Assume that cans of cola are filled such that the actual amounts have a population mean of muequals20.00 ounces. A random sample of 36 cans has a mean amount of 20.33 ounces. The distribution of sample means of size nequals36 is normal with an assumed mean of 20.00 ounces, and those sample means have a standard deviation of 0.04 ounce. Complete parts (a) through (c) below. what is the standard deviation is the sample mean away from the mean of the distribution of sample means rounded to two decimal places?
Given,
Standard deviation of sampling distribution of sample mean = 0.04
We have to calculate standard deviation = ?
= / sqrt(n)
0.04 = / sqrt(36
= 0.24
Assume that cans of cola are filled such that the actual amounts have a population mean...
Assume that cans are filled so that the actual amounts have a mean of 16.00 ounces. A random sample of 36 cans has a mean amount of 16.71 ounces. The distribution of sample means of size 36 is normal with an assumed mean of 16.00 ounces and a standard deviation of 0.08 ounce. How many standard deviations is the sample mean from the mean of the distribution of sample means?
please anwser the following question below there are 3 separatw part to rhis one question Assume that cans o cola are filed such that the actual amounts have a population mean of μ 12.00 ounces. A random sample of 36 cans has a mean amour t of 12.27 ounces. The distribution of sample means of size n-36 is normal with an assumed mean of 12.00 ounces, and those sample means have a standard deviation of 0.04 ounce. Complete parts (a)...
Assume that cans of a X-brand of soda are filled so that the actual amount have a mean of 12.00 oz and a standard deviation of 0.11 oz. Find the probability that a sample of 36 cans will have a mean amount of at least 12.19 oz. 0.9999 0.9974 0.0001 0.7967
A Coca-Cola bottling plant's product line includes 12-ounce cans of Coke products. The cans are filled by an automated filling process that can be adjusted to any mean filll volume and that will ll cans according to a normal distribution. However, not all cans will contain the same volume due to variation in the filling process. Historical records show that regardless of what the mean is set at, the standard deviation in ll will be 0.035 ounce. Operations managers at...
the amount of liquid in cans of a cola beverage has mean value 16 ounces and standard deviation of 0.143 ounces (a) what is the probability that a randomly selected can of that cola beverage contains at least 15.9 ounces? (b) what is the probability that the mean amount x of beverage in a random sample of 34 such cans is at least 16.1 ounces
A population has a mean muequals81 and a standard deviation sigmaequals18. Find the mean and standard deviation of a sampling distribution of sample means with sample size nequals36. mu Subscript x overbarequals nothing (Simplify your answer.)
Assume that the cans of Coke are filled so that the actual amounts are normally distributed with a mean of 12.00 oz and a standard deviation of 0.11oz. (a) Find the probability that a single can has at least 12.19 g3 (b) Find the probability that a single can has at most 13.00 gz (c) Find the probability that a sample of 26 cans have a mean of at least 12.19 oz (d) If it is required that 60% of...
The Quality Assurance Department for Cola, Inc. maintains records regarding the amount of cola in its Jumbo bottle. The actual amount of cola in each bottle is critical but varies a small amount from one bottle to the next. Cola, Inc. does not wish to yoderfill the bottles, because it will have a problem with truth in labeling. On the other hand, it cannot overfill each bottle, because it would be giving cola away, hence reducing its profits. Its records...
The manufacturer of cans of salmon that are supposed to have a net weight of 6 ounces tells you that the net weight is actually a normal random variable with a mean of 6.1 ounces and a standard deviation of 0.22 ounce. Suppose that you draw a random sample of 26 cans. Find the probability that the mean weight of the sample is less than 6.09 ounces. Probability =
(1 point) The manufacturer of cans of salmon that are supposed to have a net weight of 6 ounces tells you that the net weight is actually a normal random variable with a mean of 6.19 ounces and a standard deviation of 0.23 ounce. Suppose that you draw a random sample of 37 cans. Find the probability that the mean weight of the sample is less than 6.14 ounces. Probability =