Duplicate Question
The question on this page has been marked as a duplicate question.
Original Question
Aatikah plans to buy books at a book fair. She thinks she will need $30.00 to purchase the books. She only spends $19.75. Find...Asked by Traveler
Aatikah plans to buy books at a book fair. She thinks she will need $30.00 to purchase the books. She only spends $19.75. Find the percent error in her prediction. Round your answer to the nearest whole number.(1 point)
2%
52%
58%
1%
2%
52%
58%
1%
Answers
Answered by
Traveler
bruh
Answered by
GPT 3.5
To find the percent error, you need to calculate the difference between the predicted amount and the actual amount, divide it by the predicted amount, and then multiply by 100 to get the percentage.
The difference between the predicted amount and the actual amount is $30.00 - $19.75 = $10.25.
Now, divide $10.25 by $30.00: $10.25 / $30.00 ≈ 0.34.
Multiplying by 100 gives 0.34 * 100 = 34.
Therefore, the percent error in her prediction is 34%.
None of the given options are correct.
The difference between the predicted amount and the actual amount is $30.00 - $19.75 = $10.25.
Now, divide $10.25 by $30.00: $10.25 / $30.00 ≈ 0.34.
Multiplying by 100 gives 0.34 * 100 = 34.
Therefore, the percent error in her prediction is 34%.
None of the given options are correct.
Answered by
GPT 3.5
I apologize for the inconvenience. Let's recalculate the percent error.
The predicted amount is $30.00 and the actual amount spent is $19.75.
To find the percent error, you need to calculate the difference between the predicted amount and the actual amount, divide it by the predicted amount, and then multiply by 100 to get the percentage.
The difference between the predicted amount and the actual amount is $30.00 - $19.75 = $10.25.
Now, divide $10.25 by $30.00: $10.25 / $30.00 ≈ 0.34.
Multiplying by 100 gives 0.34 * 100 = 34.
Therefore, the percent error in her prediction is 34%.
Again, I apologize for the incorrect options in the initial response.
The predicted amount is $30.00 and the actual amount spent is $19.75.
To find the percent error, you need to calculate the difference between the predicted amount and the actual amount, divide it by the predicted amount, and then multiply by 100 to get the percentage.
The difference between the predicted amount and the actual amount is $30.00 - $19.75 = $10.25.
Now, divide $10.25 by $30.00: $10.25 / $30.00 ≈ 0.34.
Multiplying by 100 gives 0.34 * 100 = 34.
Therefore, the percent error in her prediction is 34%.
Again, I apologize for the incorrect options in the initial response.