Suppose $Z$ follows the standard normal distribution. Calculate the following probabilities using the ALEKS calculator. Round your responses to at least three decimal places.
(a) $P(Z> 1.55)=$
(b) $P(Z \leq 1.48)=$
(c) $P(-0.46< \mathrm{Z}< 1.71)=$
Answer
Therefore, the final answers are: \(P(Z>1.55) = \boxed{0.060}\), \(P(Z \leq 1.48) = \boxed{0.930}\), and \(P(-0.46<Z<1.71) = \boxed{0.780}\).
Step 1 :First, we need to understand that the standard normal distribution has a mean of 0 and a standard deviation of 1. The Z-score represents the number of standard deviations a value is from the mean.
Step 2 :We are asked to find the probability that Z is greater than 1.55. This means we are looking for the area under the curve to the right of Z=1.55. Using the ALEKS calculator, we find that \(P(Z>1.55) = 0.060\).
Step 3 :Next, we are asked to find the probability that Z is less than or equal to 1.48. This means we are looking for the area under the curve to the left of Z=1.48. Using the ALEKS calculator, we find that \(P(Z \leq 1.48) = 0.930\).
Step 4 :Finally, we are asked to find the probability that Z is between -0.46 and 1.71. This means we are looking for the area under the curve between Z=-0.46 and Z=1.71. Using the ALEKS calculator, we find that \(P(-0.46 Step 5 :To check our results, we can compare them to the standard normal distribution table. The values we calculated are consistent with the values in the table. Step 6 :Therefore, the final answers are: \(P(Z>1.55) = \boxed{0.060}\), \(P(Z \leq 1.48) = \boxed{0.930}\), and \(P(-0.46
