The probability that a standard normal random variable Z is less than -3.5 is approximately 0.
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The probability that a standard normal random variable Z is less than -3.5 is approximately 0....
Let Z be a standard normal random variable. Calculate the following; P(Z is less than or equal to c)= 0.7939
Given that z is a standard normal random variable, compute the probability that it takes on a value that is: - either greater than 2 or less than -2. - that it takes on a value between -2 and -1. - that it takes on a value between 1 and 2. Answer must be between 0 and 1, round to four decimal places.
given that z is a standard normal random variable what is the probability that z ≥ -2.12? a. 0.966 b. 0.017 c.4830 0.9830 From a population of 200 elements, a sample of 49 elements is selected. It is determined that the sample mean is 56 and the sample standard deviation is 14. The standard error of the mean is a. 3 b. 2 c. greater than 2 d. less than 2
If Z is a random variable from a standard normal distribution and if P(Z>c)=0.36 than P(Z<-c)=0.64. True or false
For a Standard Normal random variable Z, calculate the probability P(-0.25 < Z < 0.25). For a Standard Normal random variable Z, calculate the probability P(-0.32 < Z < 0.32). For a Standard Normal random variable Z, calculate the probability P(-0.43 < Z < 0.43). Calculate the z-score of the specific value x = 26 of a Normal random variable X that has mean 20 and standard deviation 4. A Normal random variable X has mean 20 and standard deviation...
Given that z is a standard normal random variable, compute the probability that it takes on a value greater than 2. Make sure your answer is between 0 and 1, round to four decimal places.
Suppose x is a normal random variable with mean u and standard deviation o. If z is the standardized normal random variable of x, which of the following statements is false? (1) When r = y, the value of z=0. (2) When z is less than the mean y, the value of z is negative. (3) When r is greater than the mean y, the value of z is positive. (4) It is always the case that z <I.
If the random variable z is the standard normal score and a >0 is it true that p ( z >a ) = p ( z < a ) ? Why pi r Why or What not? yes because normal distribution means is 0 and variance is 1. What is the property does the distribution have?
Question 2 options: Assume Z is a standard normal random variable with mean 0 and variance 1. Find P(Z<1.48)? Area below 1.48? Note: Enter X.XX AT LEAST ONE DIGIT BEFORE THE DECIMAL, TWO AFTER and round up. Thus, 27 is entered as 27.00, -3.5 is entered as -3.50, 0.3750 is entered as 0.38 | | Assume Z is a standard normal random variable with mean 0 and variance 1. Find P(Z>0.67)? Area above 0.67? Note: Enter X.XX AT LEAST ONE...
Find the indicated probability given that Z is a random variable with a standard normal distribution. (Round your answer to four decimal places.) P(0 ≤ Z ≤ 1.28) P(0 ≤ Z ≤ 1.28) =