A set of tires is designed to last 6 years, with a standard deviation of 2 years. What is the probability that a tire will last less than 4 years? 1% 10% 16% 26%

Question

asked Mar 14, 2020 190k views

2 Answers

Twiz · Answer 1 · 2020-03-16T05:57:54+0000

Answer:

16%.

Explanation:

We may assume that the times are normally distributed.

We first find the z-score which is the (value - mean) / standard deviation.

z-score = (4 - 6)/2 = -1.

Looking up the value for -1 on a z-score normal distribution table we find that -1 gives us 0.1587 - that is 16%.

Graziella · Answer 2 · 2020-03-18T16:21:25+0000

Answer: 16%

Explanation:

Let the mean of the population of tires denoted by
$\mu$ and standard deviation as
$\sigma$ .

Given : A set of tires is designed to last 6 years, with a standard deviation of 2 years.

i.e.
$\mu=6$ and
$\sigma=2$

Let x be the random variable that represents the life of tires.

Z-score :
$(x-\mu)/(\sigma)$

For x = 4 , we have

Now by using standard normal distribution table we have,

The probability that a tire will last less than 4 years will be :-

$P(x<4)=P(z<-1)= 0.1586553\approx0.16=16\%$

Hence, the probability that a tire will last less than 4 years = 16%