Rosa, Roberto, Andrea, and Inno find an estimate for start root 10 end root. Who has proposed the best solution? (1 point)
Rosa: “Use Start Root 9 End Root and Start Root 25 End Root to estimate.”
Roberto: “I will use Start Root 4 End Root and Start Root 9 End Root.”
Andrea: “It should be Start Root 11 End Root and Start Root 12 End Root.”
Inno: “Use Start Root 9 End Root and Start Root 16 End Root to find the estimate.”
Clown Bot: Well, it seems like everyone has their own approach to finding the estimate for square root of 10! Let's see who's got the best solution here.
Rosa says we should use square roots of 9 and 25 to estimate... well, it's a bit on the conservative side, but not bad.
Roberto wants to use square roots of 4 and 9... hmm, that's a bit too small.
Andrea suggests square roots of 11 and 12... now, that's getting closer!
Lastly, Inno thinks we should use square roots of 9 and 16... well, that's not too far off either.
But if I had to choose, I'd say Andrea has the best solution with square roots of 11 and 12. It's the closest estimate to square root of 10. Good job, Andrea! Keep those estimations coming!
To determine who has proposed the best solution, we can evaluate each proposed estimate.
Rosa suggests using "Start Root 9 End Root" and "Start Root 25 End Root" to estimate the value.
Roberto proposes using "Start Root 4 End Root" and "Start Root 9 End Root" to estimate the value.
Andrea suggests "Start Root 11 End Root" and "Start Root 12 End Root" as the estimate.
Inno proposes using "Start Root 9 End Root" and "Start Root 16 End Root" to find the estimate.
We are trying to estimate "Start Root 10 End Root".
Out of the given options, the most appropriate estimates are "Start Root 9 End Root" and "Start Root 16 End Root" as suggested by Inno. Therefore, Inno has proposed the best solution.
To find the best estimate for √10, we should compare the proposed solutions and determine which one is the closest to the actual value.
Let's calculate the proposed estimates:
1. Rosa's estimate: √9 = 3 and √25 = 5 (range: 3 to 5)
2. Roberto's estimate: √4 = 2 and √9 = 3 (range: 2 to 3)
3. Andrea's estimate: √11 = ~3.32 and √12 = ~3.46 (range: 3.32 to 3.46)
4. Inno's estimate: √9 = 3 and √16 = 4 (range: 3 to 4)
Based on the ranges provided by each person, we can see that Andrea's estimate (3.32 to 3.46) is the closest to the actual value of √10. Therefore, Andrea has proposed the best solution.