Statement 1: The probability of drawing either an ace or a king from a pack of card in a single draw is 2/13. Statement 2: for two events `Aa n dB` which are not mutually exclusive, `P(AuuB)=P(A)+P(B)-P(AnnB)dot`

Find the probability of drawing either an ace or a king from a pack of card in a single draw.

The following questions consist of two statements, one labelled as the 'Assertion (A)' and the other as 'Reason (R)'. You are to examine these two statements carefully and select the answer. Assertion (A) : The probability of drawing either an ace or a king from a deck of card in a single draw is 2/13 . Reason (R) : For two events E_(1) and E_(2) , which are not mutually exclusive probability is given by P(E_(1) + E_(2)) = P(E_(1)) + P(E_(2)) - P(E_(1) nn E_(2))

If A and B are mutually exclusive events,then P(AuuB)=

Statement-1: the probability of drawing either a king or an ace from a pack of 52 playing cards is 2//13 . Statement-2: For any two events A and B, P ( A cup B)=P (A)+P(B)-P(A cap B)

If A and B are mutually exclusive events,then P(AuuB)= ……………..

Show that for two non-mutually exclusive events A and B,P(A uu B)=P(A)+P(B)-P(A nn B)

If A and B are two mutually exclusive events,then, P(A)+P(B)= .

If event A and B are mutually exclusive and exhaustive events and P(A)=(1)/(3 )P(B) then Find P (A)

Given P(A)=2/5 and P(B)=1/5 find P(A or B) if A and B are mutually exclusive events.

Two events A and B will be independent,if (A) A and B are mutually exclusive (B) P(A'B')=[1-P(A)][1-P(B)] (C) P(A)=P(B)P(A)+P(B)=1