Answer:
[tex]P(S/I)=0.375[/tex]
Step-by-step explanation:
Let's start defining the conditional probability of an event :
Given two events A and B :
[tex]P(A/B)=\frac{P(A,B)}{P(B)}[/tex]
with P(B) > 0
Where P(A/B) is the probability of event A given that event B occur
P(A,B) is the probability of the event in which A and B occur both at the same time.
Let's write the events for our exercise
S : ''A random student speaks Spanish''
I : ''A random student speaks Italian''
[tex]P(S)=0.23\\P(I)=0.08\\P(S,I)=0.03[/tex]
Applying the conditional equation we obtain :
[tex]P(S/I)=\frac{P(S,I)}{P(I)}=\frac{0.03}{0.08}=0.375[/tex]
Then, 0.375 is the probability that we are looking for
