For the standard normal distribution determine the probability of the following Z - score: Greater than -1.06
To determine the probability of a Z-score being greater than -1.06, we need to find the area to the right of -1.06 on the standard normal distribution curve.
Using a Z-table or a calculator, we find that the area to the left of -1.06 on the standard normal distribution curve is approximately 0.1446. Therefore, the area to the right of -1.06 (the probability that a Z-score is greater than -1.06) is 1 - 0.1446 = 0.8554, or 85.54%.
So, the probability of a Z-score being greater than -1.06 on the standard normal distribution is approximately 85.54%.