A tire manufacturer estimates that their tires last, an average of 40,000 miles, with a standard deviation of 5000. What is the probability that a randomly chosen tire from this manufacturer lasts between 30,000 miles and 50,000 miles? (Give your answer as a decimal rounded to 4 decimal places.) check Reference Answer: 2. The daily high temperature on October 31 in a certain city is normally distributed with 50 and 0 8. What is the probability that the high temperature on October 31 in a randomly chosen year will be between 46 degrees and 58 degrees? (Give your answer as a decimal rounded to 4 decimal places.)

Question

contestada

Respuesta :

AlonsoDehner AlonsoDehner · Answer 1 · 2019-11-21T15:59:45+01:00

Answer:

0.9554,0.8188

Step-by-step explanation:

Given that a tire manufacturer estimates that their tires last, an average of 40,000 miles, with a standard deviation of 5000.

X - duration of tires is N(40000,5000)

Or Z = [tex]\frac{x-40000}{5000}[/tex] is N(0,1)

the probability that a randomly chosen tire from this manufacturer lasts between 30,000 miles and 50,000 miles

=[tex]P(30000<x<50000) \\= P(-2<Z<2)\\=0.9554[/tex]

------------------------------------

2) Given that the daily high temperature on October 31 in a certain city is normally distributed with 50 and 8

Y - daily high temp on Oct 31 is N(50,8)

Or Z = [tex]\frac{x-50}{8}[/tex] is N(0,1)

the probability that a randomly chosen tire from this manufacturer lasts between 46 degrees and 58 degrees

=[tex]P(46<x<58) \\= P(-2<Z<1)\\=0.4772+0.3416=0.8188[/tex]