Answer: Let's write an equation to represent the cost of s square feet of fabric during the sale, considering the 10% discount.
The regular price of the fabric is $4.90 per square foot. The discount reduces the price by 10%. To calculate the sale price, we need to subtract the discount amount from the regular price.
Let's denote the cost of s square feet of fabric during the sale as C(s).
The regular price per square foot is $4.90. Therefore, the discount amount per square foot is (10/100) * $4.90 = $0.49.
The sale price per square foot is the regular price minus the discount amount:
Sale price per square foot = $4.90 - $0.49 = $4.41.
Now, we can write the equation for the cost of s square feet of fabric during the sale:
C(s) = $4.41 * s
This equation represents the cost of s square feet of fabric during the sale.
To show the change in the cost of fabric, we can write a transformation from the regular price to the sale price:
Regular price: $4.90 per square foot
Sale price: $4.41 per square foot
The transformation can be expressed as:
Sale price = (1 - 10/100) * Regular price
This shows that the sale price is obtained by multiplying the regular price by (1 - 10/100), which represents the 10% discount.