Question
We looked at the popular casino game keno, in which a player chooses numbers from 1 to 80 and hopes that the casino will draw balls with the same numbers.
A player can choose only 1 number or as many as 20. The casino will then pick 20 numbered balls from the 80 possible; if enough of the player's numbers match the lucky numbers the casino chooses, the player wins money. The amount won varies according to how many numbers were chosen and how many match.
Watch the video below then answer the question.
Keno Revisited
If 20 numbers are chosen, find the probability of matching at least 1 lucky number. (Round your answer to one decimal place.)
Answers
The probability of not matching any lucky numbers out of 20 is $\frac{60}{80} \times \frac{59}{79} \times \frac{58}{78} \times \cdots \times \frac{42}{62}$. Therefore, the probability of matching at least 1 lucky number is $1-$ (probability of not matching any lucky numbers) = $1-\left(\frac{60}{80} \times \frac{59}{79} \times \frac{58}{78} \times \cdots \times \frac{42}{62}\right) \approx \boxed{95.9\%}$.
Related Questions
Keno is a casino game in which the player has a card with the numbers 1 through 80 on it. The player...
a certain state's lottery game, lotto, is set up so that each player pays $1 per ticket and chooses...
Game Theory: Consider a game in which each of two people simultaneously chooses an integer: 1 or 2....