Probability question at least one without replacement.

Question

Title says it all, it’s a bit confusing to understand.

A bag contains 13 marbles 6 red, 3 yellow, and 4 green. If 3 marbles are chosen at random (without replacement) then what is the probability that at least one of them is yellow.

This is what I got. 1-(3/13)(2/12)(1/11).

I know that at least one is 1-p. Since it’s asking if 3 are chosen at random without replacement then what’s the probability of 3 yellow, I figured if you picked up a marble out of a bag for the first time your chance of getting a yellow marble would be 3/13 since there’s no replacement it would decrease the second time and the third. So the first chance would be 3/13 the second would be 2/12 and the third would be 1/11

Answer 1

HINT

1. Find the probability that none are yellow.
2. Remember that if $A$ is any event, then $\mathbb{P}[A] = 1-\mathbb{P}[\bar{A}]$

UPDATE

1. The first time you grab a yellow ball with a chance of 3/13. You want the negation of this, so the chance of that is $1-3/13 = 10/30$.
2. The second time, you grab a yellow (assuming first time you did not) with a chance 3/12. Third time it will be 3/11.
3. You want to draw yellow in neither of the tries, the probability of that is $$ \left[1 - \frac{3}{13}\right] \times \left[1 - \frac{3}{12}\right] \times \left[1 - \frac{3}{11}\right] = \frac{10 \cdot 9 \cdot 8}{13 \cdot 12 \cdot 11} = \frac{60}{143} $$
4. Finally you want the probability that any draw results in a yellow, which is $$1 - \frac{60}{143} = \frac{83}{143} \approx 58\%.$$