The probability of passing an exam without studying is 25%. The probability of passing an exam...

The probability that a student got an B on a recent exam is 0.3. The probability...

The probability that a student got an B on a recent exam is 0.3. The probability that a student studied 10 hours or more is 0.4. The probability that a student studied 10 hours or more and got and B is 0.25. The probability that a student got a B given that they studied 10 hours or more is 0.625. Which of the below is true A. Studying more than 10 hours and getting an B are mutually exclusive events...

It is known that for students who studied English for at least 50 hours, their chance...

It is known that for students who studied English for at least 50 hours, their chance of passing the quiz is 0.95, while for those who studied English for less than 50 hours, their chance of passing the quiz is 0.1. It is also known that the probability of passing the quiz is 90%. If a student is randomly chosen and is found to have passed the quiz, what is the probability that he has studied for less than 50...

Suppose that the expected exam scores from studying economics for 0, 1, 2, or 3 hours...

Suppose that the expected exam scores from studying economics for 0, 1, 2, or 3 hours are 65, 80, 90, and 95 points, respectively, while the expected exam scores for studying 0, 1, 2, or 3 hours of accounting are 50, 65, 70, and 70 points, respectively. With 3 total hours of study time, your combined scores can be maximized by spending _______ hours studying economics. 1 2 3 4

A survey among freshmen at a certain university revealed that the number of hours spent studying...

A survey among freshmen at a certain university revealed that the number of hours spent studying the week before final exams was approximately normally distributed with mean 25 and standard deviation 7. What proportion of students studied more than 20 hours? What proportion of students studied less than 16 hours? What proportion of the students studied between 25 and 40 hours?

A survey among freshmen at a certain university revealed that the number of hours spent studying...

A survey among freshmen at a certain university revealed that the number of hours spent studying the week before final exams was approximately normally distributed with mean 25 and standard deviation 7. a. What proportion of students studied more than 20 hours? b. What proportion of students studied less than 16 hours? c. What proportion of the students studied between 25 and 40 hours?

The probability that a student passes the first Biostats test without studying is 0.25. If 10...

The probability that a student passes the first Biostats test without studying is 0.25. If 10 students didn’t study for the test, what is the probability that at least 1 of them passes? The probability that a student passes the first Biostats test without studying is 0.25. If 10 students didn’t study for the test, what is the probability that at most 1 of them passes? Please solve using the binomial distribution

2. (a) Let (a,b,c) denote the result of throwing three dice of colours, amber, blue and...

2. (a) Let (a,b,c) denote the result of throwing three dice of colours, amber, blue and crimson, re- spectively., e.g., (1,5,3) represents throwing amber dice =1, blue dice = 5, crimson dice = 3. What is the probability of throwing these three dice such that the (a, b, c) satisfy the equation b2 − 4ac ≥ 0? (b) From a survey to assess the attitude of students in their study, 80% of them are highly motivated, 90% are hard working,...

Answer the following questions and use Excel to show your work. 50 students in two sections...

Answer the following questions and use Excel to show your work. 50 students in two sections of a college Physics 101 course recently took a mid-term exam. 13 students earned an A, 10 students earned a B, 8 students earned a C, 9 students earned a D, and 10 students earned an F on the exam. The students were queried regarding the number of hours they had devoted to studying for the exam. 12 of the students who earned an...

For each probability and percentile problem, draw the picture. The speed of cars passing through the...

For each probability and percentile problem, draw the picture. The speed of cars passing through the intersection of Blossom Hill Road and the Almaden Expressway varies from 12 to 35 mph and is uniformly distributed. None of the cars travel over 35 mph through the intersection. A) What is the probability that the speed of a car is at most 27 mph? (Enter your answer as a fraction.) B) What is the probability that the speed of a car is...

The following contingency table shows the distribution of grades earned by students taking a midterm exam...

The following contingency table shows the distribution of grades earned by students taking a midterm exam in an MBA​ class, categorized by the number of hours the students spent studying for the exam. Complete parts a. and b. below. Click the icon to view the contingency table. Grade Time spent Studying    A B    C Less than 3 hours    3 18    11 3-5 hours 16 13    7 More than 5 hours 23 14    4 a....