In a normal curve, approximately what percent of the scores are more than 2 standard deviations...

What is the probability of a normal variable being lower than 5.2 standard deviations below its...

What is the probability of a normal variable being lower than 5.2 standard deviations below its mean? Do you need to know the mean and standard deviation? 2. What is the probability of a normal variable being within 1.2 standard deviations of its mean? Do you need to know the mean and standard deviation?

1. One hundred percent of scores fall under the area of the normal curve. true false...

1. One hundred percent of scores fall under the area of the normal curve. true false 2. A z score tells nothing about the distance of a score from the mean. true false 3. A z score does NOT allow for the comparison of different scores from different distributions true false 4. A number whose z score is equal to zero is equal to the mean. true false 5. Which of the following is not a characteristic of the normal...

How many standard deviations are there in a normal distribution curve? A. 1 above and and...

How many standard deviations are there in a normal distribution curve? A. 1 above and and below B. 2 above and below C. 3 above and below D. 4 above and below

what percent of data is not contained within 2.4 standard deviations about mean for a normal...

what percent of data is not contained within 2.4 standard deviations about mean for a normal distribution?

Some teachers grade on a "(bell) curve" based on the belief that classroom test scores are...

Some teachers grade on a "(bell) curve" based on the belief that classroom test scores are normally distributed. One way of doing this is to assign a "C" to all scores within 1 standard deviation of the mean. The teacher then assigns a "B" to all scores between 1 and 2 standard deviations above the mean and an "A" to all scores more than 2 standard deviations above the mean, and uses symmetry to define the regions for "D" and...

Consider the following means and their standard deviations. Which set of scores represents a more homogenous...

Consider the following means and their standard deviations. Which set of scores represents a more homogenous data set (scores more similar to each other). Group of answer choices Mean=22, SD=5 Mean= 22, SD=9 Mean=22, SD=3 Mean= 22, SD=22

Scores on an aptitude test are approximately normal with a mean of 100 and a standard...

Scores on an aptitude test are approximately normal with a mean of 100 and a standard deviation of 20. A particular test-taker scored 125.6. What is the PERCENTILE rank of this test-taker's score? A. 50th percentile. B. 10th percentile. C. 90th percentile. D. 95th percentile E. None of the above. The proportion of z-scores from a normal distribution that are LARGER THAN z = -0.74 is A. 0.23 B. 0.38 C. 0.80 D. 0.77 E. None of the above. (c)...

Exam scores in a MATH 1030 class is approximately normally distributed with mean 87 and standard...

Exam scores in a MATH 1030 class is approximately normally distributed with mean 87 and standard deviation 5.2. Round answers to the nearest tenth of a percent. a) What percentage of scores will be less than 93? % b) What percentage of scores will be more than 80? % c) What percentage of scores will be between 79 and 88? %

test scores in a MATH 1030 class is approximately normally distributed with mean 86 and standard...

test scores in a MATH 1030 class is approximately normally distributed with mean 86 and standard deviation 6. Round answers to the nearest tenth of a percent. a) What percentage of scores will be less than 88? % b) What percentage of scores will be more than 82? % c) What percentage of scores will be between 81 and 87? %

Find the percent of area under a normal curve between the mean and the given number...

Find the percent of area under a normal curve between the mean and the given number of standard deviations from the mean.​ (Note that positive indicates above the​ mean, while negative indicates below the​ mean.) 0.80 ____​% ​(Round to the nearest tenth as​ needed.)