Respuesta :
Answer:
0,37
Step-by-step explanation:
It will be easier if we noun the events.
A= Cindi's friend comes to England.
B= New England is mostly cloudly.
We are searching the probability of just A doesn´t happen or just A happens but not B.
The probability of A doesn´t happen is one minus the probability of A:
[tex]=(A^{|} )=1-P(A)=1-0.7=0.3[/tex]
The events A and B are independent for this reason the probability than both occurs is the product of the probability of each event. It means:
[tex]P(A \cap B)= P(A)P(B)=0.1*0.7=0.07[/tex]
The probability of A doesn´t happen or A and B happen is:
[tex]P(A^{|} \cup (A \cap B))= P(A^{|} )+P (A \cap B)-P(A^{|} \cap A\cap B)=0.3+0.07-0=0.37[/tex]
Conclusively we have to rest the probability of A doesn´t happen and A and B happen, but A happens and doesn´t happen and the same time is impossible. For this reason, we have the same result.
[tex]P(A^{|} \cup (A \cap B))-P(A^{|} \cap A\cap B)=0.37-0=0.38[/tex]
Then the probability either Cindi's friend does not come to New England, or she does come but it is mostly cloudy is 0.37
