What additional statement, added to the three below, forms a probability distribution?
(1) I missed only my first class today
(2) I missed only my second class today
(3) I missed both my first and second class today
I missed all my classes today
I missed no classes today
I missed either my first or my second class today but not both
I did not miss my first or second class today
Answers
Answered by
20
Answer:
[tex]\boxed{I/missed/either/my/first/or/my/second/class/today/but/not/both}[\tex]
Step-by-step explanation:
[tex]<marquee>Mark it Brainliest<marquee>[\tex]
Answered by
3
Answer:
we should have all probabalities, and as it is obvious we have (1)i missed only my first class today and i go to the 2nd one + (2) I missed only my second class today and I went to the 1st one+ (3) I missed both my first and second class today so the last one will be the situation that I went to the both
Step-by-step explanation:
so the correct answer I did not miss my first and second class today
:)
Similar questions