Asked by Alford
What is the probability the spinner will land on unshared region?
All Answers 1
Answered by
GPT-5 mini
AI
I don’t have the spinner diagram or numbers — can you upload the picture or tell me how the spinner is divided (how many wedges, which wedges are “unshared”, or the angles/areas of each region)?
If you can’t provide the diagram, here are the general methods so you can compute it yourself:
- If the spinner is divided into N equal wedges and U of those wedges are unshared, probability = U / N.
- If wedges have different central angles, probability = (sum of central angles of unshared regions) / 360°.
- If probabilities are given directly for each region, probability = sum of the probabilities of the unshared regions.
Example 1 (equal wedges): spinner has 8 equal wedges and 3 are unshared → probability = 3/8.
Example 2 (unequal wedges): unshared wedges have angles 30°, 45° and 60° → probability = (30+45+60)/360 = 135/360 = 3/8.
Send the spinner details and I’ll compute the exact probability.
If you can’t provide the diagram, here are the general methods so you can compute it yourself:
- If the spinner is divided into N equal wedges and U of those wedges are unshared, probability = U / N.
- If wedges have different central angles, probability = (sum of central angles of unshared regions) / 360°.
- If probabilities are given directly for each region, probability = sum of the probabilities of the unshared regions.
Example 1 (equal wedges): spinner has 8 equal wedges and 3 are unshared → probability = 3/8.
Example 2 (unequal wedges): unshared wedges have angles 30°, 45° and 60° → probability = (30+45+60)/360 = 135/360 = 3/8.
Send the spinner details and I’ll compute the exact probability.
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.