A random sample of n measurements was selected from a population with unknown mean μ and standard deviation σ = 35 for each of the situations in parts a through d. Calculate a 99% confidence interval for μ for each of these situations.
a. n = 75, x = 20
Interval: ( _____, _____ )
b. n = 150, x = 104
Interval: ( _____, _____ )
c. n = 90, x = 16
Interval: ( _____, _____ )
d. n = 90, x = 5.45
Interval: ( _____, _____ )
A random sample of n measurements was selected from a population with unknown mean μ and...
(1 point) A random sample of n measurements was selected from a population with unknown mean u and standard deviation o. Calculate a 99% confidence interval for u for each of the following situations: (a) n= 105, X = 25.8, s = = 2.92 sus (b) n = 95, x = 96, s = 4.13 su < (c) n = 85, X = 63.6, s = 2.31 su < (d) n = 115, x = 102.1, s = 2.95 su...
(1 point) A random sample of n measurements was selected from a population with unknown mean u and standard deviation o. Calculate a 90% confidence interval for p for each of the following situations: (a) n = 100 = 102.2, s = 2.28 << (b) n=90, Z = 84.8, s = 2.19 <u (c) n = 80, Z = 55.8, s 2.48 << (d) n=90, = 76.3, s = 2.68 Sus Note: You can earn partial credit on this problem.
(1 point) A random sample of n measurements was selected from a population with unknown mean y and standard deviation o. Calculate a 95% confidence interval for u for each of the following situations: (a) n = 100, X = 35.1, s = 3.61 sus (b) n= 110, x = 53.2, s = 3.36 Sus .. (c) n = 115, x = 68.3, s = 4.76 18 SMS !!! (d) n=95, x = 41, s = 2.81 !!! Sus
Suppose a random sample of n= 16 measurements is selected from a population with mean μ and standard deviation σ. For each of the following values of μ and σ, give the values of mu Subscript x over bar μ x and sigma Subscript x overbar Baseline .and σx. a. μ=5, σ=3 b. μ=25 σ=16 c. μ =10, σ=32 d. μ=55, σ=84 a. mu Subscript x over bar μ x= sigma Subscript x over bar σ x=_______(Type an integer or...
and for 2. A random sample of n measurements is selected from a population with unknown mean known standard deviation o = 10. Calculate the width of a 95% confidence interval for these values of n: a. n=100 b. n=200 c. n=400 d. n=1000 e. n=2000
1. A random sample of n measurements was selected from a population with standard deviation σ=13.6 and unknown mean μ. Calculate a 90 % confidence interval for μ for each of the following situations: (a) n=45, x¯¯¯=89.8 ≤μ≤ (b) n=70, x¯¯¯=89.8 ≤μ≤ (c) n=100, x¯¯¯=89.8 ≤μ≤ (d) In general, we can say that for the same confidence level, increasing the sample size the margin of error (width) of the confidence interval. (Enter: ''DECREASES'', ''DOES NOT CHANGE'' or ''INCREASES'', without the...
Suppose a random sample of n=64 measurements is selected from a population with mean μ and standard deviation σ. For each of the following values of μ and σ, give the values of mu Subscript x overbarμx and sigma Subscript x overbar Baseline .and σx. a. μ =11, σ=22 b. μ=121 σ=64 c. μ=22 σ=32 d. μ=11 σ=160 a. mu Subscript x over bar μ=_________ sigma Subscript x over bar σx=n_______(Type an integer or a decimal.) b. mu Subscript x...
Suppose a random sample of=100 measurements is selected from a population with mean μ and standard deviation σ.For each of the following values of μ and σ, give the values of u Subscript x overbarμx and sigma Subscript x overbar Baseline .and σx. a. μ=55, σ=22 b. μ=25, σ=100 c. μ=10, sigma=8080 d. u=55, σ=190 a. mu Subscript x overbarμxequals=______ sigma Subscript x overbarσxequals=_______ (Type an integer or a decimal.)
A random sample is selected from a population with mean μ = 102 and standard deviation σ = 10. Determine the mean and standard deviation of the xbar sampling distribution for each of the following sample sizes. (Round the answers to three decimal places.) (a) n = 15 μ = σ = (b) n = 35 μ = σ = (c) n = 55 μ = σ = (d) n = 110 μ = σ = (e) n = 440...
Suppose a random sample of n = 87 measurements is selected from a population with mean μ = 24 and standard deviation σ = 8. Find the value of the standard error, (round to 1 decimal place). = ?