Respuesta :
Answer:
a) The probability that the life of the component is less than or equal to 6000 hours is 58%
b) The probability that the life is greater than 4000 hours is 96%
Step-by-step explanation:
Let's define the variable time as [tex]t[/tex], which is measured in hours. Then, according to the problem:
- The probability that the component survives for more than 6000 hours is 0.42 [tex]\rightarrow P(t> 6000) = 0.42[/tex]
- The probability that the component survives no longer than 4000 hours is 0.04 [tex]\rightarrow P(t\leq 4000) =0.04[/tex]
a) The probability that the life of the component is less than or equal to 6000 needs to be equal to [tex]1-P(t>6000)[/tex].
To see this, think of a full set, whose elements can be separate in two categories, the ones that survive more than 6000 hours (let's call them A and number of elements of this type Na) and the ones that survive less than or equal to 6000 (let's call them B and number of elements of this type Nb). Thus, the total number of elements can be calculate as [tex]Na+Nb[/tex], which represents the unit.
If you want to calculate the proportion of elements of type A, you need to divide the number of element of type A over the total number of elements, which is [tex]P(A) = Na/(Na+Nb)[/tex]. And the same analysis applies to the proportion of elements of type B: [tex]P(B) = Nb/(Na+Nb)[/tex]. Hence, it is easy to see:
[tex]P(A)+P(B) = \frac{Na}{Na+Nb} + \frac{Nb}{Na+Nb} = 1[/tex]
of course this only applies when the elements can be only categorized as one type or the other, which is call in probability, mutually exclusive events.
Using this for:
a) [tex]P(t\leq 6000 )=1-P(t>6000) = 1 - 0.42 =0.58\\P(t\leq 6000 )=58\%[/tex]
b) [tex]P(t> 4000 )=1-P(t\leq 4000) = 1 - 0.04 =0.96\\P(t> 4000 )=96\%[/tex]
Using probability of complementary events, we have that:
a) 0.58 = 58% probability that the life of the component is less than or equal to 6000 hours.
b) 0.96 = 96% probability that the life is greater than 4000 hours.
If two events are complementary, the sum of their probabilities is 1.
Item a:
0.42 = 42% probability that the component survives for more than 6000 hours.
Thus, 1 - 0.42 = 0.58 = 58% probability that the life of the component is less than or equal to 6000 hours.
Item b:
0.04 = 4% probability that the component survives no longer than 4000 hours is 0.04.
Thus, 1 - 0.04 = 0.96 = 96% probability that the life is greater than 4000 hours.
A similar problem is given at https://brainly.com/question/24483829
