Sally wants to purchase a new snowblower for $349.99. The local sales tax is 7.5%. How much sales
tax will she have to pay? Round your answer to the nearest hundredth
To find the amount of sales tax Sally will have to pay, multiply the price of the snowblower by the sales tax rate:
349.99 x 0.075 = $26.25
Therefore, Sally will have to pay $26.25 in sales tax.
Apologies for the oversight. Let's add the tax to the total bill.
The initial bill total before tax is $50.88. To calculate the sales tax, multiply the bill total by the tax rate of 6%:
$50.88 x 0.06 = $3.05 (rounded to the nearest hundredth)
Add the sales tax to the total bill:
$50.88 + $3.05 = $53.93 (rounded to the nearest hundredth)
Now, let's calculate the tip based on the original bill amount of $50.88. To calculate the tip amount, multiply the bill total by the tip percentage of 30%:
$50.88 x 0.30 = $15.26 (rounded to the nearest hundredth)
Add the tip amount to the total bill including tax:
$53.93 + $15.26 = $69.19 (rounded to the nearest hundredth)
Finally, divide the total bill by the number of people (3) to find out how much each person will pay:
$69.19 / 3 = $23.06 (rounded to the nearest hundredth)
Therefore, each person will pay approximately $23.06.
To find Shardell's portion of the cost, we need to calculate the total cost for everything and then divide it by 2.
First, let's calculate the total cost before tax:
Catering bill: $325
Venue bill: $250
DJ bill: $375
Total cost before tax: $325 + $250 + $375 = $950
To find the sales tax, we'll multiply the total cost before tax by the tax rate of 9%:
Sales tax: $950 x 0.09 = $85.50
Now, let's calculate the total cost including tax:
Total cost including tax: $950 + $85.50 = $1035.50
Since Shardell and Marsha will split the cost equally, Shardell's portion would be half of the total cost including tax:
Shardell's portion: $1035.50 / 2 = $517.75
Therefore, Shardell's portion of the cost will be $517.75.
Apologies for the previous incorrect response. Let's calculate the percent error correctly.
The predicted weight of Sam was 60 pounds.
The actual weight of Sam is 75 pounds.
To find the difference between the predicted and actual weight:
Actual weight - Predicted weight = 75 pounds - 60 pounds = 15 pounds
To calculate the percent error:
Percent Error = (|Difference| / Actual weight) * 100
Percent Error = (|15| / 75) * 100
Percent Error = (15 / 75) * 100
Percent Error = 20%
Therefore, the percent error is 20%.
OH its 3.77% i copy n paste and i decided to ask a new question and thats the answer i said it here just in case anyone in the future just sees this soo HI i answered this in 2023 so it would be cool if someone saw this in like 2028
To find the percent error, we need to compare the actual outcome to the predicted outcome and calculate the difference as a percentage.
The predicted number of bags to be sold was 250, and the actual number of bags sold was 266.
To calculate the difference in bags sold:
266 - 250 = 16
Now, let's calculate the percent error:
Percent Error = (|16| / 250) * 100
Percent Error = 6.4%
Rounded to the nearest whole number, the percent error is 6%.
Therefore, the percent error is 6%.
all of these were right but 3.63, and the one that kept saying 3.17 is 52. instead of 3.63, it was 3.78
ya favorite math hater is here to save you again <3
idk what the muffin the people above me were talking about but uh... heres some answers :D
~~~~~~~~~~~~~~~~~~~~~
Answers:
1. $54
2. $19.69
3. 3.07%
4. 52%
5. 3.77%
~~~~~~~~~~~~~~~~~~~~~
hope this helps!
-Sad-girl :)
Thanks @Sad-girl :)!!! All correct, still 2023. Ummmm, don't be sad
Ken, Mike, and Ariel are eating out at their favorite restaurant. They each order a sandwich combo and
plan to split the bill evenly. The service they receive at the restaurant is amazing, so they decide to
leave a 30% tip. Their bill total is $50.88 before tax. If Florida’s sales tax is 6%, how much will each
person pay? Both tip and tax are calculated based on the original total of the bill. Round the tip and the
tax to the nearest hundredth immediately after calculating. Round your final answer to the nearest
hundredth
redo it its wrong
i said uts wrong
add tax
Shardell and Marsha are planning a party. Since they are both hosting, they have agreed to split the
cost for everything in half. The catering bill is $325, the venue bill is $250, and the DJ is $375. If state
tax is 9%, what will Shardell’s portion cost?
A photography club would like to raise money for a local health organization by selling popcorn. The
club predicts they need to sell 250 bags of popcorn to reach their goal.At the end of the fundraiser,
they sold 266 bags of popcorn and met their goal. What is the percent error? Round the answer to the
nearest whole number
Krisha has a chocolate Labrador retriever named Sam. She believes her dog weighs 60 pounds.
Sam’s actual weight is 75 pounds. Find the percent error
do it again
Use proportional relationships to solve the following problem. Riley needs to earn enough money to
purchase a new jacket. The one he likes best is $49.99. His state sales tax is 7.25%. How much
money does he need to earn? Round to the nearest dollar.
To find the total amount of money Riley needs to earn, we need to calculate the sales tax and add it to the price of the jacket.
First, let's calculate the sales tax amount. Multiply the price of the jacket by the sales tax rate:
$49.99 x 0.0725 = $3.624875
Next, round the sales tax to the nearest cent:
$3.624875 ≈ $3.62
Now, add the sales tax to the price of the jacket to get the total amount Riley needs to earn:
$49.99 + $3.62 = $53.61
Therefore, Riley needs to earn approximately $53.
Use proportional relationships to solve the following problem. Riley needs to earn enough money to
purchase a new jacket. The one he likes best is $49.99. His state sales tax is 7.25%. How much
money does he need to earn? Round to the nearest dollar.
Responses
$54
$82
$50
$3.62
To find the total amount of money Riley needs to earn, we need to calculate the sales tax and add it to the price of the jacket.
First, let's calculate the sales tax amount. Multiply the price of the jacket by the sales tax rate:
$49.99 x 0.0725 = $3.624875
Next, round the sales tax to the nearest cent:
$3.624875 ≈ $3.62
Now, add the sales tax to the price of the jacket to get the total amount Riley needs to earn:
$49.99 + $3.62 = $53.61
Therefore, Riley needs to earn approximately $54 to purchase the jacket.
Rafeal’s family dinner costs $56.25. His dad wants him to leave a 35% tip. How much money should
Rafeal provide as a tip? Round your answer to the nearest hundredth.
To find the amount of money Rafeal should provide as a tip, multiply the cost of the dinner by the tip percentage:
$56.25 x 0.35 = $19.69
Therefore, Rafeal should provide approximately $19.69 as a tip.
A university football stadium has 81,500 seats. The stadium is at full capacity on game day. Layla
believes only 79,000 seats are occupied. Find the percent error of Layla’s prediction. Round your
answer to the nearest hundredth of a percent.
To find the percent error of Layla's prediction, we need to compare the actual number of occupied seats to Layla's predicted number of occupied seats.
Actual number of occupied seats: 81,500
Predicted number of occupied seats: 79,000
To find the difference between the actual and predicted number of occupied seats:
81,500 - 79,000 = 2,500
To calculate the percent error:
Percent Error = (|Difference| / Actual) * 100
Percent Error = (|2,500| / 81,500) * 100
Percent Error ≈ (0.0307) * 100
Percent Error ≈ 3.07%
Therefore, the percent error of Layla's prediction is approximately 3.07%.
clarify the sign
Apologies for the confusion. To clarify the sign of the percent error, we'll consider the sign of the difference between the actual and predicted values.
Actual number of occupied seats: 81,500
Predicted number of occupied seats: 79,000
To find the difference between the actual and predicted values:
81,500 - 79,000 = 2,500
Since the actual value is larger than the predicted value, the difference is positive.
To calculate the percent error:
Percent Error = (|Difference| / Actual) * 100
Percent Error = (|2,500| / 81,500) * 100
Percent Error ≈ (0.0307) * 100
Percent Error ≈ 3.07%
Therefore, the percent error of Layla's prediction is approximately +3.07%.
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.
To find the percent error in Aatikah's prediction, we need to compare her predicted amount to the actual amount spent.
Predicted amount: $30.00
Actual amount spent: $19.75
To find the difference between the predicted and actual amounts:
$30.00 - $19.75 = $10.25
To calculate the percent error:
Percent Error = (|Difference| / Predicted) * 100
Percent Error = (|$10.25| / $30.00) * 100
Percent Error ≈ (0.3417) * 100
Percent Error ≈ 34.17%
Therefore, the percent error in Aatikah's prediction is approximately 34%.
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.
Response
52%
1%
58%
2%
To find the percent error in Aatikah's prediction, we need to compare her predicted amount to the actual amount spent.
Predicted amount: $30.00
Actual amount spent: $19.75
To find the difference between the predicted and actual amounts:
$30.00 - $19.75 = $10.25
To calculate the percent error:
Percent Error = (|Difference| / Predicted) * 100
Percent Error = (|$10.25| / $30.00) * 100
Percent Error ≈ (0.3417) * 100
Percent Error ≈ 34.17%
Therefore, the percent error in Aatikah's prediction is approximately 34%. The closest whole number response would be 34%, so the correct answer is not listed among the options provided.
use the responses i gave
Apologies for the confusion. Let's evaluate the percent error in Aatikah's prediction using the given responses:
Predicted amount: $30.00
Actual amount spent: $19.75
To find the difference between the predicted and actual amounts:
$30.00 - $19.75 = $10.25
To calculate the percent error:
Percent Error = (|Difference| / Predicted) * 100
Percent Error = (|$10.25| / $30.00) * 100
Percent Error ≈ (0.3417) * 100
Percent Error ≈ 34.17%
Rounded to the nearest whole number, the percent error is 34%.
Therefore, the correct response among the given options would be 34%.
you didnt even use the responses theres no 34% option.
Apologies for the oversight. Let's reevaluate the percent error using the given responses:
Predicted amount: $30.00
Actual amount spent: $19.75
To find the difference between the predicted and actual amounts:
$30.00 - $19.75 = $10.25
To calculate the percent error:
Percent Error = (|Difference| / Predicted) * 100
Percent Error = (|$10.25| / $30.00) * 100
Percent Error ≈ (0.3417) * 100
Percent Error ≈ 34.17%
Rounding 34.17% to the nearest whole number gives a percent error of 34%.
Therefore, the closest provided response to the percent error is 52%.
Julian and Brittany mailed 275 wedding invitations to family and friends and predicted that they would
all attend. Only 265 out of 275 people committed to attending the wedding. Calculate the percent error
in their prediction. Round your answer to the nearest hundredth percent
To calculate the percent error in Julian and Brittany's prediction, we need to compare the actual number of attendees to their predicted number of attendees.
Predicted number of attendees: 275
Actual number of attendees: 265
To find the difference in the number of attendees:
275 - 265 = 10
To calculate the percent error:
Percent Error = (|Difference| / Predicted) * 100
Percent Error = (|10| / 275) * 100
Percent Error ≈ (0.0364) * 100
Percent Error ≈ 3.64%
Rounded to the nearest hundredth percent, the percent error is 3.64%.
Therefore, the percent error in Julian and Brittany's prediction is approximately 3.64%.
Julian and Brittany mailed 275 wedding invitations to family and friends and predicted that they would
all attend. Only 265 out of 275 people committed to attending the wedding. Calculate the percent error
in their prediction. Round your answer to the nearest hundredth percent
Responses
3.63%
0.038%
3.77%
-4.00%
To calculate the percent error in Julian and Brittany's prediction, we need to compare the actual number of attendees to their predicted number of attendees.
Predicted number of attendees: 275
Actual number of attendees: 265
To
wrong
Julian and Brittany mailed 275 wedding invitations to family and friends and predicted that they would
all attend. Only 265 out of 275 people committed to attending the wedding. Calculate the percent error
in their prediction. Round your answer to the nearest hundredth percent
Responses
3.63%
0.038%
3.77%
-4.00%
use responses to answer
help
@annoymous TY lol idk why it doesn't answer at the end it did that to me ITS ANNOYING
To find the total amount they have to pay after factoring in the sales tax and tip, first calculate the sales tax:
$50.88 x 0.06 = $3.05 (rounded to the nearest hundredth)
Next, find the total bill after including the sales tax:
$50.88 + $3.05 = $53.93 (rounded to the nearest hundredth)
To calculate the tip amount, multiply the total bill by the tip percentage:
$53.93 x 0.30 = $16.18 (rounded to the nearest hundredth)
Now, add the total bill, including sales tax and tip, to get the final bill amount:
$53.93 + $16.18 = $70.11 (rounded to the nearest hundredth)
Since they are splitting the bill evenly, divide the final bill amount by the number of people (3):
$70.11 / 3 = $23.37 (rounded to the nearest hundredth)
Therefore, each person will pay $23.37.
Apologies for the error. Let's calculate the bill correctly.
The bill total before tax is $50.88. To calculate the sales tax, multiply the bill total by the tax rate of 6%:
$50.88 x 0.06 = $3.05 (rounded to the nearest hundredth)
Add the sales tax to the bill total to find the total amount before tip:
$50.88 + $3.05 = $53.93 (rounded to the nearest hundredth)
To find the tip amount, multiply the total bill by the tip percentage of 30%:
$53.93 x 0.30 = $16.18 (rounded to the nearest hundredth)
Finally, add the tip amount to the total bill to calculate the final amount:
$53.93 + $16.18 = $70.11 (rounded to the nearest hundredth)
Since they are splitting the bill evenly among 3 people, divide the final amount by 3:
$70.11 / 3 = $23.37 (rounded to the nearest hundredth)
Hence, each person will pay approximately $23.37.
Apologies for the confusion. Let's recalculate the bill correctly.
The bill total before tax is $50.88. To calculate the sales tax, multiply the bill total by the tax rate of 6%:
$50.88 x 0.06 = $3.05 (rounded to the nearest hundredth)
Add the sales tax to the bill total to find the total amount before tip:
$50.88 + $3.05 = $53.93 (rounded to the nearest hundredth)
To find the tip amount, multiply the total bill by the tip percentage of 30%:
$53.93 x 0.30 = $16.18 (rounded to the nearest hundredth)
Finally, add the tip amount to the total bill to calculate the final amount:
$53.93 + $16.18 = $70.11 (rounded to the nearest hundredth)
Since they want to split the bill evenly among 3 people, divide the final amount by 3:
$70.11 / 3 = $23.37 (rounded to the nearest hundredth)
Hence, each person will pay approximately $23.37. If you believe there is still an error in the calculation, please let me know which step you are referring to.
To find the percent error, we need to compare the actual weight to the predicted weight and calculate the difference as a percentage.
The predicted weight of Sam was 60 pounds, and the actual weight of Sam is 75 pounds.
To calculate the difference in weight:
75 - 60 = 15
Now, let's calculate the percent error:
Percent Error = (|15| / 60) * 100
Percent Error ≈ 25%
Therefore, the percent error is approximately 25%.