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The Height of Sixth Grade Students in a Class Is

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The height of sixth grade students in a class is a random variable The height of sixth grade students in a class is a random variable with mean in. Assume the height of the students is normally distributed with standard deviation in. Let be the probability that a student will be at most in. tall. Express as an integral of an appropriate density function, and compute its value numerically. with mean The height of sixth grade students in a class is a random variable with mean in. Assume the height of the students is normally distributed with standard deviation in. Let be the probability that a student will be at most in. tall. Express as an integral of an appropriate density function, and compute its value numerically. in. Assume the height of the students is normally distributed with standard deviation The height of sixth grade students in a class is a random variable with mean in. Assume the height of the students is normally distributed with standard deviation in. Let be the probability that a student will be at most in. tall. Express as an integral of an appropriate density function, and compute its value numerically. in. Let The height of sixth grade students in a class is a random variable with mean in. Assume the height of the students is normally distributed with standard deviation in. Let be the probability that a student will be at most in. tall. Express as an integral of an appropriate density function, and compute its value numerically. be the probability that a student will be at most The height of sixth grade students in a class is a random variable with mean in. Assume the height of the students is normally distributed with standard deviation in. Let be the probability that a student will be at most in. tall. Express as an integral of an appropriate density function, and compute its value numerically. in. tall. Express The height of sixth grade students in a class is a random variable with mean in. Assume the height of the students is normally distributed with standard deviation in. Let be the probability that a student will be at most in. tall. Express as an integral of an appropriate density function, and compute its value numerically. as an integral of an appropriate density function, and compute its value numerically.

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