David scored 942 on a standardized achievement test. The mean test score was 850 with a...
David scored 942 on a standardized achievement test. The mean test score was 850 with a standard deviation of 100. Assuming that the distribution of test scores was normal,and using Table 8.1, what percent of students scored higher than David?
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David scored 942 on a standardized achievement test. The mean
test score was 850 with a...
2a-b 2. A fifth grader takes a standardized achievement test (mean = 125, standard deviation =...
2a-b
2. A fifth grader takes a standardized achievement test (mean = 125, standard deviation = 15) and scores a 148 a. Draw and label a normal curve using the mean and standard deviation, b. What percent scored higher than the fifth grader?
27. On a standardized test with a normal distribution, the mean was 64.3 and the standard...
27. On a standardized test with a normal distribution, the mean was 64.3 and the standard deviation was 5.4. What is the best approximation of the percent of scores that fell between 61.6 and 75.1? 28. The mean of a normally distributed set of data is 52 and the standard deviation is 4. Approximately 95% of all the cases will lie between which measures? 29. Battery lifetime is normally distributed for large samples. The mean lifetime is 500 days and...
0/2 pts Question 3 On a certain standardized test . The mean is 54 .The standard deviation is 10 .Scores are whole numbers . Connie scored 34 Find numbers a and c such that Connie scored higher than...
0/2 pts Question 3 On a certain standardized test . The mean is 54 .The standard deviation is 10 .Scores are whole numbers . Connie scored 34 Find numbers a and c such that Connie scored higher than approximately 100-d' (a) percent of people who took the test. Make a continuity correction. What is 100c a? Correct Answer 101.95
0/2 pts Question 3 On a certain standardized test . The mean is 54 .The standard deviation is 10 .Scores are...
7 In a certain year, when she was a high school senior, Idonna scored 679 on...
7 In a certain year, when she was a high school senior, Idonna scored 679 on the mathematics part of the SAT. The distribution of SAT math scores in that year was Normal with mean 505 and standard deviation 120. Jonathan took the ACT and scored 25 on the mathematics portion. ACT math scores for the same year were Normally distributed with mean 20.6 and standard deviation 5.2 Find the standardized scores ±0.01) for both students. Assuming that both tests...
Two standardized tests, test A and test B, use very different scales. Assume that in one...
Two standardized tests, test A and test B, use very different scales. Assume that in one year the distribution of scores on test A can be modeled by N(1300,250) and scores on test B can be modeled by N(15, 3). If an applicant to a university has taken test A and scored 1670 and another student has taken test B and scored 19, compare these students' scores using z-values. Which one has a higher relative score? Explain. The Z-value of...
D Question 19 5 pts A student earned a score of 940 on a national achievement...
D Question 19 5 pts A student earned a score of 940 on a national achievement test. The mean test score was 850 with a standard deviation of 100. What proportion of students had a lower score than the student with the score of 940? (Assuime tht tet scores are normally ditributed) 0.90 0.82 0.50 0.18 0.10
(2 points) For students in a certain region, scores of students on a standardized test approximately...
(2 points) For students in a certain region, scores of students on a standardized test approximately follow a normal distribution with mean u = 543.4 and standard deviation o = 26.9. In completing the parts below, you should use the normal curve area table that is included in your formula packet. (a) What is the probability that a single randomly selected student from among all those in region who took the exam will have a score of 548 or higher?...
According to the data, the mean quantitative score on a standardized test for female college-bound high...
According to the data, the mean quantitative score on a standardized test for female college-bound high school seniors was 500. The scores are approximately Normally distributed with a population standard deviation of 100. What percentage of the female college-bound high school seniors had scores above 637? Answer this question by completing parts (a) through (g) below. e. Use the Normal table to find the area to the left of the z-score that was obtained from a standardized test score of...
The mean score of a college entrance test is 500
The mean score of a college entrance test is 500 ; the standard deviation is 75 . The scores are normally distributed.a)What percent of the students scored below 320 ?b) What percentage of the students scored above 575 ?c) What percentage of the students scored between 400 and 550 ?
3. According to data, the mean quantitative score on a standardized test for female college-bound high...
3. According to data, the mean quantitative score on a standardized test for female college-bound high school seniors was 500. The scores are approximately normally distributed with a population standard deviation of 100. What percentage of the female college-bound high school seniors had scores above 725? Use a standard normal table or appropriate technology.
2a-b
2. A fifth grader takes a standardized achievement test (mean = 125, standard deviation = 15) and scores a 148 a. Draw and label a normal curve using the mean and standard deviation, b. What percent scored higher than the fifth grader?
27. On a standardized test with a normal distribution, the mean was 64.3 and the standard deviation was 5.4. What is the best approximation of the percent of scores that fell between 61.6 and 75.1? 28. The mean of a normally distributed set of data is 52 and the standard deviation is 4. Approximately 95% of all the cases will lie between which measures? 29. Battery lifetime is normally distributed for large samples. The mean lifetime is 500 days and...
0/2 pts Question 3 On a certain standardized test . The mean is 54 .The standard deviation is 10 .Scores are whole numbers . Connie scored 34 Find numbers a and c such that Connie scored higher than approximately 100-d' (a) percent of people who took the test. Make a continuity correction. What is 100c a? Correct Answer 101.95
0/2 pts Question 3 On a certain standardized test . The mean is 54 .The standard deviation is 10 .Scores are...
7 In a certain year, when she was a high school senior, Idonna scored 679 on the mathematics part of the SAT. The distribution of SAT math scores in that year was Normal with mean 505 and standard deviation 120. Jonathan took the ACT and scored 25 on the mathematics portion. ACT math scores for the same year were Normally distributed with mean 20.6 and standard deviation 5.2 Find the standardized scores ±0.01) for both students. Assuming that both tests...
Two standardized tests, test A and test B, use very different scales. Assume that in one year the distribution of scores on test A can be modeled by N(1300,250) and scores on test B can be modeled by N(15, 3). If an applicant to a university has taken test A and scored 1670 and another student has taken test B and scored 19, compare these students' scores using z-values. Which one has a higher relative score? Explain. The Z-value of...
D Question 19 5 pts A student earned a score of 940 on a national achievement test. The mean test score was 850 with a standard deviation of 100. What proportion of students had a lower score than the student with the score of 940? (Assuime tht tet scores are normally ditributed) 0.90 0.82 0.50 0.18 0.10
(2 points) For students in a certain region, scores of students on a standardized test approximately follow a normal distribution with mean u = 543.4 and standard deviation o = 26.9. In completing the parts below, you should use the normal curve area table that is included in your formula packet. (a) What is the probability that a single randomly selected student from among all those in region who took the exam will have a score of 548 or higher?...
3. According to data, the mean quantitative score on a standardized test for female college-bound high school seniors was 500. The scores are approximately normally distributed with a population standard deviation of 100. What percentage of the female college-bound high school seniors had scores above 725? Use a standard normal table or appropriate technology.
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