xbeatdroperzx
24.11.2019 •
Mathematics
Jacob has a 24 ounce grape juice. he drinks 5 ounces. enter the percentage of ounces jacob has left of his grape juice. round you answer to the nearest hundredth.
Solved
Show answers
More tips
- H Health and Medicine Novomin: What is it and how to use it?...
- P Philosophy Unbelievable stories of encounters with otherworldly forces...
- L Leisure and Entertainment How to Choose the Perfect Gift for Men on February 23rd?...
- H Health and Medicine How to Treat Whooping Cough in Children?...
- H Health and Medicine Simple Ways to Lower Cholesterol in the Blood: Tips and Tricks...
- O Other How to Choose the Best Answer to Your Question on The Grand Question ?...
- L Leisure and Entertainment History of International Women s Day: When Did the Celebration of March 8th Begin?...
- S Style and Beauty Intimate Haircut: The Reasons, Popularity, and Risks...
- A Art and Culture When Will Eurovision 2011 Take Place?...
- S Style and Beauty How to Choose the Perfect Hair Straightener?...
Answers on questions: Mathematics
- M Mathematics What is the perimeter of the larger flag?...
- M Mathematics A package of balloons contains 5 green, 3 yellow, 4 red, and 8 pink balloons. Suppose you reach in the package and choose one balloon at random. What is the probability of...
- M Mathematics Need help please !! thank you :)...
- S Social Studies Culture is dynamic and abrest to change at the point in time, hence the onset of LGBTQ should be accepted in Ghana as started some citizens of the country. Disscuss at least...
- M Mathematics How can you check if drew the right graph 1. by looking at the slope2. looking at the intercepts3. by taking random points on your graph by using this equation 2x+6y=18...
Ответ:
Ответ:
The question is incomplete! Complete question along with answer and step by step explanation is provided below.
Question:
Miguel is a golfer, and he plays on the same course each week. The following table shows the probability distribution for his score on one particular hole, known as the Water Hole.
Score 3 4 5 6 7
Probability 0.15 0.40 0.25 0.15 0.05
Let the random variable X represent Miguel’s score on the Water Hole. In golf, lower scores are better.
(a) Suppose one of Miguel’s scores from the Water Hole is selected at random. What is the probability that Miguel’s score on the Water Hole is at most 5 ? Show your work.
(b) Calculate and interpret the expected value of X . Show your work.
A potential issue with the long hit is that the ball might land in the water, which is not a good outcome. Miguel thinks that if the long hit is successful, his expected value improves to 4.2. However, if the long hit fails and the ball lands in the water, his expected value would be worse and increases to 5.4.
c) Suppose the probability of a successful long hit is 0.4. Which approach, the short hit or long hit, is better in terms of improving the expected value of the score?
(d) Let p represent the probability of a successful long hit. What values of p will make the long hit better than the short hit in terms of improving the expected value of the score? Explain your reasoning.
a) 80%
b) 4.55
c) 4.92
d) P > 0.7083
Step-by-step explanation:
Score | Probability
3 | 0.15
4 | 0.40
5 | 0.25
6 | 0.15
7 | 0.05
Let the random variable X represents Miguel’s score on the Water Hole.
a) What is the probability that Miguel’s score on the Water Hole is at most 5 ?
At most 5 means scores which are equal or less than 5
P(at most 5) = P(X ≤ 5) = P(X = 3) + P(X = 4) + P(X = 5)
P(X ≤ 5) = 0.15 + 0.40 + 0.25
P(X ≤ 5) = 0.80
P(X ≤ 5) = 80%
Therefore, there is 80% chance that Miguel’s score on the Water Hole is at most 5.
(b) Calculate and interpret the expected value of X.
The expected value of random variable X is given by
E(X) = X₃P₃ + X₄P₄ + X₅P₅ + X₆P₆ + X₇P₇
E(X) = 3*0.15 + 4*0.40 + 5*0.25 + 6*0.15 + 7*0.05
E(X) = 0.45 + 1.6 + 1.25 + 0.9 + 0.35
E(X) = 4.55
Therefore, the expected value of 4.55 represents the average score of Miguel.
c) Suppose the probability of a successful long hit is 0.4. Which approach, the short hit or long hit, is better in terms of improving the expected value of the score?
The probability of a successful long hit is given by
P(Successful) = 0.40
The probability of a unsuccessful long hit is given by
P(Unsuccessful) = 1 - P(Successful)
P(Unsuccessful) = 1 - 0.40
P(Unsuccessful) = 0.60
The expected value of successful long hit is given by
E(Successful) = 4.2
The expected value of Unsuccessful long hit is given by
E(Unsuccessful) = 5.4
So, the expected value of long hit is,
E(long hit) = P(Successful)*E(Successful) + P(Unsuccessful)*E(Unsuccessful)
E(long hit) = 0.40*4.2 + 0.60*5.4
E(long hit) = 1.68 + 3.24
E(long hit) = 4.92
Since the expected value of long hit is 4.92 which is greater than the value of short hit obtained in part b that is 4.55, therefore, it is better to go for short hit rather than for long hit. (Note: lower expected score is better)
d) Let p represent the probability of a successful long hit. What values of p will make the long hit better than the short hit in terms of improving the expected value of the score?
The expected value of long hit is given by
E(long hit) = P(Successful)*E(Successful) + P(Unsuccessful)*E(Unsuccessful)
E(long hit) = P*4.2 + (1 - P)*5.4
We want to find the probability P that will make the long hit better than short hit
P*4.2 + (1 - P)*5.4 < 4.55
4.2P + 5.4 - 5.4P < 4.55
-1.2P + 5.4 < 4.55
-1.2P < -0.85
multiply both sides by -1
1.2P > 0.85
P > 0.85/1.2
P > 0.7083
Therefore, the probability of long hit must be greater than 0.7083 that will make the long hit better than the short hit in terms of improving the expected value of the score.