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Determine the sample space for an experiment if a coin is selected from a bag three times. There are three coins in the bag: a nickel (N), a quarter (Q), and a dime (D). Each time a coin is selected, it is replaced before selecting the next coin.(1 point) Responses NNN, NNQ, NND, NQN, NQD, NQQ, NDN, NDQ, NDD, QQQ, QQD, QQN, QDQ, QDN, QDD, QNQ, QND, QNN NNN, NNQ, NND, NQN, NQD, NQQ, NDN, NDQ, NDD, QQQ, QQD, QQN, QDQ, QDN, QDD, QNQ, QND, QNN NNN, NNQ, NND, NQN, NQD, NQQ, NDN, NDQ, NDD, DDD, DDQ, DDN, DQD, DQN, DQQ, DND, DNQ, DNN, QQQ, QQD, QQN, QDQ, QDN, QDD, QNQ, QND, QNN NNN, NNQ, NND, NQN, NQD, NQQ, NDN, NDQ, NDD, DDD, DDQ, DDN, DQD, DQN, DQQ, DND, DNQ, DNN, QQQ, QQD, QQN, QDQ, QDN, QDD, QNQ, QND, QNN NNN, NNQ, NND, NQN, NQD, NQQ, NDN, NDQ, NDD, NNN, DDQ, DDN, DQD, DQN, DQQ, DND, DNQ, DNN, DDD, QQD, QQN, QDQ, QDN, QDD, QNQ, QND, QNN NNN, NNQ, NND, NQN, NQD, NQQ, NDN, NDQ, NDD, NNN, DDQ, DDN, DQD, DQN, DQQ, DND, DNQ, DNN, DDD, QQD, QQN, QDQ, QDN, QDD, QNQ, QND, QNN NNN, NNQ, NND, NQN, NQD, NQQ, NDN, NDQ, NDD, DDD, DDQ, DDN, DQD, DQN, DQQ, DND, DNQ, DNN
![Bot GPT 3.5](/images/users/4310/128x128.jpeg)
The correct sample space for the experiment if a coin is selected from a bag three times (with replacement) is:
NNN, NNQ, NND, NQN, NQD, NQQ, NDN, NDQ, NDD, DDD, DDQ, DDN, DQD, DQN, DQQ, DND, DNQ, DNN, QQQ, QQD, QQN, QDQ, QDN, QDD, QNQ, QND, QNN
![Y/N](/images/users/0/1/128x128.jpeg)
Leah is playing a board game and needs to roll a 6 on a number cube two times in a row in order to win. What is the probability this will happen if sheβs using a normal six-sided number cube?(1 point) Responses 136 Start Fraction 1 over 36 End Fraction 16 Start Fraction 1 over 6 End Fraction 12 Start Fraction 1 over 2 End Fraction 13
![Bot GPT 3.5](/images/users/4310/128x128.jpeg)
The probability of rolling a 6 on a number cube is 1/6. Since Leah needs to roll a 6 two times in a row, we multiply the probabilities together:
(1/6) * (1/6) = 1/36
Therefore, the probability of Leah rolling a 6 on a number cube two times in a row is 1/36.
The correct response is: Start Fraction 1 over 36 End Fraction