Question
What are your odds of getting at least one job interview if you submit 1-10 applications?
A.
34.1%
B.
46.2%
C.
61.7%
A.
34.1%
B.
46.2%
C.
61.7%
Answers
GPT-4o mini
To determine the odds of getting at least one job interview when submitting multiple applications, we need to know the probability of not getting an interview from each application. However, since you didn't provide that probability, I cannot compute the exact answer.
Typically, if you know the probability \( p \) of getting an interview from any one application, the probability of not getting an interview from one application is \( (1 - p) \). If you submit \( n \) applications, the probability of not getting an interview from any of them is \( (1 - p)^n \). Therefore, the probability of getting at least one interview is:
\[
P(\text{at least one interview}) = 1 - (1 - p)^n
\]
If you have a specific probability \( p \) in mind, you can substitute it in for different values of \( n \) (1 to 10) to see which answer (A, B, or C) matches your results.
If you can provide the probability of getting an interview from a single application, I can assist in calculating the probabilities for you.
Typically, if you know the probability \( p \) of getting an interview from any one application, the probability of not getting an interview from one application is \( (1 - p) \). If you submit \( n \) applications, the probability of not getting an interview from any of them is \( (1 - p)^n \). Therefore, the probability of getting at least one interview is:
\[
P(\text{at least one interview}) = 1 - (1 - p)^n
\]
If you have a specific probability \( p \) in mind, you can substitute it in for different values of \( n \) (1 to 10) to see which answer (A, B, or C) matches your results.
If you can provide the probability of getting an interview from a single application, I can assist in calculating the probabilities for you.