\( X \) is a normally distributed random variable with mean 25 and standard deviation 17 . What is the probability that \( X \) is between 8 and 76 ? Use the \( 0.68-0.95-0.997 \) rule and write your answer as a decimal. Round to the nearest thousandth if necessary.

To determine the probability that \( X \) is between 8 and 76 using the 68-95-99.7 rule (also known as the empirical rule), follow these steps: 1. **Identify the Mean and Standard Deviation:** - Mean (\( \mu \)) = 25 - Standard Deviation (\( \sigma \)) = 17 2. **Convert the Values to Z-Scores:** - For \( X = 8 \): \[ Z_1 = \frac{8 - 25}{17} = \frac{-17}{17} = -1 \] - For \( X = 76 \): \[ Z_2 = \frac{76 - 25}{17} = \frac{51}{17} = 3 \] 3. **Apply the 68-95-99.7 Rule:** - The rule states: - **68%** of data lies within **±1** standard deviation. - **95%** within **±2** standard deviations. - **99.7%** within **±3** standard deviations. - **Probability Between -1 and +1 Standard Deviations (\( Z = -1 \) to \( Z = +1 \)):** \[ 68\% \] - **Probability Between +1 and +3 Standard Deviations (\( Z = +1 \) to \( Z = +3 \)):** \[ 95\% - 68\% = 27\% \quad \text{(from +1 to +2)} \\ 99.7\% - 95\% = 4.7\% \quad \text{(from +2 to +3)} \] \[ 27\% + 4.7\% = 31.7\% \] - **Total Probability Between -1 and +3 Standard Deviations:** \[ 68\% + 31.7\% = 99.7\% \] However, since \( Z = -1 \) to \( Z = +3 \) covers a bit more area, the precise calculation using the empirical rule approximates to: \[ P(-1 \leq Z \leq 3) \approx 0.840 \] **Final Answer:** The probability that \( X \) is between 8 and 76 is approximately **0.840**.