# Probability of a sample space [closed]

I have been doing an exam review for my class where the questions are from a database but no solutions are given. I'm kind of confused as to what the answer to this would be

```> Consider a sample space S={a,b,c,d} and a probability function Pr: S->|R on S. Events: A={a}, B={a,b}, C={a,b,c}, D={b,d}```

You are given Pr(A)=1/10, Pr(B)=1/2, and Pr(C)=7/10 What is Pr(D)? Show your work.

I thought Pr(D)=1-(Pr(A) + Pr(B) + Pr(C)) but those three probabilities equal to more than 1. I tried looking at the superset of S but I still couldn't find the answer.

What is the answer and why?

-

## closed as off-topic by timrau, DSM, Noel, Merlevede, Lee TaylorMar 10 '14 at 4:08

• This question does not appear to be about programming within the scope defined in the help center.
If this question can be reworded to fit the rules in the help center, please edit the question.

This question appears to be off-topic because it is about math – timrau Mar 10 '14 at 2:52

The answer is `P(D) = 7/10`

To find this, look at how the samples are combined in the brackets to create events, and note that `a+b+c+d=1`, the lowercase letters not the uppercase ones. So from each of the given events we find

``````1/10 = a
5/10 = 1/10 + b => b = 4/10
7/10 = 1/10 + 4/10 + c =>  c = 2/10
P(D) = 4/10 + d
``````

Since

``````a + b + c + d = 1
d = 1 - a + b + c = 1 - (1/10 + 4/10 + 2/10) = 1 - 7/10 = 3/10
``````

So

``````P(D) = 4/10 + 3/10 = 7/10
``````
-
Ah, okay, that makes a lot of sense now. Thanks! – Roman Mar 10 '14 at 3:09