The National Institute of Standards and Technology (NIST) supplies a “standard i

ID: 3385800 • Letter: T

Question

The National Institute of Standards and Technology (NIST) supplies a “standard iron rod” whose electrical conductivity is supposed to be exactly 10.1. Is there reason to think that the true conductivity is not 10.1? To find out, NIST measures the conductivity of one rod 6 times. Repeated measurements of the same thing vary, which is why NIST makes 6 measurements. These measurements are an SRS from the population of all possible measurements. This population has a Normal distribution with mean equal to the true (given the population standard deviation is 0.1).

Step 1:
One set of measurements has mean conductivity x = 10.09. Find the value of the test statistic z and then use Table A to compute the p-value. (Hint: look at the alternative hypothesis. Is the p-value a left sided, right sided, or two sided area?)

What is the P-value?
Give your answer to 2 decimal places.
Fill in the blank:

Step 2:
Is this outcome statistically significant at the = 0.05 level? At the = 0.01 level?

Enter the number of the term that corresponds to each choice:

At the 0.05 level

At the 0.01 level

Step 3:
Another set of measurements has x = 9.95.
Find the P-value for this outcome.
Give your answer to 4 decimal places.
Fill in the blank:

Step 4:
Is it statistically significant at the = 0.05 level? At the = 0.01 level?

Enter the number of the term that corresponds to each choice:

At the 0.05 level

At the 0.01 level

1. Significant 2. Not significant

Explanation / Answer

The test is two sided

Data

Null Hypothesis m=

10.1

Level of Significance

0.05

Population Standard Deviation

0.1

Sample Size

Sample Mean

10.09

Intermediate Calculations

Standard Error of the Mean

0.0408

Z Test Statistic

-0.2449

Two-Tail Test

Lower Critical Value

-1.9600

Upper Critical Value

1.9600

p-Value

0.8065

Do not reject the null hypothesis

What is the P-value?
Give your answer to 2 decimal places.
Fill in the blank: P=0.81

Step 2:
Is this outcome statistically significant at the = 0.05 level? At the = 0.01 level?

1. Significant

2. Not significant

Enter the number of the term that corresponds to each choice:

At the 0.05 level 2. Not significant

At the 0.01 level 2. Not significant

Step 3:
Another set of measurements has x = 9.95.

Z Test of Hypothesis for the Mean

Data

Null Hypothesis m=

10.1

Level of Significance

0.05

Population Standard Deviation

0.1

Sample Size

Sample Mean

9.95

Intermediate Calculations

Standard Error of the Mean

0.0408

Z Test Statistic

-3.6742

Two-Tail Test

Lower Critical Value

-1.9600

Upper Critical Value

1.9600

p-Value

0.0002

Reject the null hypothesis

Find the P-value for this outcome.
Give your answer to 4 decimal places.
Fill in the blank: P=0.002

Step 4:
Is it statistically significant at the = 0.05 level? At the = 0.01 level?

1. Significant

2. Not significant

Enter the number of the term that corresponds to each choice:

At the 0.05 level 1. Significant

At the 0.01 level 1. Significant

Data

Null Hypothesis m=

10.1

Level of Significance

0.05

Population Standard Deviation

0.1

Sample Size

Sample Mean

10.09

Intermediate Calculations

Standard Error of the Mean

0.0408

Z Test Statistic

-0.2449

Two-Tail Test

Lower Critical Value

-1.9600

Upper Critical Value

1.9600

p-Value

0.8065

Do not reject the null hypothesis

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The National Institute of Standards and Technology (NIST) supplies a \"standard

The National Institute of Standards and Technology (NIST) supplies a “standard i

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The National Institute of Standards and Technology (NIST) supplies a “standard i

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