3.23 The proportion of observations from a standard Nor- al distribution that take values between 1...
this three questions 3.22 The proportion of observations from a standard Normal distribution that take values greater than 1.78 is about (a) 0.9554. (b) 0.0446. (c) 0.0375. The proportion of observations from a standard Normal distribution that take values between 1 and 2 is about (a) 0.025. (b) 0.135. (c) 0.160. The scores of adults on an IQ test are approximately Normal with mean 100 and standard deviation 15 Alysha scores 135 on such a test. She scores higher than...
The proportion of observations from a standard Normal distribution that take values greater than 1.78 is about (a) 0.9554. (b) 0.0446. (c) 0.0375. 2
9 (3.22) The proportion of observations from a standard Normal distribution that take values greater than 1.58 is about 0.001) eBook 10 (3.22) The proportion of observations from a standard Normal distribution that take values less than-1.23 is about 0.0001) eBook
The proportion of observations from a standard Normal distribution that take values greater than 1.68 is about (±0.001)
The proportion of observations from a standard Normal distribution that take values greater than 1.15 is about(a) 0.1251(b) 0.8532(c) 0.8729(d) 0.8749(e) 0.8770
9. (3.22) The proportion of observations from a standard Normal distribution that take values greater than 1.47 is about 0.001)
Find the proportion of observations of a standard normal distribution that are between the mean and 3.23 standard deviations above the mean. Click here to view page 1 of the table. Click here to view page 2 of the table. % of observations are between the mean and 3.23 standard deviations above the mean. (Round to two decimal places as needed.)
The proportion of the observation from a Standard Normal Distribution that take values ggreater than 1.15 is about(a) 0.1251(b) 0.8531(c) 0.8729(d) 0.8749(e) 0.8770
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
14. (3.28) Find the proportion of observations (±0.0001) from a standard Normal distribution that falls in each of the following regions. In each case, sketch a standard Normal curve and sha the area representing the region. (a)z -2.33: (b)-2.33 (c)z 1.55 (d)-2.33 <z<1.55: