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Chapter 13: Q. 10 (page 547)

Consider a $F -$ curve with $d f = (2, 14)$
Determine $F_{0.05}$ .

Short Answer

Expert verified

$F_{0.05} = 3.739 .$

Step by step solution

01

Given information

The given F-curve has

$d f = (2, 14)$ .

02

Explanation

The MINITAB technique is as follows:

Select Graph $>$ Probability Distribution Plot $>$ View Probability $>$ OK.

2. Select $F$ from the Distribution menu.

3. Put $2$ in the numerator and $14$ in the denominator of $d f$ .

4. Select Probability Value and enter $0.05$ as the value.

5. Click OK.

The MINITAB output is as follows:

It is observed from the output that the value of $F_{0.05}$ is $3.739 .$

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Most popular questions from this chapter

a. Obtain individual normal probability plots and the standard deviations of the samples.

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Consider the following hypothetical samples

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b. Obtain SST, SSTR and SSE by using the defining formulas and verify that the one-way ANOVA identity holds.

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d. Construct the one-way ANOVA table.

Consider the following hypothetical samples:

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