00:01
In this problem, we have given a table, let me show you, and we have given the joint probability distribution of two random variable, which is random variable x and y.
00:14
And now, we have to find that probability of x is greater than 1 and y is greater than 0.
00:22
Then also we have to find some other terms like probability that x is greater than or equals to 5, and then also probability of the probability of the number.
00:32
Of x is greater than 1.
00:35
So here we can see, here we have the value, say, this would be probability that x is greater than 1 and y is also greater than 0.
00:49
This would be, say, probability that, say, x is equals to, say, here we have x is greater than 1, so this would be 1, 3 and 4, so here we have to counter for these values 3 and 4, so, x may be equals to 3 and y could be equals to 2 and also other possibilities, probability that x is equals to 4 and y is equals to 2.
01:13
So here, probability that x is equal to 3 and y is equals to 2.
01:19
So here we have 0 ,0, so this would be 0 .00 plus, probability that x is equals to 4 and y is equals to 2.
01:28
So this is again 0 .0.
01:30
So, 0 .00 is equal to, see, this would be probability that x is greater than 1 and y is greater than 0 is equal to 0 .00...