Respuesta :
Answer:
The probability that an athlete chosen is either a football player or a basketball player is 56%.
Step-by-step explanation:
Let the athletes which are Football player be 'A'
Let the athletes which are Basket ball player be 'B'
Given:
Football players (A) = 13%
Basketball players (B) = 52%
Both football and basket ball players = 9%
We need to find probability that an athlete chosen is either a football player or a basketball player.
Solution:
The probability that athlete is a football player = [tex]P(A)= \frac{13}{100}=0.13[/tex]
The probability that athlete is a basketball player = [tex]P(B)= \frac{52}{100}=0.52[/tex]
The probability that athlete is both basket ball player and football player = [tex]P(A\cap B) = \frac{9}{100}=0.09[/tex]
We have to find the probability that an athlete chosen is either a football player or a basketball player [tex]P(A\cup B)[/tex].
Now we know that;
[tex]P(A\cup B)= P(A) + P(B) - P(A \cap B)\\\\P(A\cup B) = 0.13+0.52-0.09=0.56\\\\P(A\cup B) = \frac{0.56}{100}=56\%[/tex]
Hence The probability that an athlete chosen is either a football player or a basketball player is 56%.
