Assume that the traffic to the web site of Smiley’s People, Inc., which sells customized T-shirts, follows a normal distribution, with a mean of 4.56 million visitors per day and a standard deviation of 700,000 visitors per day. (a) What is the probability that the web site has fewer than 5 million visitors in a single day? If needed, round your answer to four decimal digits. (b) What is the probability that the web site has 3 million or more visitors in a single day? If needed, round your answer to four decimal digits. (c) What is the probability that the web site has between 3 million and 4 million visitors in a single day? If needed, round your answer to four decimal digits. (d) Assume that 85% of the time, the Smiley’s People web servers can handle the daily web traffic volume without purchasing additional server capacity. What is the amount of web traffic that will require Smiley’s People to purchase additional server capacity? If needed, round your answer to two decimal digits. million visitors per day
| for normal distribution z score =(X-μ)/σx | |
| here mean= μ= | 4.56 |
| std deviation =σ= | 0.700 |
a)
| probability =P(X<5)=(Z<(5-4.56)/0.7)=P(Z<0.63)=0.7357 |
(please try 0.7352 if this comes wrong and reply)
b)
| probability =P(X>3)=P(Z>(3-4.56)/0.7)=P(Z>-2.23)=1-P(Z<-2.23)=1-0.0129=0.9871 |
c)
| probability =P(3<X<4)=P((3-4.56)/0.7)<Z<(4-4.56)/0.7)=P(-2.23<Z<-0.8)=0.2119-0.0129=0.1990 |
(please try 0.1989 if this comes wrong and reply)
b)
d)
| for 85th percentile critical value of z= | 1.040 | ||
| therefore corresponding value=mean+z*std deviation= | 5.29 million | ||
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