Bass - Samples: The bass in Clear Lake have
weights that are normally distributed with a mean of 2.3 pounds and
a standard deviation of 0.6 pounds.
What percentage of all randomly caught groups of 3 bass should
weigh between 2.1 and 2.5 pounds? Enter your answer as a
percentage rounded to one decimal place.
%
Bass - Samples: The bass in Clear Lake have weights that are normally distributed with a...
Bass - Samples: The bass in Clear Lake have weights that are normally distributed with a mean of 2.3 pounds and a standard deviation of 0.8 pounds. What percentage of all randomly caught groups of 3 bass should weigh between 2.0 and 2.6 pounds? Enter your answer as a percentage rounded to one decimal place. I get so far but I can't determine the Z-score from the z-score table because it only goes up to 2 decimal places.
Bass - Samples: The bass in Clear Lake have weights that are normally distributed with a mean of 2.2 pounds and a standard deviation of 0.8 pounds. Suppose you catch a stringer of 6 bass with a total weight of 16.5 pounds. Here we determine how unusual this is. (a) What is the mean fish weight of your catch of 6? Round your answer to 1 decimal place. (b) If 6 bass are randomly selected from Clear Lake, find the...
Bass - Samples: The bass in Clear Lake have weights that are normally distributed with a mean of 2.1 pounds and a standard deviation of 0.9 pounds. If you catch 3 random bass from Clear Lake, find the probability that the mean weight it is more than 3 pounds. Round your answer to 4 decimal places.
The bass in Clear Lake have weights that are normally distributed with a mean of 2 pounds and a standard deviation of 0.6 pounds. (a) If you catch one random bass from Clear Lake, find the probability that it weighs less than 1 pound? Round your answer to 4 decimal places. (b) If you catch one random bass from Clear Lake, find the probability that it weighs more than 3 pounds? Round your answer to 4 decimal places. (c)...
9. 12 points StevensStat4 6.P010ab. Bass Samples: The bass in Clear Lake have weights that are normally distributed with a mean of 2.1 pounds and a standard deviation of 0.9 pounds. (a) If you catch 3 random bass from Clear Lake, find the probability that the mean weight is less than 1.0 pound. Round your answer to 4 decimal places. (b) If you catch 3 random bass from Clear Lake, find the probability that the mean weight it is more...
The weights of the fish in a certain lake are normally distributed with a mean of 17 and a standard deviation of 12.7 16 fich are randomly selected, what is the probability that the mean it will be between 146 and 20.6 lb? Round your answer to four decimal places OA 0.3270 B. 0.0968 OC. 0.4032 D 0.6730
The weights for a group of 18-month-old girls are normally distributed with a mean of 24.9 pounds and a standard deviation of 2.8 pounds. Use the given table to find the percentage of 18-month-old girls who weigh between 16.6 and 23.8 pounds. Z-score -3.0 -2.9 -2.8 -2.7 -2.6 -2.5 -2.4 -2.3 -2.2 -2.1 Percentile 0.13 0.19 0.26 0.35 0.47 0.62 0.82 1.07 1.39 1.79 IZ-score -2.0 -1.9 -1.8 -1.7 -1.6 -1.4 -1.3 -1.2 -1.1 Percentile 2.28 2.87 3.59 4.46 5.48...
5. The weights of items produced by a company are normally distributed with a mean of 9.00 ounces and a standard deviation of 0.6 ounces. a. What is the probability that a randomly selected item from the production will weigh at least 8.28 ounces? b. What percentage of the items weigh between 9.6 and 10.08 ounces? c. Determine the minimum weight of the heaviest 5% of all items produced. d. If 27,875 of the items of the entire production weigh...
1) The weights of the fish in a certain lake are normally distributed with a mean of 20 lb and a 1). standard deviation of 9. If 9 fish are randomly selected, draw, label and shade the normal curve, find the z-scores, and find the probability that the mean weight will be between 17.6 and 23.6 lb. Draw, label, and shade: Z-scores: P(17.6<x< 23.6)
birth weights of full-term babies in a certain region are normally distributed with mean 7.125 pounds and standard deviation 1.290 pounds,find the probability that a randomly selected new born will weigh less than 5.5 pounds