Answer: 0.1357
Step-by-step explanation:
Given : Monitors manufactured by TSI Electronics have life spans that have a normal distribution with a variance of [tex]\sigma^2=2,250,000[/tex] and a mean life span of [tex]\mu=13,000[/tex] hours.
Here , [tex]\sigma=\sqrt{2250000}=1500[/tex]
Let x represents the life span of a monitor.
Then , the probability that the life span of the monitor will be more than 14,650 hours will be :-
[tex]P(x>14650)=P(\dfrac{x-\mu}{\sigma}>\dfrac{14650-13000}{1500})\\\\=P(z>1.1)=1-P(z\leq1.1)\ \ [\because\ P(Z>z)=1-P(Z\leq z)]\\\\=1-0.8643339=0.1356661\approx0.1357[/tex]
Hence, the probability that the life span of the monitor will be more than 14,650 hours = 0.1357
