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The tread life of a particular tire design is normally distributed with a mean of 62,000 miles and a standard deviation of 5,000 miles.a. What is the probability that the tread life of a random tire of this design will be at least 70,000 miles?

The tread life of a particular tire design is normally distributed with a mean of-example-1
User Leonardo Marques
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1 Answer

15 votes
15 votes

Given that:

- The tread life of a particular tire design is normally distributed.

- The Mean (in miles) is:


\mu=62000

- The Standard Deviation (in miles) is:


\sigma=5000

a. You need to find:


P(X\ge70000)

You need to find the corresponding z-score using this formula:


z=(X-\mu)/(\sigma)

In this case:


X=70000

Therefore, by substituting values and evaluating, you get:


z=(70000-62000)/(5000)=1.6

Then, you need to find:


P(z\ge1.6)

Using the Standard Normal Distribution Table, you get that:


P(z\ge1.6)\approx0.0548

Therefore:


P(X\ge70000)\approx0.0548

b. You need to find:


P(X\leq57000)

Find the z-score using:


X=57000

You get:


z=(57000-62000)/(5000)=-1

Then, you need to find the following using the Standard Normal Distribution Table:


P(X\leq-1)

You get:


P(X\leq-1)\approx0.1587

Therefore:


P(X\leq57000)\approx0.1587

c. You need to find:


P(57500Find the corresponding z-score for:[tex]X=57500

This is:


z=(57500-62000)/(5000)=-0.9

And find the z-score using:


X=65000

You get:


z=(65000-62000)/(5000)=0.6

You need to find:


P(-0.9Using the Standard Normal Distribution Table, you get that:[tex]P(z<0.6)\approx0.7257

And:


P(z<-0.9)\approx0.1841

Therefore:


P(-0.9Then:[tex]P(57500Hence, <strong>the answers are:</strong><p><strong>a.</strong></p>[tex]Probability\approx0.0548

b.


Probability\approx0.1587

c.


Probability\approx0.5416

User Asim Jalis
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