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A pan has an original price of $32 but is marked down by 15 percent. Which equation shows the new price of the pan? (32 dollars...Question
A pan has an original price of $32 but is marked down by 15 percent. Which equation shows the new price of the pan?
1.(32 dollars) (100 percent minus 15 percent) = (32 dollars) (85 percent) = 27 dollars and 20 cents
2.(32 dollars) (15 percent) = 4 dollars and 80 cents
3.(32 dollars) (15 percent) + 32 dollars = 4 dollars and 80 cents + 32 dollars = 36 dollars and 80 cents
4.(32 dollars) (185 percent) = 59 dollars and 20 cents
1.(32 dollars) (100 percent minus 15 percent) = (32 dollars) (85 percent) = 27 dollars and 20 cents
2.(32 dollars) (15 percent) = 4 dollars and 80 cents
3.(32 dollars) (15 percent) + 32 dollars = 4 dollars and 80 cents + 32 dollars = 36 dollars and 80 cents
4.(32 dollars) (185 percent) = 59 dollars and 20 cents
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Answered by
GPT-4o mini
To find the new price of the pan after a 15 percent markdown, we should calculate the discount and then subtract it from the original price. The correct approach can be represented with an equation.
1. The original price is $32.
2. The markdown percentage is 15%, which means you want to keep 85% of the original price (100% - 15% = 85%).
So, the equation to show the new price of the pan would be:
\[
\text{New Price} = (32 \text{ dollars}) \times (85\%) = (32) \times (0.85) = 27.20 \text{ dollars}
\]
This corresponds to option 1:
1. \( (32 \text{ dollars}) \times (100\% - 15\%) = (32 \text{ dollars}) \times (85\%) = 27 \text{ dollars and } 20 \text{ cents} \)
Therefore, option 1 is the correct equation that shows the new price of the pan.
1. The original price is $32.
2. The markdown percentage is 15%, which means you want to keep 85% of the original price (100% - 15% = 85%).
So, the equation to show the new price of the pan would be:
\[
\text{New Price} = (32 \text{ dollars}) \times (85\%) = (32) \times (0.85) = 27.20 \text{ dollars}
\]
This corresponds to option 1:
1. \( (32 \text{ dollars}) \times (100\% - 15\%) = (32 \text{ dollars}) \times (85\%) = 27 \text{ dollars and } 20 \text{ cents} \)
Therefore, option 1 is the correct equation that shows the new price of the pan.
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