Answer-
In 25.15% cases their response times is over 30 minutes.
Solution-
Hint- Calculating the z-score (how much standard deviations away from the mean) and then getting the corresponding probability value from normal distribution table we can get solution.
Applying the formula for Z-score,
[tex]Z=\frac{X-\mu}{\sigma}[/tex]
Here,
X = score = 30,
μ = mean = 22,
σ = standard deviation = 11.9
Putting the values,
[tex]\Rightarrow Z=\frac{30-22}{11.9}=0.67[/tex]
[tex]\therefore P(x>30)=1-P(Z\leq 0.67)=1-0.7485=0.2515=25.15\%[/tex]
(Subtracted from 1 as the values of area to the left of the Z score is given in table, but we need the area right to Z score as response times more than 30 minutes is asked)
