Asked by Hawt Chickin nuggies

To calculate Louisa's total bill, you first need to compute the sales tax and then add it to the purchase price of the snake.

1. **Calculate the sales tax:**
\[
\text{Sales Tax} = \text{Purchase Price} \times \text{Sales Tax Rate}
\]
\[
\text{Sales Tax} = 199.00 \times 0.0725 = 14.3975
\]

2. **Round the sales tax to the nearest cent:**
\[
\text{Sales Tax} \approx 14.40
\]

3. **Calculate the total bill:**
\[
\text{Total Bill} = \text{Purchase Price} + \text{Sales Tax}
\]
\[
\text{Total Bill} = 199.00 + 14.40 = 213.40
\]

Therefore, Louisa's total bill is **$213.40**.

To calculate the total amount Jesse will pay for lunch, including sales tax and tip, follow these steps:

1. **Calculate the sales tax:**
\[
\text{Sales Tax} = \text{Food Cost} \times \text{Sales Tax Rate}
\]
\[
\text{Sales Tax} = 105.79 \times 0.09 = 9.5171
\]

Rounding the sales tax to the nearest cent:
\[
\text{Sales Tax} \approx 9.52
\]

2. **Calculate the total cost after tax:**
\[
\text{Total Cost After Tax} = \text{Food Cost} + \text{Sales Tax}
\]
\[
\text{Total Cost After Tax} = 105.79 + 9.52 = 115.31
\]

3. **Calculate the tip based on the pre-tax amount:**
\[
\text{Tip} = \text{Food Cost} \times \text{Tip Rate}
\]
\[
\text{Tip} = 105.79 \times 0.20 = 21.158
\]

Rounding the tip to the nearest cent:
\[
\text{Tip} \approx 21.16
\]

4. **Calculate the total amount Jesse will pay:**
\[
\text{Total Amount} = \text{Total Cost After Tax} + \text{Tip}
\]
\[
\text{Total Amount} = 115.31 + 21.16 = 136.47
\]

Thus, the total amount Jesse will pay, including tax and tip, is **$136.47**.

To calculate the percent error, you can use the following formula:

\[
\text{Percent Error} = \left( \frac{\text{Estimated Value} - \text{Actual Value}}{\text{Estimated Value}} \right) \times 100
\]

1. **Identify the values:**
- Estimated Value (predicted time) = 60 minutes
- Actual Value (finished time) = 53 minutes

2. **Calculate the error:**
\[
\text{Error} = \text{Estimated Value} - \text{Actual Value} = 60 - 53 = 7 \text{ minutes}
\]

3. **Calculate the percent error:**
\[
\text{Percent Error} = \left( \frac{7}{60} \right) \times 100 \approx 11.6667
\]

4. **Round to the nearest tenth:**
\[
\text{Percent Error} \approx 11.7\%
\]

Therefore, the percent error is **11.7%**.

To convert milliliters to liters using the conversion ratio \(1 \, \text{liter} = 1,000 \, \text{milliliters}\), you can use the following formula:

\[
\text{Liters} = \frac{\text{Milliliters}}{1,000}
\]

Given that the cylinder holds \(6,750 \, \text{milliliters}\), the calculation will be:

\[
\text{Liters} = \frac{6,750}{1,000} = 6.75
\]

Therefore, the cylinder holds **6.75 liters**.

To convert milliliters to gallons using the conversion ratio \(1 \, \text{gallon} \approx 3,785 \, \text{milliliters}\), you can use the following formula:

\[
\text{Gallons} = \frac{\text{Milliliters}}{3,785}
\]

Given that the container holds \(34,065 \, \text{milliliters}\), the calculation will be:

\[
\text{Gallons} = \frac{34,065}{3,785} \approx 9.0
\]

Therefore, the container holds approximately **9.0 gallons**.

To convert the speed from kilometers per hour to miles per hour using the conversion ratio \(1 \, \text{kilometer} \approx 0.62 \, \text{miles}\), you can use the following formula:

\[
\text{Miles per hour} = \text{Kilometers per hour} \times 0.62
\]

Given that the airplane travels at a speed of \(900 \, \text{kilometers per hour}\), the calculation will be:

\[
\text{Miles per hour} = 900 \times 0.62
\]
\[
\text{Miles per hour} = 558
\]

Therefore, the airplane's speed is approximately **558 miles per hour**.