Answer :
Answer: 99.61%
Step-by-step explanation:
As per given , we have
[tex]\mu=1.978\\\\ \sigma=0.172[/tex]
Let x be the random variable that represents the value of resistance .
Since, the resistance is normally distributed.
Then, the z-score corresponding to x on normal curve will be :-
[tex]z=\dfrac{x-\mu}{\sigma}[/tex]
For x = 1.500
[tex]z=\dfrac{1.500-1.978}{0.172}=-2.78[/tex]
For x = 2.500
[tex]z=\dfrac{2.500-1.978}{0.172}=3.03[/tex]
The probability of the ceramic substrates will not meet the manufacture’s specifications :
P(1.500<x<2500)=P(-2.78<z<3.03)=P(z<3.03)-P(z<-2.78)
=P(z<3.03)-(1-P(z<2.78))
= 0.9987772-(1-0.9972821) [Using z-table]
=0.9960593 =99.60593 % ≈ 99.61%
Hence, the percentage of the ceramic substrates will not meet the manufacture’s specifications = 99.61%