The probability of Jason drawing an even tile from the first bag is 3/6 (since there are 3 even tiles out of 6). The probability of Jason drawing an even tile from the second bag is also 3/6.
Therefore, the probability of Jason drawing an even tile from the first bag and an even tile from the second bag is (3/6) * (3/6) = 9/36 = 1/4.
So, the correct answer is 9 over 36.
Jason has two bags with 6 tiles each. The tiles in each bag are shown below:
Six squares are numbered sequentially from 1 to 6.
Without looking, Jason draws a tile from the first bag and then a tile from the second bag. What is the probability of Jason drawing an even tile from the first bag and an even tile from the second bag?6 over 12
9 over 12
6 over 36
9 over 36
1 answer
1 answer