3) At a particular college, the grades obtained in a statistical exam have a normal distribution...

A statistics teacher believes that the final exam grades for her class have a normal distribution...

A statistics teacher believes that the final exam grades for her class have a normal distribution with a mean of 80 and a standard deviation of 8. Answer the following: (a) Determine the z-score for a person from this population that has a test score of 66. Then find the z-score for someone whose test score is 95. (b) If x represents a possible test score from this population, find P(x > 87). (c) Find P(79 < x < 89)...

Q3 – Normal Distribution (10 pts). suppose we have 10 students with the following grades: 34,...

Q3 – Normal Distribution (10 pts). suppose we have 10 students with the following grades: 34, 67, 45, 87, 75, 49, 68, 59, 70, 74 Find sum, average, SD, Z-score what is the probability of a student to get 71 what is the probability to get a grade between 60 and 70 what is the probability to get a grade > 77

Student grades in a sufficiently large class tend to follow a normal distribution. Suppose the final...

Student grades in a sufficiently large class tend to follow a normal distribution. Suppose the final exam of a class follows a normal distribution with a mean of 75 and a standard deviation of 7.5. Select a score of 95 and specify its z-score based on this distribution. When calculating the z-score, include the steps leading to the workings. That way, any mistakes can be quickly seen and corrected. Use the chosen raw score (95) and the calculated z-score to...

The following data represents the exam scores of students in Econ 220 VV22, which is one...

The following data represents the exam scores of students in Econ 220 VV22, which is one of several sections of Econ 220 in a college. You can take this as a sample.                                                                 Student Score 1 82 2 70 3 50 4 60 5 75 6 65 7 55 8 80 9 85 10 90 11 95 12 94 13 35 14 40 15 65 16 95 17 91 18 55 19 65 20 76 21 86 22 96...

The scores on a college entrance exam have an approximate normal distribution with mean, µ =...

The scores on a college entrance exam have an approximate normal distribution with mean, µ = 75 points and a standard deviation, σ = 7 points. About 68% of the x values lie between what two values? What are the z-scores?

Suppose that the first scores for a particular college entrance exam are distributed according to a...

Suppose that the first scores for a particular college entrance exam are distributed according to a bell-shaped, symmetric distribution with a mean of 450 and variance of 10,000. a) what percent of the students who take the exam score between 350 and 650? b) any student who scores higher 550 is automatically admitted to the colleges. what percent of the students who take the exam are automatically admitted to the college? c) what percent of the students who take the...

Test scores on an exam follow a normal distribution with mean = 72 and standard deviation...

Test scores on an exam follow a normal distribution with mean = 72 and standard deviation = 9.  For a randomly selected student, find            a) P(x ≥ 80), b) P(65 <x<90), what is thed minimum svore to be among top 12 percent

if exam 1 grades are normally disributed witj mean of 70 & sd 10 find probability...

if exam 1 grades are normally disributed witj mean of 70 & sd 10 find probability a random selected student recives a 60 (b)less than 60 (c)between 65&85 d more than 70

The professor of a Statistics class has stated that, historically, the distribution of final exam grades...

The professor of a Statistics class has stated that, historically, the distribution of final exam grades in the course resemble a Normal distribution with a mean final exam mark of μ=60μ=60% and a standard deviation of σ=9σ=9%. (a) What is the probability that a random chosen final exam mark in this course will be at least 73%? Answer to four decimals. equation editor (b) In order to pass this course, a student must have a final exam mark of at...

The average student loan debt for college graduates is $25,800. Suppose that that distribution is normal...

The average student loan debt for college graduates is $25,800. Suppose that that distribution is normal and that the standard deviation is $11,800. Let X = the student loan debt of a randomly selected college graduate. Round all probabilities to 4 decimal places and all dollar answers to the nearest dollar. a. What is the distribution of X? X ~ N ( _ , _ ) b Find the probability that the college graduate has between $31,750 and $50,200 in...