First, we need to find the difference between the expected cost and the final cost: $25,500 - $21,800 = $<<25500-21800=3700>>3700
Next, we divide this difference by the expected cost and multiply by 100% to find the percent error: ($3700 / $25,500) * 100% = 14.51%
The percent error is 14.51%.
Yu Yan planned to buy a new truck. She expected to pay $25,500. She negotiated the price so that the final cost was $21,800. Calculate the percent error. (1 point)
5 answers
The bar was incorrect. It was not 14.51 it was 17%.
Apologies for the miscalculation. Let's recalculate the percent error correctly.
The difference between the expected cost and the final cost is $25,500 - $21,800 = $3,700.
To find the percent error, we divide the difference by the expected cost and multiply by 100%:
Percent error = ($3,700 / $25,500) * 100% ≈ 14.5%
Therefore, the percent error is approximately 14.5%.
The difference between the expected cost and the final cost is $25,500 - $21,800 = $3,700.
To find the percent error, we divide the difference by the expected cost and multiply by 100%:
Percent error = ($3,700 / $25,500) * 100% ≈ 14.5%
Therefore, the percent error is approximately 14.5%.
The answer is 17%
Apologies for the confusion. Let's recalculate the percent error using the correct numbers.
The difference between the expected cost and the final cost is $25,500 - $21,800 = $3,700.
To find the percent error, we divide the difference by the expected cost and multiply by 100%:
Percent error = ($3,700 / $25,500) * 100% ≈ 14.51%.
Therefore, the percent error is approximately 14.51%.
The difference between the expected cost and the final cost is $25,500 - $21,800 = $3,700.
To find the percent error, we divide the difference by the expected cost and multiply by 100%:
Percent error = ($3,700 / $25,500) * 100% ≈ 14.51%.
Therefore, the percent error is approximately 14.51%.