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

Let A and B be two non empty subsets of set X such that A is not a subset of B, then:

if A and B be two events such that P(A)=1/4, P(B)=1/3 and P(AuuB)=1/2, show that A and B are independent events.

If A and B be two events such that P(A)=1//4, P(B)=1//3 and P(AuuB)=1//2 show that A and B are independent events.

Let A, B be two non empty subsets of a set P . If (A-B)uu(B-A) = AuuB then which of the following is correct ( X is universal set)

For a loaded die, the probabilities of outcomes are given as under: P(1)=P(2)=2/(10),P(3)=P(5)=P(6)=1/(10)a n dP(4)=3/(10) The die is thrown two times. Let A and B be the events as defined below A=Getting same number each time, B=Getting a total score of 10 or more. Determine whether or not A and B are independent events.

In the two dice experiment, if A is the event of getting the sum of the numbers on dice as 11 and B is the event of getting a number other that 5 on the first die, find P(A and B) Are A and B independent events? OR Two dice are tossed. Find whether the following two events A and B are independent: A={(x , y): x+y=11},B={(x , y): x!=5},w h e r e(x , y) denote a typical sample point.

A and B are two mutually exclusive events of an experiment: If P(not A) = 0.65, P(A cup B) = 0.65 and P(B) = p, then the value of p is

A and B are two mutually exclusive events of an experiment. If P(A)=0. 35 ,P(AuuB)=0. 65a n dP(B)=p , find the value of pdot

List the outcomes you can see in these experiments.(a) Spinning a wheel(b) Tossing two coins together

Two dice are thrown together. Let A be the event getting 6 on the first die and B the event getting 2 on the second die. Are the events A and B independent?