A photography club would like to raise money for a local health organization by selling popcom. The club predicts they need to sell 250 bags of popcom to reach their goal. At the end of the fundraiser, they sold 266 bags of popcom and met their goal. What is the percent error? Round the answer to the nearest whole number. (1 point)
[__]%
To find the percent error, we need to first calculate the difference between the predicted number of bags and the actual number of bags sold:
Actual number of bags sold: 266
Predicted number of bags sold: 250
Difference = Actual - Predicted
Difference = 266 - 250
Difference = 16
Next, we need to calculate the percent error using the formula:
Percent Error = (Difference / Predicted) x 100
Percent Error = (16 / 250) x 100
Percent Error = 0.064 x 100
Percent Error = 6.4
Rounded to the nearest whole number, the percent error is 6%. Answer: [6]%.
To find the percent error, you need to compare the difference between the predicted value and the actual value.
Step 1: Find the difference between the predicted value and the actual value.
- Predicted value: 250 bags
- Actual value: 266 bags
Difference: 266 - 250 = 16 bags
Step 2: Calculate the percent error.
Percent error = (|difference| / predicted value) x 100
Percent error = (|16| / 250) x 100
Percent error = (16 / 250) x 100
Percent error = 0.064 x 100
Percent error = 6.4
Rounding to the nearest whole number, the percent error is 6%.
To find the percent error, we need to calculate the difference between the predicted number of bags and the actual number of bags sold, and then divide that difference by the predicted number of bags. Finally, we multiply the result by 100 to express it as a percentage.
Step 1: Calculate the difference between the predicted and actual number of bags sold:
266 - 250 = 16
Step 2: Divide the difference by the predicted number of bags:
16 / 250 = 0.064
Step 3: Multiply the result by 100 to get the percentage:
0.064 * 100 = 6.4
Rounding the answer to the nearest whole number, the percent error is approximately 6%.
Therefore, the answer is:
[6]%.