Here is a simple probability model for multiple-choice tests. Suppose that each student has probability p...

Here is a simple probability model for multiple-choice tests. Suppose that each student has probability p...

Here is a simple probability model for multiple-choice tests. Suppose that each student has probability p of correctly answering a question chosen at random from a universe of possible questions. (A strong student has a higher p than a weak student.) The correctness of answers to different questions are independent. Jodi is a good student for whom p = 0.82. (a) Use the Normal approximation to find the probability that Jodi scores 78% or lower on a 100-question test. (Round...

Here is a simple model for multiple-choice tests. Suppose that each student has a probability of...

Here is a simple model for multiple-choice tests. Suppose that each student has a probability of p of correctly answering a question chosen at random from a universe of possible questions. (a strong student has a higher p than a weak student.) The correctness of answers to different questions are independent. Jodi is a good student for whom p= 0.76. (c) How many questions must the test contain in order to reduce the standard deviation of Jodi's proportion of correct...

Here is a simple probability model for multiple-choice tests. Suppose that each student has probability p...

Here is a simple probability model for multiple-choice tests. Suppose that each student has probability p of correctly answering a question chosen at random from a universe of possible questions. (A strong student has a higher p than a weak student.) The correctness of answers to different questions are independent. Jodi is a good student for whom p = 0.83. (a) Use the Normal approximation to find the probability that Jodi scores 78% or lower on a 100-question test. (Round...

Here is a simple probability model for multiple-choice tests. Suppose that each student has probability p...

Here is a simple probability model for multiple-choice tests. Suppose that each student has probability p of correctly answering a question chosen at random from a universe of possible questions. (A strong student has a higher p than a weak student.) The correctness of answers to different questions are independent. Jodi is a good student for whom p = 0.83. (a) Use the normal approximation to find the probability that Jodi scores 78% or lower on a 100-question test.(Round the...

Consider a multiple-choice examination with 50 questions. Each question has four possible answers. Assume that a...

Consider a multiple-choice examination with 50 questions. Each question has four possible answers. Assume that a student who has done the homework and attended lectures has a 75% chance of answering any question correctly. (Round your answers to two decimal places.) (a) A student must answer 43 or more questions correctly to obtain a grade of A. What percentage of the students who have done their homework and attended lectures will obtain a grade of A on this multiple-choice examination?...

a student takes a multiple choice test that has 30 questions. each question has 5 choices....

a student takes a multiple choice test that has 30 questions. each question has 5 choices. the student did not study for the test and decides to randomly guess at each question. a) find the probability the student gets exactly 10 problems correct. b) calculate the mean. c) calculate the standard deviation. statistics and probability.

An exam has 5 questions and each of them has 4 possible answers. A student gets...

An exam has 5 questions and each of them has 4 possible answers. A student gets 3 points for each correct answer and loses 1 point for each wrong answer. Consider a student who answers all questions completely at random. Let X denote the number of correct answers and Y the number of points of this student at the end of the test. (A negative score is possible). (a) Compute the mean and the standard deviation of Y , µY...

A student takes a multiple-choice test that has 40 questions. Each question has 5 choices. The...

A student takes a multiple-choice test that has 40 questions. Each question has 5 choices. The student did not study for the test and decides to randomly guess at each question. (Hint: The probability of guessing correctly is 0.2.) Round the probability to four decimal places. a) Find the probability the student gets exactly 10 problems correct._______________ (Show work.) b) Calculate the mean.____________ c) Calculate the standard deviation._____________ Your flight has been delayed. At Philadelphia International Airport, 90% of recent...

2. A multiple-choice test has 25 questions. There are four choices for each question. A student...

2. A multiple-choice test has 25 questions. There are four choices for each question. A student who has not studied for the test decides to answer all questions by randomly choosing one of the four choices. What probability distribution can be used to compute his chance of correctly answering at least 15 questions? a. Normal distribution b. Binomial distribution c. Poisson distribution d. None of these

QUESTION 17 MC1703: A test consists of 10 multiple choice questions, each with four possible answers,...

QUESTION 17 MC1703: A test consists of 10 multiple choice questions, each with four possible answers, one of which is correct. To pass, a student must get at least 5 correct on the test. If a student randomly guesses at every question, what is the probability that the student fails the test? a. 1.6% b. 5.8% c. 75% d. 92.2% e. 98.0% f. None of these 1 points    QUESTION 18 MC1802: Each child born to a particular set of...