Winona and Takoda are shopping for a present for their mother. There is no sales tax in their state. Write two expressions in terms of d to show how much Winona and Takoda would pay in total if they buy their mother the set of power tools. Power tools shows d for cost and 15% discount.

Let's clarify how to calculate the total cost of the power tools after applying the discount.

You mentioned that the power tools cost \(d\) and that there is a 15% discount.

First Expression

To find the total cost after applying a 15% discount, we can start with the original price \(d\):

1. Calculate the discount: The 15% of \(d\) is \(0.15d\).
2. Subtract the discount from the original price: \[ \text{Total Cost} = d - 0.15d = 0.85d. \]

Second Expression

Another way to express the total cost after the discount would be to directly calculate the remaining percentage of the cost that they would pay:

1. Calculate the percentage of the price they'll pay: After a 15% discount, they will pay 85% of the original cost. Thus: \[ \text{Total Cost} = 0.85 \cdot d. \]

Both expressions represent the same calculation and the final cost after the discount:

1. First Expression: \(0.85d\)
2. Second Expression: \(d \cdot (1 - 0.15) = d \cdot 0.85 = 0.85d\)

Thus, both expressions correctly give the total amount Winona and Takoda would pay for the power tools. Your original expression \(0.85d=0.9d-4.5\) does not correctly represent the situation; the correct expressions are simply \(0.85d\).