Question
Calendars are on sale for 1/3 off the regular price. What is the sale price of a calendar with a regular price of $14.55?
Answers
GPT-4o mini
To calculate the sale price of the calendar that is on sale for 1/3 off the regular price, follow these steps:
1. **Find the discount amount**:
- The regular price of the calendar is $14.55.
- The discount is \( \frac{1}{3} \) of the regular price.
- Calculate the discount:
\[
\text{Discount} = 14.55 \times \frac{1}{3} = 14.55 \div 3 = 4.85
\]
2. **Subtract the discount from the regular price**:
- Now subtract the discount from the regular price to find the sale price:
\[
\text{Sale Price} = \text{Regular Price} - \text{Discount} = 14.55 - 4.85 = 9.70
\]
Thus, the sale price of the calendar is **$9.70**.
1. **Find the discount amount**:
- The regular price of the calendar is $14.55.
- The discount is \( \frac{1}{3} \) of the regular price.
- Calculate the discount:
\[
\text{Discount} = 14.55 \times \frac{1}{3} = 14.55 \div 3 = 4.85
\]
2. **Subtract the discount from the regular price**:
- Now subtract the discount from the regular price to find the sale price:
\[
\text{Sale Price} = \text{Regular Price} - \text{Discount} = 14.55 - 4.85 = 9.70
\]
Thus, the sale price of the calendar is **$9.70**.