) Provide a formal interpretation of your confidence interval in a).

as I can not upload a file so the tomatoes.txt file looks like this

height

9

9.8

9.5

10.3

10.1

9.4

12

10.6

9.1

11.8

9.8

11.2

9.3

9.1

9.9

8

11.3

9

11.2

9.8

10.1

11.2

9.3

12.2

9.1

9.9

10.7

10.8

10

10.3

9.5

10.5

9.5

8.6

9.6

11

7.4

7.4

9.8

8.6

10.5

10.2

10.1

10.2

8.4

8.6

10.5

8.5

10.1

8.5

11

10.1

8.7

7.9

10.6

9.9

10.3

9.9

8.5

10.5

11.4

9.2

9.4

8.9

11.4

9.4

9.6

11.7

11.4

9.3

8.9

10

10.3

9.5

9.9

10.3

8.1

10.6

12.2

8.8

10.5

10.5

11.1

9

11.3

9.1

9.9

11.1

8.4

10.9

12.3

10.8

10.3

11.2

11

8.5

10.7

10.5

10.8

11.6

Explanation / Answer

a.

Standard error of the mean = SEM = S/N

N=100, sample size.

alpha=0.02

Confidence interval = m +/- (t(, N-1)*SEM)

calulation

Standard error of the mean = SEM = S/N = 0.109

t(, N-1) = 2.365

Confidence interval = m +/- (t(, N-1)*SEM)

Mean = 9.985

Lower bound: 9.73

Upper bound: 10.24

b. Which result allows you to make the required approximation in a)?

here Normal distribution assumption has not been considered.

so, we use Central LImit theorem which is due to lindberg-levy

c.formal interpretation of your confidence interval

ithe chance of being the original mean outside (9.73,10.24) is only 2%

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