97.1k views
2 votes
in the eighth trial, how many more problems did participant 1 answer correctly than participant 2, as a percentage of the number of problems participant 2 answered correctly?

1 Answer

7 votes

Final answer:

To find out how many more problems one participant answered correctly than another as a percentage, subtract the number of problems correctly answered by Participant 2 from the number by Participant 1, divide by Participant 2's correct answers, and multiply by 100. Without specific data, a hypothetical example shows how the calculation would be performed.

Step-by-step explanation:

To determine how many more problems Participant 1 answered correctly than Participant 2 as a percentage of the number of problems Participant 2 answered correctly, you would follow several steps:

  • First, identify the number of problems each participant answered correctly.
  • Next, calculate the difference in the number of problems correctly answered between the two participants.
  • Finally, divide the difference by the number of problems Participant 2 answered correctly, and multiply by 100 to find the percentage.

Since the specific data for Participant 1 and Participant 2 in trial 8 is not provided in the question, the actual calculation cannot be performed here. However, if Participant 1 answered 18 problems correctly and Participant 2 answered 15 correctly, the difference is 3.

Therefore, the percentage would be (3 / 15) * 100, which equals to 20%. This means Participant 1 answered 20% more problems correctly than Participant 2.

User Michelpm
by
8.8k points

No related questions found

Welcome to QAmmunity.org, where you can ask questions and receive answers from other members of our community.