The scores on an economics examination are normally distributed with a mean of 67 and a...
The scores on an economics examination are normally distributed with a mean of 74 and a standard deviation of 12. If the instructor assigns a grade of A to 13% of the class, what is the lowest score a student may have and still obtain an A?
Please help and work out :) There are two parts to this problem A)The scores on an economics examination are normally distributed with a mean of 71 and a standard deviation of 13. If the instructor assigns a grade of A to 13% of the class, what is the lowest score a student may have and still obtain an A? B)Use the appropriate normal distribution to approximate the resulting binomial distribution. A basketball player has a 80% chance of making...
Let Z be the standard normal variable. Find z if z satisfies the given value. (Round your answer to two decimal places.) P(Z > 2) = 0.9535 z = To be eligible for further consideration, applicants for certain civil service positions must first pass a written qualifying examination on which a score of 75 or more must be obtained. In a recent examination, it was found that the scores were normally distributed with a mean of 70 points and a...
3. (4 points) The scores on a test are normally distributed with a mean of 75 and a standard deviation of 8. a) Find the proportion of students having scores greater than 85. b) If the bottom 3% of students will fail the course, what is the lowest score that a student can have and still be awarded a passing grade? Please round up to the nearest integer.
The exam scores on a certain Society of Actuaries (SOA)
professional examination are Normally distributed with a mean score
of μ=67% and a standard deviation of σ=5%.
(1 point) The exam scores on a certain Society of Actuaries (SOA) professonal examination are Normally distributed with a mean score of u = 67% and a standard deviation of o= 5%. (a) What is the probability that a random chosen person who is writing this SOA exam will score at most 69%?...
Scores on a recent Stat test were normally distributed with mean 77.26 and standard deviation 8.38. What was the lowest score a student could earn and still be in the top 10%? (Round your answer to the nearest integer.)
Assume that scores on a widely used standardized test are normally distributed with a mean of 750 and a standard deviation of 100. (Consider the distribution of scores to be a population.) If a university admits only the top 10% of the students taking the test, what is the lowest score a student can obtain and be admitted? What is the closest Z score corresponding to this value? What is the raw test score for this value?
In a university final examination, the scores of students are normally distributed. The examination is scaled so that the Mean is 72 and the Standard Deviation is 18. What fraction of the students throughout the university should score between 72 and 99? Group of answer choices
An instructor gives a 100-point examination in which the grades are normally distributed with a mean of 70 and a standard deviation of 8. (a) What proportion of students will get a score of 80 or higher? (b) If the instructor decides to give an A to students whose scores rank in top 5%, what is the cutoff score?
examination grades in an introductory statistics course is normally distributed, with a mean of 75 and a standard deviation of 7. Complete parts (a) through (d) a. What is the probablity that a student scored below 87 on this exam? The probability that a shudent scored below 87 is (Round to four decimal places as needed.) b What is the probability that a student scored between 68 and 94 The probability that a student soored between 68 and 94 is...