help solve The average fill volume for a soda company's cans is supposed to be 16...
Soda six-packs Most soda cans list the volume of soda as 12 fluid ounces. As with all process, some variation occurs when filling soda cans. Suppose that a company knows this and tries to over-fill cans a bit, so that the actual volume of soda in a can follows a normal distribution with mean 12.1 fluid ounces and standard deviation .15 fluid ounces. a) What proportion of soda cans filled by this process will contain less than 12 fluid ounces?...
Two machines are used for filling plastic bottles with a net volume of 16.0 ounces. The fill volume can be assumed normal, with standard deviation o1 = 0.020 and 02 = 0.025 ounces. A member of the quality engineering staff suspects that both machines fill to the same mean net volume, whether or not this volume is 16.0 ounces. A random sample of 10 bottles is taken from the output of each machine Machine 1 16.03 16.01 16.04 15.96 16.05...
Workers at a certain soda drink factory collected data on the volumes (in ounces) of simple random sample of 15 cans of the soda drink Those volumes have mean of 12.19 oz and a standard deviation of 0.14 oz and they appear be from a normally distributed population. If the workers Want the filling process to work so that almost all cans have volume between 11.88 and 12.52, and the standard deviation should be less than 0.16 oz. use the...
Question Help Workers at a certain soda drink factory collected data on the volumes (in ounces) of a simple random sample of 21 cans of the soda drink. Those volumes have a mean of 12.19 oz and a standard deviation of 0.09 oz, and they appear to be from a normally distributed population. If the workers want the filling process to work so that almost all cans have volumes between 11.95 oz and 12.59 oz, the range rule of thumb...
Workers at a certain soda drink factory collected data on the volumes (in ounces) of simple random sample of 15 cans of the soda drink Those volumes have mean of 12.19 oz and a standard deviation of 0.14 oz and they appear be from a normally distributed population. If the workers Want the filling process to work so that almost all cans have volume between 11.88 and 12.52, and the standard deviation should be less than 0.16 oz. use the...
B- Compute the Test statistic x2= C- Find the P-Value Workers at a certain soda drink factory collected data on the volumes (in ounces) of a simple random sample of 15 cans of the soda drink. Those volumes have a mean of 12.19 oz and a standard deviation of 0.11 oz, and they appear to be from a normally distributed population. If the workers want the filling process to work so that almost all cans have volumes between 12.01 oz...
A jar of peanuts is supposed to have 16 ounces of peanuts. The filling machine inevitably experiences fluctuations in filling, so a quality control manager randomly samples 12 jars of peanuts from the storage facility and measures their contents. She obtains the accompanying data. Complete parts (a) through (d) below. Click here to view the peanut jar data. Click here to view the table of critical values of the chi-square distribution Click here to view the standard normal distribution table...
Workers at a certain soda drink factory collected data on the volumes (in ounces) of a simple random sample of 22 cans of the soda drink. Those volumes have a mean 12.19 oz and a standard deviation of 0.12 oz, and they appear to be from a normally distributed population. If the workers want the filling process to work so that almost cans have volumes between 11.89 oz and 12.57 oz, the range rule of thumb can be used to...
Workers at a certain soda drink factory collected data on the volumes (in ounces) of a simple random sample of 16 cans of the soda drink. Those volumes have a mean of 12.19 oz and a standard deviation of 0.08 oz, and they appear to be from a normally distributed population. If the workers want the filling process to work so that almost all cans have volumes between 11.92 oz and 12.48 oz, the range rule of thumb can be...
Workers at a certain soda drink factory collected data on the volumes (in ounces) of a simple random sample of 17 cans of the soda drink. Those volumes have a mean of 12.19 oz and a standard deviation of 0.09 oz, and they appear to be from a normally distributed population. If the workers want the filling process to work so that almost all cans have volumes between 11.97 oz and 12.53 oz, the range rule of thumb can be...