Find x, such that P(|Z|<x)=0.99, and Find x, such that P(Z<x)=0.99 Find x, such that P(|Z|<x)=0.95,...

Critical values for quick reference during this activity. Confidence level Critical value 0.90 z∗=1.645 0.95 z∗=1.960...

Critical values for quick reference during this activity. Confidence level Critical value 0.90 z∗=1.645 0.95 z∗=1.960 0.99 z∗=2.576 Jump to level 1 In a poll of 1000 randomly selected voters in a local election, 728 voters were against school bond measures. What is the sample proportion p^? (Should be a decimal answer) What is the margin of error m for the 95% confidence level? (Should be a decimal answer)

Please compute the following: a) P(Z > 1.26), . P(Z < −0.86), P(Z > −1.37), P(−1.25...

Please compute the following: a) P(Z > 1.26), . P(Z < −0.86), P(Z > −1.37), P(−1.25 < Z < 0.37), . P(Z ≤ −4.6) b) Find the value ? such that ?(? > ?) = 0.05 c) Find the value of ? such that ?(−? < ? < ?) = 0.99

There are three workstations available having steady-state probabilities of 0.99, 0.95, 0.85 of being available on...

There are three workstations available having steady-state probabilities of 0.99, 0.95, 0.85 of being available on demand. What is the probability that at least two of the three will be available at any given time? Hint: calculate the P(all three being available)+P(two of them being available: A&B and not C, A&C and not B, or B&C and not A)

If P(z < z*) = 0.80, then P(−z* < z < z*) =

If P(z < z*) = 0.80, then P(−z* < z < z*) =

. Find a. P(Z=-1.01) b. P(Z>10) c. P(-1.5<Z<2) d. P(-2.58<Z) e. P(Z<3.15) f. The 30th percentile...

. Find a. P(Z=-1.01) b. P(Z>10) c. P(-1.5<Z<2) d. P(-2.58<Z) e. P(Z<3.15) f. The 30th percentile of Z g. The z value with 12% area to its right. 2. If X is normally distributed with a mean of 5.6 and a variance of 27, find a. P(X<2) b. P(-2.5<X<7.2) c. The 80th percentile of X

For a standard normal distribution, find: P(0.33 < z < 2.06) The answer I have is...

For a standard normal distribution, find: P(0.33 < z < 2.06) The answer I have is 0.99 but that is not right?

1. Find a. P(Z=-1.01) b. P(Z>10) c. P(-1.5<Z<2) d. P(-2.58<Z) e. P(Z<3.15) f. The 30th percentile...

1. Find a. P(Z=-1.01) b. P(Z>10) c. P(-1.5<Z<2) d. P(-2.58<Z) e. P(Z<3.15) f. The 30th percentile of Z g. The z value with 12% area to its right. 2. If X is normally distributed with a mean of 5.6 and a variance of 27, find a. P(X<2) b. P(-2.5<X<7.2) c. The 80th percentile of X

There are three workstations available having steady-state probabilities of 0.99, 0.95, 0.85 of being available on...

There are three workstations available having steady-state probabilities of 0.99, 0.95, 0.85 of being available on demand. What is the probability that at least two of the three will be available at any given time?

If P(-z < Z < z) = 0.599, find z. Find P( -2.46 < Z <...

If P(-z < Z < z) = 0.599, find z. Find P( -2.46 < Z < -0.63).

4. Find each of the following probabilities (P) for a normal distribution.           A. P (z...

4. Find each of the following probabilities (P) for a normal distribution.           A. P (z > -1.00) B. P (z > -0.80)           C. P (z < 0.25) 5. For a normal distribution, identify the z-score value(s) that separate the area of the distribution into sections so that there is…           A. 80% on the right, and 20% on the left           B. 90% in the middle, and 5% on each side           C. 95% in the middle, and...