A balanced coin is tossed three times in succession. Let A denote the event of getting 'head' in the first toss and B the event of getting 'tail' in the second toss. Prove that the events A and B are independent.

Three coins are tossed simultaneously : (i) P is the event of getting at least two heads. (ii) Q is the event of getting a tail on the second coin.

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

A coin is tossed three times, if head occurs on first two tosses, find the probability of getting head on third toss.

Suppose that a coin is tossed three times. Let A be "getting three heads" and B be the event of "getting a head on the first toss".Show that A and B are dependent events.

A coin is tossed three times is 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) = ………

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 xx,if head occurs on first two tosses,find the probability of getting head on third toss.

A coin is tossed twice and all 4 outcomes are equally likely .Let A be the event that first throw results in a head and B be the event that second throw results in a tail , then show that the events A and B are independent .

A coin is tossed three xx 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 find P(E/F)