A coin is tossed three times.
Event A : two head comes
Event B : last should be head
Then A and Bare

A coin is tossed three times. Event A: two heads appear Event B: last should be head Then identify whether events A and B are independent or not.

A coin is tossed three times . What is the probability of getting no tail ?

A coin is tossed three times in succession. If E is the event that there are at least two heads and F is the event in which first throw is a head, then P(E/F) is equal to:

A coin is tossed three times. If X denotes the absolute difference between the number of heads and the number of tails, then P(X=1)=

A fair coin is tossed three times . The probability that there is atleast one tail is

A coin is tossed successively three times. The probability of getting exactly one heads or 2 heads is

Write sample space 'S' and number of sample point 'n(S)' for the following experiment. Also write events A,B,C in the set form and write n(A), n(B), n(C): One coin and one die are thrown simultaneously. Event A: To get head and an odd number. Event B: To get a head or tail and an even number. Event C: Number on the upper face is greater than 7 and tail on the coin.

Write the sample space S, and number of sample points n(s) for each of the following experiments. Also, write events A,B,C in the set from and write n(A),n(B),n(C): One coin and one die are thrown simultaneously. Event A : To get a head and an odd number. Event B: To get a head or a tail and an even number. Event C : Number on the upper face is greater than 7 and tail on the coin.

A coin is tossed twice. If events A and B are defined as: A = head on first toss, B =head on second toss. Then the probability of A nn B =

A coin is tossed twice. If event A and B are defined as: A = head on first toss, B = head on second toss. Then the probability of A uu B =