Final answer:
To find the indicated probability using the standard normal distribution, calculate the area under the normal curve between two z-scores. The probability between -0.39 and 0.32 is 0.2772.
Step-by-step explanation:
To find the indicated probability using the standard normal distribution, we need to calculate the area under the normal curve. In this case, P(-0.39 < Z < 0.32).
Using a calculator or standard normal probability table, we can find the area to the left of -0.39 and the area to the left of 0.32, and then subtract the two values to get the probability between -0.39 and 0.32.
The area to the left of -0.39 is approximately 0.3483 and the area to the left of 0.32 is approximately 0.6255. Therefore, the probability between -0.39 and 0.32 is approximately 0.6255 - 0.3483 = 0.2772.