A box contains 7 red balls 8 white ball & 3 blue ball if three ball are drawn at random from the box without replacement calculate the probability that

A) The probability of drawing two red balls and one blue ball can be found by multiplying the probabilities of each event happening in order.

First, the probability of drawing a red ball on the first draw is 7/18 (since there are 7 red balls out of 18 total).

Next, the probability of drawing another red ball on the second draw (since we're drawing without replacement) is 6/17 (since there will now be 6 red balls left out of 17 total balls remaining).

Finally, the probability of drawing a blue ball on the third draw is 3/16 (since there will be 3 blue balls left out of 16 total balls remaining).

Multiplying these probabilities together gives:

(7/18) * (6/17) * (3/16) = 0.024

So the probability of drawing two red balls and one blue ball is 0.024.

B) The probability of drawing at least two white balls can be found by calculating the probability of drawing two white balls and the probability of drawing three white balls, and adding them together.

The probability of drawing two white balls can be found similarly to part A:

First, the probability of drawing a white ball on the first draw is 8/18 (since there are 8 white balls out of 18 total).

Next, the probability of drawing another white ball on the second draw (since we're drawing without replacement) is 7/17 (since there will now be 7 white balls left out of 17 total balls remaining).

Finally, the probability of drawing a non-white ball on the third draw is 10/16 (since there will be 10 non-white balls left out of 16 total balls remaining).

Multiplying these probabilities together gives:

(8/18) * (7/17) * (10/16) = 0.159

So the probability of drawing two white balls is 0.159.

To find the probability of drawing three white balls, we can simply multiply the probabilities of drawing a white ball on all three draws (again, without replacement):

(8/18) * (7/17) * (6/16) = 0.091

So the probability of drawing three white balls is 0.091.

Adding these two probabilities together gives:

0.159 + 0.091 = 0.25

So the probability of drawing at least two white balls is 0.25.

C) The probability of drawing one ball of each color can be found by multiplying the probabilities of drawing one ball of each color in order.

First, the probability of drawing a red ball on the first draw is 7/18 (since there are 7 red balls out of 18 total).

Next, the probability of drawing a white ball on the second draw (since we're drawing without replacement) is 8/17 (since there will be 8 white balls left out of 17 total balls remaining).

Finally, the probability of drawing a blue ball on the third draw is 3/16 (since there will be 3 blue balls left out of 16 total balls remaining).

Multiplying these probabilities together gives:

(7/18) * (8/17) * (3/16) = 0.038

So the probability of drawing one ball of each color is 0.038.