The mean height of women in the United States (ages 20-29) is 64.2 inches with a...

In a survey of women in a certain country​ (ages 20−​29) the mean height was 64.2...

In a survey of women in a certain country​ (ages 20−​29) the mean height was 64.2 inches with a standard deviation of 2.93 inches. Answer the following questions about the specified normal distribution. ​(a) What height represents the 95th ​percentile? ​(b) What height represents the first​ quartile?

The mean height of women in a country (ages 20-29) is 64.2 inches. A random sample...

The mean height of women in a country (ages 20-29) is 64.2 inches. A random sample of 55 women in this age group is selected. What is the probability that the mean height for the sample is greater than 65 inches? assume σ = 2.54

The mean height of women in a country​ (ages 20-​29) is 64.2 inches. A random sample...

The mean height of women in a country​ (ages 20-​29) is 64.2 inches. A random sample of 65 women in this age group is selected. What is the probability that the mean height for the sample is greater than 65 ​inches? Assume sigma =2.88. The probability that the mean height for the sample is greater than 65 inches is _____. (round to 4 decimal places as needed).

In a certain​ city, the average​ 20- to​ 29-year old man is 69.4 inches​ tall, with...

In a certain​ city, the average​ 20- to​ 29-year old man is 69.4 inches​ tall, with a standard deviation of 3.1 ​inches, while the average​ 20- to​ 29-year old woman is 64.5 inches​ tall, with a standard deviation of 3.9 inches. Who is relatively​ taller, a​ 75-inch man or a​ 70-inch woman? A. The​ z-score for the man​, nothing​, is smaller than the​ z-score for the woman​, nothing​, so he is relatively taller B. The​ z-score for the woman​, nothing​,...

Among American women aged 20 to 29 years, mean height = 64.2 inches, with a standard...

Among American women aged 20 to 29 years, mean height = 64.2 inches, with a standard deviation of 2.7 inches. A)Use Chebyshev’s Inequality to construct an interval guaranteed to contain at least 75% of all such women`s heights. Include appropriate units. B)Suppose that a random sample size of n = 50 is selected from this population of women. What is the probability that the sample mean height will be less than 63.2 inches?

The height of women ages​ 20-29 is normally​ distributed, with a mean of 63.863.8 inches. Assume...

The height of women ages​ 20-29 is normally​ distributed, with a mean of 63.863.8 inches. Assume σ equals=2.7 inches. Are you more likely to randomly select 1 woman with a height less than 65.8 inches or are you more likely to select a sample of 20 women with a mean height less than 65.8 ​inches? Explain.

the height of women ages 20-29 is normally distributed, with a mean of 64.8 inches. Assume...

the height of women ages 20-29 is normally distributed, with a mean of 64.8 inches. Assume ó=2.8 inches. Are you more likely to randomly select 1 woman with a height less than 66.4 inches or are you more likely to select a sample of 26 women with a mean height less than 66.4 inches? Explain. What is the probability of randomly selecting 1 woman with a height less than 66.4 inches?

The height of women ages​ 20-29 is normally​ distributed, with a mean of 64.8 inches. Assume...

The height of women ages​ 20-29 is normally​ distributed, with a mean of 64.8 inches. Assume sigmaequals2.5 inches. Are you more likely to randomly select 1 woman with a height less than 66.4 inches or are you more likely to select a sample of 16 women with a mean height less than 66.4 ​inches? Explain.

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.

In a survey of women in a certain country​ (ages 20−​29), the mean height was 66.9...

In a survey of women in a certain country​ (ages 20−​29), the mean height was 66.9 inches with a standard deviation of 2.84 inches. Answer the following questions about the specified normal distribution. ​(a) What height represents the 95th ​percentile? ​(b) What height represents the first​ quartile?