Respuesta :
Answer:
38% probability that a randomly selected student is female or a physics major.
Step-by-step explanation:
A probability is the number of desired outcomes divided by the number of total outcomes.
Desired outcomes:
Physics majors or female
10 physics majors(of which 3 are female).
12 female(the 3 female physics majors have already been counted, so we count 9)
[tex]D = 10 + 9 = 19[/tex]
Total outcomes:
50 students, so [tex]T = 50[/tex]
Probability
[tex]p = \frac{D}{T} = \frac{19}{50} = 0.38[/tex]
38% probability that a randomly selected student is female or a physics major.
Answer:
[tex] P(F) = \frac{12}{50}[/tex]
[tex] P(P)= \frac{10}{50}[/tex]
[tex] P(P \cap F) = \frac{3}{50}[/tex]
And we are interested on this probbaility:
[tex] P(F \cup P)[/tex]
And we can use the total rule of probability and we got:
[tex] P(F \cup P) =P(F) -P(P) -P(F \cap P)= \frac{12}{50} +\frac{10}{50} -\frac{3}{50} = \frac{19}{50}[/tex]
Step-by-step explanation:
For this case we know that the total sample is n =50
10 students are physics majors
12 students are female.
Of the physics majors, three are female
So we can define the following events:
P = the person selected is a physics mayor
F= the person selected is female
And we can calculate the following probabilities:
[tex] P(F) = \frac{12}{50}[/tex]
[tex] P(P)= \frac{10}{50}[/tex]
[tex] P(P \cap F) = \frac{3}{50}[/tex]
And we are interested on this probbaility:
[tex] P(F \cup P)[/tex]
And we can use the total rule of probability and we got:
[tex] P(F \cup P) =P(F) -P(P) -P(F \cap P)= \frac{12}{50} +\frac{10}{50} -\frac{3}{50} = \frac{19}{50}[/tex]
