Answer to Question #191096 in Civil and Environmental Engineering for Joshua

We need to calculate the value of "y" when the "P(Y\\geq y)=0.05." This is computed as follows

"P(Y\\geq y)=0.05, \\\\ 1-P(Y\\leq y) =0.05,\\\\ P(Y\\leq y)=0.95 ,\\\\P\\left(\\frac{Y-\\mu}{\\sigma}\\leq \\frac{y-\\mu}{\\sigma}\\right)=0.95, \\\\ P\\left(Z\\leq\\frac{y-\\mu}{\\sigma}\\right)=0.95,\\\\P(Z\\leq 1.645)=0.95."

From the above, we know that

"\\frac{y-\\mu}{\\sigma}=1.645".

Solving for "y" we have

"y=(1.645)(\\sigma)+\\mu".

Substituting the values of "\\mu" and

"\\sigma" we have the value of "y" to be

"y=(1.645)(0.08)+99.61 \\Longrightarrow y=99.7416."

Thus, the purity value that exceeds exactly 5% of the population is "99.7416\\%."