The mean snowfall in January for Evansville, Indiana is 4.0 inches. Find the probability that the...

The total snowfall per year in Laytonville is normally distributed with mean 99 inches and standard...

The total snowfall per year in Laytonville is normally distributed with mean 99 inches and standard deviation 14 inches. Based on the Empirical Rule, what is the probability that in a randomly selected year, the snowfall was less than 127 inches? Enter your answer as a percent rounded to 2 decimal places

The amount of snowfall falling in a certain mountain range is normally distributed with a mean...

The amount of snowfall falling in a certain mountain range is normally distributed with a mean of 70 inches and a standard deviation of 10 inches. What is the probability that the mean annual snowfall during 25 randomly picked years will exceed 72.8 inches? Write your answer as a decimal rounded to 4 places.

Question 19 The total snowfall per year in Laytonville is normally distributed with mean 99 inches...

Question 19 The total snowfall per year in Laytonville is normally distributed with mean 99 inches and standard deviation 14 inches. Based on the Empirical Rule, what is the probability that in a randomly selected year, the snowfall was less than 127 inches? Enter your answer as a percent rounded to 2 decimal places if necessary. Provide your answer below: ( )%

Christopher has collected data to find that the total snowfall per year in Laytonville has a...

Christopher has collected data to find that the total snowfall per year in Laytonville has a normal distribution. What is the probability that in a randomly selected year, the snowfall was greater than 53 inches if the mean is 92 inches and the standard deviation is 13 inches? Use the empirical rule Provide the final answer as a percent rounded to two decimal places. __%

The amount of annual snowfall in a certain mountain range is normally distributed with a mean...

The amount of annual snowfall in a certain mountain range is normally distributed with a mean of 73 inches and a standard deviation of 9 inches. What is the probability that the annual snowfall for 1 randomly picked year will be below 75.4 inches? Round your answer to 3 decimal places.

The amount of annual snowfall in a certain mountain range is normally distributed with a mean...

The amount of annual snowfall in a certain mountain range is normally distributed with a mean of 70 inches and a standard deviation of 10 inches. If X` represents the average amount of snowfall in 5 years, find k such that P(X`<k)=0.85. Round your answer to 3 decimal places. Group of answer choices 80.364 65.365 46.825 74.635 93.175

Snowfall for a location is found to be normally distributed with mean 96" and standard deviation...

Snowfall for a location is found to be normally distributed with mean 96" and standard deviation of 32". 1. What is the probability that a given year will have more than 120" of snow? 2. What is the probability that the snowfall will be between 90" and 100"? 3. What level of snowfall will be exceeded only 10% at a time?

The amount of snow falling in a certain mountain range is normally distributed with a mean...

The amount of snow falling in a certain mountain range is normally distributed with a mean of 110 inches, and standard deviation of 16 inches. What is the probability that the mean annual snowfall during 64 randomly pick years will exceed 112.8 inches? Round your answer to four decimal places a.) 0.0026 b.) 0.4192 c.) 0.0808 d.) 0.5808

Assume that the heights of women are normally distributed with a mean of 63.6 inches and...

Assume that the heights of women are normally distributed with a mean of 63.6 inches and a standard deviation of 2.5 inches. a) Find the probability that if an individual woman is randomly selected, her height will be greater than 64 inches. b) Find the probability that 16 randomly selected women will have a mean height greater than 64 inches.

The height of women in the United States has a mean of 65 inches and a...

The height of women in the United States has a mean of 65 inches and a standard deviation of 3.5 inches. Find the probability that a woman chosen at random will be within 3 inches of the mean.