Respuesta :
Answer:
The indicated probability of [tex]P(D \cup F')=\frac{25}{26}[/tex]
Step-by-step explanation:
Probability of an event E to be;
P(E) = [tex]\frac{Number of events within E}{Total number of possible outcomes}[/tex]
As per the given condition:
Total number of possible outcomes = 52 cards.
Let the event be D and F as follows;
D : Drawn card is a black card
F : Drawn card is a 10 card.
Then,
From the given condition:
P(D) = [tex]\frac{26}{52}[/tex] [Out of 52 cards, 26 were black] ,
P(F) = [tex]\frac{4}{52}[/tex] [Out of 52 cards, there are four 10 cards]
For any two events A and B we always have;
[tex]P(A \cup B) = P(A)+P(B)-P(A \cap B)[/tex]
Now, we have to find the indicated probability:
[tex]P(D \cup F')=P(D)+P(F')-P(D \cap F')[/tex] ......[1]
First find the P(F');
P(F') =1-P(F) = [tex]1-\frac{4}{52} =\frac{52-4}{52} =\frac{48}{52}[/tex]
Also, to find [tex]P(D \cap F')[/tex].
We use the formula :
For any event A and B independent variable.
[tex]P(A \cap B) =P(A) \cdot P(B)[/tex]
then;
[tex]P(D \cap F') =P(D) \cdot P(F') = \frac{26}{52} \cdot \frac{48}{52} =\frac{24}{52}[/tex]
Now, substitute these in [1];
[tex]P(D \cup F')=\frac{26}{52} +\frac{48}{52} -\frac{24}{52}[/tex]=[tex]\frac{26+48-24}{52} =\frac{50}{52} = \frac{25}{26}[/tex]
Therefore, the probability of [tex]P(D \cup F')=\frac{25}{26}[/tex]
