Answer: The probability that an orange marble will not be selected after the two attempts is 9/16
Step-by-step explanation:
The total quantity of items in the box =
5blue + 4red + 3orange
= 12 items altogether
The probability of picking up a blue marble = the number of blue marbles/total number of marbles
= 5/12
The probability of picking up a red marble =
The number of red marbles in the box/the total number of marbles
= 4/12
The probability of picking an orange marble = The number of orange marbles in the box/the total number of marbles
= 3/12
Then if two balls are selected at random with replacement, the probability that an orange will not be picked = p(blue,red) + p(red,blue) + p(blue,blue) + p(red,red)
p(blue,red) = 5/12 × 4/12 = 5/36
p(red,blue) = 4/12 × 5/12 = 5/36
p(blue,blue) = 5/12 × 5/12 = 25/144
p(red,red) = 4/12 × 4/12 = 16/144 = 1/9
We then add up these separate probabilities:
5/36 + 5/36 + 25/144 + 1/9 = 9/16
ALTERNATIVELY,
Since the probability of selecting an orange marble is 3/12 and the joint probability of picking other marbles is 9/12, then the probability that an orange marble will not be picked after 2 attempts with REPLACEMENT =
P(other marbles) =
9/12 × 9/12
= 9/16
Therefore if the selection is done WITH REPLACEMENT, the probability that an orange marble will not be selected after the two attempts is 9/16
