If n(A) = 2, P(A) = .!. then n(S) = ?
Question
If n(A) = 2, P(A) = .!. then n(S) = ?
Solution
The question seems to be about probability. However, there seems to be a typo in the probability of A (P(A)) as ".!." is not a valid value.
Assuming you meant P(A) = 0.1, here's how you can find n(S):
-
The probability of an event A is given by P(A) = n(A) / n(S), where n(A) is the number of outcomes in event A and n(S) is the total number of outcomes in the sample space S.
-
You can rearrange this formula to solve for n(S): n(S) = n(A) / P(A)
-
Substituting the given values into this formula gives: n(S) = 2 / 0.1 = 20
So, if n(A) = 2 and P(A) = 0.1, then n(S) = 20.
Similar Questions
If A= {1} Find n(P(P(A)))
In a sample space S, if P(a) = 0, then A is independent of any other event
Which one of the following cannot be the value of P(A)?*2 points101.80.6
Let Ω be the sample space and A⊆Ω be an event. Given below are two statements:(S1): If P(A)=0, then A=ϕ(S2): If P(A)=1, then A=ΩThenonly (S1) is trueonly (S2) is trueboth (S1) and (S2) are trueboth (S1) and (S2) are false
Fill in the blank. A(n) __________ is the collection of all the simple events for an experiment.
Upgrade your grade with Knowee
Get personalized homework help. Review tough concepts in more detail, or go deeper into your topic by exploring other relevant questions.