Answer:
Answer at the end!
Explanation:
To solve this problem, we can calculate the expected number of times each color marble would be picked by using probability.
Since there are 5 red marbles and 5 blue marbles, the total number of marbles in the bag is 5 + 5 = 10.
The probability of picking a red marble in one pick is 5/10 = 1/2, as there are 5 red marbles out of the total 10 marbles.
Similarly, the probability of picking a blue marble in one pick is also 5/10 = 1/2, as there are 5 blue marbles out of the total 10 marbles.
Since each pick is independent and the marbles are replaced after each pick, the probability of picking a red or blue marble remains the same for each subsequent pick.
To calculate the expected number of times each color marble would be picked, we multiply the probability of picking that color by the total number of picks (60).
Expected number of times a red marble would be picked:
(1/2) * 60 = 30
Expected number of times a blue marble would be picked:
(1/2) * 60 = 30
Therefore, you would expect each color marble (red and blue) to be picked approximately 30 times after 60 picks, assuming the marbles are replaced after each pick.