In a certain lottery, five different numbers between 1 and 30 inclusive are drawn. These are the

winning numbers. To win the lottery, a person must select the correct 5 numbers in the same order
in which they were drawn. What is the probability of winning?

To calculate the probability of winning the lottery, we need to know two things: the total number of possible outcomes and the number of successful outcomes.

The total number of possible outcomes is determined by the range of numbers between 1 and 30 inclusive, and the number of numbers drawn, which is 5.

To find the total number of possible outcomes, we can use the formula for combinations, which is denoted by "C(n, r)" or "nCr", where "n" is the total number of items and "r" is the number of items chosen at a time. In this case, we have 30 numbers to choose from and we are drawing 5 numbers, so the formula becomes:

Total number of possible outcomes = C(30, 5) = 30! / (5! * (30-5)!) = 142,506

Now, we need to determine the number of successful outcomes, which is only 1 because there is only one winning combination.

Therefore, the probability of winning the lottery is:

Probability of winning = Number of successful outcomes / Total number of possible outcomes = 1 / 142,506 ≈ 0.000007

So the probability of winning is approximately 0.000007 or 1 in 142,506.

1/30*1/29*1/28*1/27*1/26

Can someone help me to get d formular of this game?Megasena brazil.1st wk,5,19,32,41,49,58.2nd wk,6,13,24,32,40,51 and third wk,1,19,28,33,39,41.thanks.

142,506