If `E_(1)` and `E_(2)` be two events such that `P(E_(1))=0.3, P(E_(2))=0.2` and `P(E_(1)nnE_(2))=0.1,` then find:
(i) `P(barE_(1)nnE_(2))` (ii) `P(E_(1)nnbarE_(2))`

If E_(1) and E_(2) are two events such that P(E_(1)) = 0.5, P(E_(2)) = 0.3 and P(E_(1) and E_(2)) = 0.1 , find (i) P(E_(1) " or " E_(2)) (ii) P(E_(1) " but not " E_(2)) (iii) P(E_(2) " but not " E_(1)) (iv) P(" neither " E_(1) " nor " E_(2))

If E_(1) and E_(2) are two events such that P(E_(1))=1//4 , P(E_(2)//E_(1))=1//2 and P(E_(1)//E_(2))=1//4 , then

If E_(1) and E_(2) are independent events such that P(E_(1))=0.3 and P(E_(2))=0.4 , find (i) P(E_(1) nn E_(2)) (ii) P(E_(1) uu E_(2)) (iii) P(bar(E_(1))nn bar(E_(2))) (iv) P(bar(E_(1)) nn E_(2)) .

If E_(1) nad E_(2) are two independent events such that P(E_(1))=0.3 and P(E_(2))=0.6 then find the value of (i)P(E_(1)nn E_(2)) (ii) P(E_(1)uu E_(2)) (iii) P((E_(1))/(E_(2)))( iv )P((E_(2))/(E_(1)))

Let E_(1) and E_(2) are the two independent events such that P(E_(1))=0.35 and P(E_(1) uu E_(2))=0.60 , find P(E_(2)) .

if E_(1) and E_(2) are two events such that P(E_(1))=(1)/(4),P((E_(2))/(E_(1)))=(1)/(2) and P=((E_(1))/(E_(2)))=(1)/(4)

If E_(1) and E_(2), are two events such that P(E_(1))=(1)/(4),P(E_(2))=(1)/(4)*(a) then E_(1) and E_(2), are independent

If E_(1) and E_(2) are the two events such that P(E_(1))=1/4, P(E_(2))=1/3 and P(E_(1) uu E_(2))=1/2 , show that E_(1) and E_(2) are independent events.

Let E_(1) and E_(2) be the events such that P(E_(1))=1/3 and P(E_(2))=3/5 . Find : (i) P(E_(1)uuE_(2)) , where E_(1) and E_(2) are mutually ecclusive, (ii) P(E_(1) nn E_(2)) , when E_(1) and E_(2) are independent.

Let E_(1) and E_(2) be two events such that P(E_(1))=0.3, P(E_(1) uu E_(2))=0.4 and P(E_(2))=x . Find the value of x such that (i) E_(1) and E_(2) are mutually exclusive, (ii) E_(1) and E_(2) are independent.