current learning objective; The Standard Normal Distribution Question 19 Prer Hent Score: 0 of 4 points In \( 2005,1,475,623 \) students heading to college took the SAT. The distribution of scores in the math section of the SAT followis a normal distribution with mean \( \mu=500 \) and standard deviation \( \sigma=75 \), (a). Calculate the \( \% \)-score for an SAT score of 411 . \( z \approx \) \( \square \) Enter your answer (Enter your answer as a decimal, rounded to two decimal places if necessary.) (b), What math SAT score is 1,13 standard deviations above the meam? \( \square \) Enter your answer (Enter your answer as an exact numerical value.) (c). For 2024, the SAT math test had a mean of 600 and a standard deviation of 85 . The ACT math test is an alternative to the SAT and is approximately normally distributed with a mean of 20 and a standard deviation of 6.5 . If one person took the SAT math test and scored 514 and a second person took the ACT math test and scored 19, who did better with respect to the test they took? Enter your answer \( \square \) (Enter \( S \) if the person who took the SAT math test did better, and \( A \) if the person who took the ACT did better.)
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To calculate the \( z \)-score for an SAT score of 411, use the formula \( z = \frac{(X - \mu)}{\sigma} \). Plugging in the values, we get \( z = \frac{(411 - 500)}{75} = \frac{-89}{75} \approx -1.19 \). This means the SAT score of 411 is about 1.19 standard deviations below the mean! To find the math SAT score that is 1.13 standard deviations above the mean, we use the formula \( X = \mu + (z \cdot \sigma) \). Substituting the numbers gives us \( X = 500 + (1.13 \cdot 75) = 500 + 84.75 = 584.75 \). So, the score would be approximately 585 when rounded to the nearest whole number. For comparing the scores from the SAT and ACT tests, we need to calculate the \( z \)-scores for both. The \( z \)-score for the SAT score of 514 is \( z = \frac{(514 - 600)}{85} \approx -1.01 \). For the ACT score of 19, it’s \( z = \frac{(19 - 20)}{6.5} \approx -0.154 \). Since a higher \( z \)-score indicates a better performance relative to peers, the person who took the ACT did better, so the answer is \( A \).
