Question
There is a checkbox at the bottom of the exam form that you MusT check prior to submitting this exam. Failure to do so may cause your work to be lost.
Question 1, multiple Choice Worth 2 points)
(05.04 MC)
Carson dives to school the same way each day and there are two independent traffic lights on his trip to school. He knows that there is a
the first light and an so% chance that he will have to stop at the second light. What is the probability that he will not have to stop at either light?
| There is a checkbox at the bottom of the exam form that you MusT check prior to submitting this exam. Failure to do so may cause your work to be lost. |
| Question 1, multiple Choice Worth 2 points) |
| (05.04 MC) |
| Carson dives to school the same way each day and there are two independent traffic lights on his trip to school. He knows that there is a
|
| the first light and an so% chance that he will have to stop at the second light. What is the probability that he will not have to stop at either light? |
|
|
|
|
|
|
Ask by Delgado Parry. in the United States
Mar 25,2025
Upstudy AI Solution
Tutor-Verified Answer
Answer
The probability that Carson will not have to stop at either light is
Solution
Sign in to Unlock Answers for Free!
A Learning Platform Trusted by Millions of Real Students and Teachers.
Unlock Answered by UpStudy AI and reviewed by a Professional Tutor
Like
Beyond the Answer
To find the probability that Carson will not have to stop at either traffic light, we first need to determine the probabilities of him not stopping at each light. The probability of stopping at the first light is
Now, since the events (not stopping at the first light and not stopping at the second light) are independent, we can find the combined probability by multiplying the two probabilities:
Thus, the probability that Carson will not have to stop at either light is
So the answer isn’t provided in the options, since it should be
