Equally Likely Events

Experimental (Or Empirical) Probabilities|Probability - A Theoretical Approach|Random Experiment|Equally Likely Out-Comes|Not Equally Likely Out-Comes|Questions|Event|Question|OMR

Experimental (Or Empirical) Probabilities|Probability - A Theoretical Approach|Random Experiment|Equally Likely Out-Comes|Not Equally Likely Out-Comes|Questions|Event|Question|OMR

OMR|Equally Likely Outcomes|Probabilities Of Equally Likely Outcomes |Probability Of An Event |Probability Of The Event 'A or B'|Probability Of Event 'Not A'|Some Important Results |Questions

OMR|Equally Likely Outcomes|Probabilities Of Equally Likely Outcomes |Probability Of An Event |Probability Of The Event 'A or B'|Probability Of Event 'Not A'|Some Important Results |Questions

OMR|Equally Likely Outcomes|Probabilities Of Equally Likely Outcomes |Probability Of An Event |Probability Of The Event 'A or B'|Probability Of Event 'Not A'|Some Important Results |Questions

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 .

Let A and B be two events such that p( bar AuuB)=1/6, p(AnnB)=1/4 and p( bar A)=1/4 , where bar A stands for the complement of the event A. Then the events A and B are (1) mutually exclusive and independent (2) equally likely but not independent (3) independent but not equally likely (4) independent and equally likely

An experiment has 10 equally likely outcomes. Let A and B be two non-empty events of the experiment. If a consists of 4 outcomes, the number of outcomes that B must have so that A and B are independent , is