RedPhoenix said:Conditional Probability...
My handout says this...
P(m) = .4
P(w) = .5
P(m|w) = .7
Find:
P(MnW) = ?
P(w|m) = ?
P(m or w) = ?
Now with what I am given... I am just trying to decipher what it says... if P(m) = .4 and P(w) = .5 then shouldn't P(m|w) = .8?
instead of .7?
SW VandeCarr said:P(m|w) is given. You can get P(w|m) from Bayes Theorem:
P(m|w)=P(w|m)P(m)/P(w) so P(m|w)P(w)/P(m) = P(w|m) =(0.7)(0.5)/(0.4)= 0.875
RedPhoenix said:I edited my post right before you posted :).
Now I am trying to figure out P(m or w)
SW VandeCarr said:Do you know how to add probabilities?
RedPhoenix said:I do now, I just figured out I was missing 2 pages in my book... I looked on my online copy of it and found it...
P(A) + P(B) - P(AnB) = .4 + .5 - .35 = .55 correct?
SW VandeCarr said:No..
RedPhoenix said:Lets try this again...
since I have (b) correct I will ignore it
(a) p(MnW) = .4 x .5 = .2
(c) p(MuB) = .4 + .5 - .2 = .7
is this correct?
sorry for not getting this, stats is not my strong point.
SW VandeCarr said:How about arithmetic? Yes this is correct given m in the absence of prior w and w in the absence of prior m but is this realistic? What about your conditional probabilities?
RedPhoenix said:I guess I am entirely confused. The book is making it worse and reading info online is confusing me.
I am getting 2 bits of information regarding (a), which affects (c).
for
1)
P(MnW) = p(M) x p(W) = 0.2
but I also see
2)
P(MnW) = p(M) x p(W|M) = 0.35
P(WnM) = p(w) x p(M|W) = 0.35
So for this case which is it? I don't understand when it use each one...
SW VandeCarr said:OK For P(m or w); since they are conditional on each other we have P(m|w) + P(w|m) - P(m|w)P(w|m) = (0.7)+(0.875)-(.6125)=0.9625
Now do P(m ^ w).
RedPhoenix said:Thank you
This is what I am understanding from the book.
If they are dependent on each other, use this formula
p(m^w) = p(m) x p(w | m)
So...
0.875 x 0.4 = 0.35
or
0.5 x 0.7 = 0.35
Correct?
-------------------
If they were independent of each other, I would multiply them... ie; 0.4 x 0.5 = 0.2, correct?
Interesting... I actually do not see this anywhere in my book, so can you explain why I would be using P(m|w) x P(w|m) instead of P((w|m)^(m)) ?SW VandeCarr said:Regarding P(m^w), your equations are P((w|m)^(m)), etc. For P(m^w), I would use P(m|w) x P(w|m) = (0.875)(0.7)=0.6125.
How would you combine terms of the form P(x)P(x|y), P(x)P(y|x), P(y)P(x|y), P(y)P(y|x)?
RedPhoenix said:Interesting... I actually do not see this anywhere in my book, so can you explain why I would be using P(m|w) x P(w|m) instead of P((w|m)^(m)) ?
RedPhoenix said:Right. I was asked for P(m^w), I think I got it confused reading your question.
so for P(m^w), I would do the P(m|w) x P(w|m) = (0.875)(0.7)=0.6125 for this question.
RedPhoenix said:The question from the text is:
Probability of Mark and Wilma both go riding a bike together.
SW VandeCarr said:Still not clear. P(m),mark rides with or without wilma, P(w), Wilma rides w/wt mark; P(m|w) mark will ride with wilma when is wilma's riding?
RedPhoenix said:Sorry I posted that from my phone, it was not the whole problem.
The probability of Mark riding his bike is 0.4
Probability of Wilma riding her bike is 0.5
The probability of mark riding his bike given that Wilma does is 0.7
Find:
P(M^W) both riding their bikes
P(W|M)
P(M or W) riding their bike
I hope this makes it more clear. Thank you :)
RedPhoenix said::) Thank you for going over this problem with me. It makes a lot more sense... I think I will have another one or two tomorrow... Test at the end of this week.
RedPhoenix said::) Thank you for going over this problem with me. It makes a lot more sense... I think I will have another one or two tomorrow... Test at the end of this week.
Yes, there are a few ways to check your handout for accuracy. First, you can double check the formulas and calculations you have used to make sure they are correct. You can also ask a colleague or mentor to review your handout and provide feedback. Additionally, you can use online resources or textbooks to compare your handout to established information on conditional probability.
One way to ensure your understanding of conditional probability is correct is to practice solving problems and checking your answers. You can also explain the concept to someone else to see if you can effectively convey the information. Additionally, seeking feedback from a teacher or tutor can help confirm your understanding.
Some common mistakes to avoid when working with conditional probability include misunderstanding the given information, mixing up the order of events, and forgetting to account for all possible outcomes. It is also important to be careful when using conditional probability formulas and make sure to properly calculate probabilities and use correct notation.
One way to improve your understanding and application of conditional probability is to practice solving different types of problems. You can also seek out additional resources, such as textbooks or online tutorials, to supplement your learning. Additionally, discussing the concept with others and seeking feedback can help solidify your understanding.
Conditional probability has many real-life applications, including predicting weather patterns, analyzing medical test results, and evaluating the success of marketing strategies. It is also commonly used in fields such as finance, genetics, and engineering. Understanding conditional probability can help in making informed decisions and solving complex problems in various industries.