c= d) - 1.2133 PL??
Determine the value of c that satisfies the following, based on a standard normal distribution. P(Z...
For a standard normal distribution, find: P(0.61 < z < 2.92)
For a standard normal distribution, find: P(-2.43 < z < -1.87) For a standard normal distribution, find: P(-2.43 <z<-1.87) Submit License Question 3. Points possible: 1 This is attempt 1 of 3.
(1 point) Compute the following probabilities for the standard normal distribution Z. A P(0 < Z < 2.4) B. P(-1.85 <Z < 0.55) = c. P(Z > -1.95)
For a standard normal distribution, find: P(Z < c) = 0.2523 Find c.
Find the proportion of observations from a standard normal distribution curve that satisfies z-score: -0.2<z< 0.6 Round numerical value to the second decimal place, (Hint: use cumulative standard normal distribution z-table) None of the given numerical values is correct 0.41 Not enough information to answer the question 0.38 0.23 0.31 0.16 0.69
For a standard normal distribution, find: P(-1.95<z<0.09)
2. Find the value of c that satisfies each of the following probabilities for a standard normal random variable 2: (a) p(z <c) = 0.975 (b) p(-c<z<c) = 0.95
2 pts Find the proportion of observations from a standard normal distribution curve that satisfies z-score: -0.1<z< 1.0 Round numerical value to the second decimal place. (Hint: use cumulative standard normal distribution z-table) O 0.62 O 0.38 0.32 O 0.25 O 0.48 0.44 Not enough information to answer the question None of the given numerical values is correct
Compute the following probabilities assuming a standard normal distribution. a) P(Z < 1.4) b) P(Z < 1.12) c) P(-0.89 <z< 1.35) d) P(O<z<2.42)
For a standard normal distribution, find: P(Z <c) - 0.4642 Find c rounded to two decimal places. -.09 -0.08986 this is from a past homework assignment and im reviewing for a test. i just needed an explanation on how to get to that answer