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**Problem Statement:** Find the area under the standard normal curve to the left of \( z = -2.33 \). Round your answer to four decimal places, if necessary. **Answer:** [Insert a rectangular box for input] **Explanation:** This problem involves determining the cumulative probability associated with a standard normal distribution, given a specific z-value. The standard normal distribution is a bell-shaped curve that is symmetrical around the mean \( \mu = 0 \) with a standard deviation \( \sigma = 1 \). Here, you are asked to find the cumulative probability, or the area under the curve, to the left of \( z = -2.33 \). This can typically be found using a standard normal distribution table or statistical software, which will give a value that represents the probability of a normally distributed random variable being less than \( z = -2.33 \). Remember to round your final answer to four decimal places.